1545212219.439 * [misc]progress:  [Phase 1 of 3] Setting up.
1545212219.439 * * * [misc]progress:  [1/2] Preparing points
1545212219.439 * * * * [misc]points:  Sampling 256 additional inputs, on iter 0 have 0 / 256
1545212220.139 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212220.139 * * * * [misc]points:  Sampling 180 additional inputs, on iter 1 have 76 / 256
1545212220.497 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212220.497 * * * * [misc]points:  Sampling 119 additional inputs, on iter 2 have 137 / 256
1545212220.741 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212220.741 * * * * [misc]points:  Sampling 76 additional inputs, on iter 3 have 180 / 256
1545212220.830 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212220.832 * * * * [misc]points:  Sampling 54 additional inputs, on iter 4 have 202 / 256
1545212220.941 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212220.941 * * * * [misc]points:  Sampling 35 additional inputs, on iter 5 have 221 / 256
1545212220.968 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212220.968 * * * * [misc]points:  Sampling 27 additional inputs, on iter 6 have 229 / 256
1545212221.008 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212221.008 * * * * [misc]points:  Sampling 17 additional inputs, on iter 7 have 239 / 256
1545212221.057 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212221.057 * * * * [misc]points:  Sampling 13 additional inputs, on iter 8 have 243 / 256
1545212221.081 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212221.081 * * * * [misc]points:  Sampling 9 additional inputs, on iter 9 have 247 / 256
1545212221.092 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212221.092 * * * * [misc]points:  Sampling 5 additional inputs, on iter 10 have 251 / 256
1545212221.097 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212221.097 * * * * [misc]points:  Sampling 5 additional inputs, on iter 11 have 251 / 256
1545212221.103 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212221.103 * * * * [misc]points:  Sampling 4 additional inputs, on iter 12 have 252 / 256
1545212221.107 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212221.107 * * * * [misc]points:  Sampling 4 additional inputs, on iter 13 have 252 / 256
1545212221.116 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212221.117 * * * * [misc]points:  Sampling 4 additional inputs, on iter 14 have 255 / 256
1545212221.137 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212221.137 * * * * [exit]points:  Sampled 258 points with exact outputs
1545212221.138 * * * [misc]progress:  [2/2] Setting up program.
1545212221.148 * [misc]progress:  [Phase 2 of 3] Improving.
1545212221.148 * [enter]simplify:  Simplifying (* (/ c0 (* 2 w)) (+ (/ (* c0 (* d d)) (* (* w h) (* D D))) (sqrt (- (* (/ (* c0 (* d d)) (* (* w h) (* D D))) (/ (* c0 (* d d)) (* (* w h) (* D D)))) (* M M)))))
1545212221.148 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212221.156 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212221.208 * * [misc]simplify:  iters left: 4 (277 enodes)
1545212221.529 * [exit]simplify:  Simplified to (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))
1545212221.549 * * [misc]progress:  iteration 1 / 4
1545212221.549 * * * [misc]progress:  picking best candidate
1545212221.568 * * * * [misc]pick:  Picked  #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212221.568 * * * [misc]progress:  localizing error
1545212221.621 * * * [misc]progress:  generating rewritten candidates
1545212221.621 * * * * [misc]progress:  [ 1 / 4 ] rewriting at (2 2)
1545212221.679 * * * * [misc]progress:  [ 2 / 4 ] rewriting at (2 2 2)
1545212221.703 * * * * [misc]progress:  [ 3 / 4 ] rewriting at (2 2 1 1 2 1)
1545212221.727 * * * * [misc]progress:  [ 4 / 4 ] rewriting at (2 2 1 1 1 2)
1545212221.751 * * * [misc]progress:  generating series expansions
1545212221.751 * * * * [misc]progress:  [ 1 / 4 ] generating series at (2 2)
1545212221.752 * [misc]backup-simplify:  Simplify (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) into (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))))
1545212221.752 * [misc]approximate:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in (M c0 h w d D) around 0
1545212221.752 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of M in D
1545212221.752 * [misc]backup-simplify:  Simplify M into M
1545212221.752 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212221.752 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.752 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of d in D
1545212221.752 * [misc]backup-simplify:  Simplify d into d
1545212221.752 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of w in D
1545212221.752 * [misc]backup-simplify:  Simplify w into w
1545212221.752 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212221.752 * [misc]taylor:  Taking taylor expansion of D in D
1545212221.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.753 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.753 * [misc]taylor:  Taking taylor expansion of h in D
1545212221.753 * [misc]backup-simplify:  Simplify h into h
1545212221.753 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.753 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.753 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.753 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212221.753 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212221.753 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212221.753 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in D
1545212221.753 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212221.753 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212221.753 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212221.753 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.753 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212221.753 * [misc]taylor:  Taking taylor expansion of d in D
1545212221.753 * [misc]backup-simplify:  Simplify d into d
1545212221.753 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212221.753 * [misc]taylor:  Taking taylor expansion of w in D
1545212221.753 * [misc]backup-simplify:  Simplify w into w
1545212221.753 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212221.753 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212221.753 * [misc]taylor:  Taking taylor expansion of D in D
1545212221.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.753 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.753 * [misc]taylor:  Taking taylor expansion of h in D
1545212221.753 * [misc]backup-simplify:  Simplify h into h
1545212221.753 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.754 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.754 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.754 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212221.754 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212221.754 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212221.754 * [misc]taylor:  Taking taylor expansion of M in D
1545212221.754 * [misc]backup-simplify:  Simplify M into M
1545212221.754 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w h))) into (/ (* c0 (pow d 2)) (* w h))
1545212221.754 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w h)) 0) into (/ (* c0 (pow d 2)) (* w h))
1545212221.754 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* w h)) (/ (* c0 (pow d 2)) (* w h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))
1545212221.754 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) into (/ (* c0 (pow d 2)) (* w h))
1545212221.754 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.755 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.755 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212221.755 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212221.755 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212221.755 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212221.755 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.755 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.755 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.756 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212221.756 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212221.756 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212221.756 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212221.756 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.756 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* w h)) 0) (* 0 (/ (* c0 (pow d 2)) (* w h)))) into 0
1545212221.757 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))))) into 0
1545212221.757 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212221.757 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212221.757 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212221.757 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.757 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212221.757 * [misc]taylor:  Taking taylor expansion of d in D
1545212221.757 * [misc]backup-simplify:  Simplify d into d
1545212221.757 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212221.757 * [misc]taylor:  Taking taylor expansion of w in D
1545212221.757 * [misc]backup-simplify:  Simplify w into w
1545212221.757 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212221.757 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212221.757 * [misc]taylor:  Taking taylor expansion of D in D
1545212221.757 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.757 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.757 * [misc]taylor:  Taking taylor expansion of h in D
1545212221.757 * [misc]backup-simplify:  Simplify h into h
1545212221.757 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.757 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.757 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.757 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212221.757 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212221.757 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212221.757 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in d
1545212221.757 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in d
1545212221.757 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in d
1545212221.757 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in d
1545212221.757 * [misc]taylor:  Taking taylor expansion of M in d
1545212221.757 * [misc]backup-simplify:  Simplify M into M
1545212221.757 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212221.757 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212221.757 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212221.757 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.757 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212221.757 * [misc]taylor:  Taking taylor expansion of d in d
1545212221.757 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.758 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.758 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of w in d
1545212221.758 * [misc]backup-simplify:  Simplify w into w
1545212221.758 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of D in d
1545212221.758 * [misc]backup-simplify:  Simplify D into D
1545212221.758 * [misc]taylor:  Taking taylor expansion of h in d
1545212221.758 * [misc]backup-simplify:  Simplify h into h
1545212221.758 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.758 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212221.758 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.758 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.758 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.758 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212221.758 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212221.758 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.758 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of d in d
1545212221.758 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.758 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.758 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of w in d
1545212221.758 * [misc]backup-simplify:  Simplify w into w
1545212221.758 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212221.758 * [misc]taylor:  Taking taylor expansion of D in d
1545212221.758 * [misc]backup-simplify:  Simplify D into D
1545212221.758 * [misc]taylor:  Taking taylor expansion of h in d
1545212221.758 * [misc]backup-simplify:  Simplify h into h
1545212221.758 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.758 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212221.759 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.759 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.759 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.759 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212221.759 * [misc]taylor:  Taking taylor expansion of M in d
1545212221.759 * [misc]backup-simplify:  Simplify M into M
1545212221.759 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212221.759 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212221.759 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212221.759 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212221.759 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212221.759 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.759 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.759 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.759 * [misc]backup-simplify:  Simplify (+ (* M 0) (* 0 (- M))) into 0
1545212221.759 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212221.759 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212221.759 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212221.760 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212221.760 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.760 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212221.760 * [misc]taylor:  Taking taylor expansion of d in d
1545212221.760 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.760 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.760 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212221.760 * [misc]taylor:  Taking taylor expansion of w in d
1545212221.760 * [misc]backup-simplify:  Simplify w into w
1545212221.760 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212221.760 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212221.760 * [misc]taylor:  Taking taylor expansion of D in d
1545212221.760 * [misc]backup-simplify:  Simplify D into D
1545212221.760 * [misc]taylor:  Taking taylor expansion of h in d
1545212221.760 * [misc]backup-simplify:  Simplify h into h
1545212221.760 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.760 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212221.760 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.760 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.760 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.760 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212221.760 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of M in w
1545212221.760 * [misc]backup-simplify:  Simplify M into M
1545212221.760 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212221.760 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.760 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of d in w
1545212221.760 * [misc]backup-simplify:  Simplify d into d
1545212221.760 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of w in w
1545212221.760 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.760 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.760 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212221.760 * [misc]taylor:  Taking taylor expansion of D in w
1545212221.760 * [misc]backup-simplify:  Simplify D into D
1545212221.760 * [misc]taylor:  Taking taylor expansion of h in w
1545212221.761 * [misc]backup-simplify:  Simplify h into h
1545212221.761 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.761 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.761 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.761 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.761 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212221.761 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.761 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212221.761 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212221.761 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212221.761 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in w
1545212221.761 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212221.761 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212221.761 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212221.761 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.761 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212221.761 * [misc]taylor:  Taking taylor expansion of d in w
1545212221.761 * [misc]backup-simplify:  Simplify d into d
1545212221.761 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212221.761 * [misc]taylor:  Taking taylor expansion of w in w
1545212221.761 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.761 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.761 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212221.761 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212221.761 * [misc]taylor:  Taking taylor expansion of D in w
1545212221.761 * [misc]backup-simplify:  Simplify D into D
1545212221.761 * [misc]taylor:  Taking taylor expansion of h in w
1545212221.761 * [misc]backup-simplify:  Simplify h into h
1545212221.761 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.762 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.762 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.762 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.762 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212221.762 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.762 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212221.762 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212221.762 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212221.762 * [misc]taylor:  Taking taylor expansion of M in w
1545212221.762 * [misc]backup-simplify:  Simplify M into M
1545212221.762 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212221.762 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) h)) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212221.763 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))
1545212221.763 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212221.763 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.763 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.763 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.763 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212221.764 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212221.764 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212221.764 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212221.764 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212221.764 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.764 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.764 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.764 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212221.764 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212221.765 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212221.765 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212221.765 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) h)))) into 0
1545212221.765 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))))) into 0
1545212221.765 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212221.765 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212221.765 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212221.765 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.765 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212221.765 * [misc]taylor:  Taking taylor expansion of d in w
1545212221.765 * [misc]backup-simplify:  Simplify d into d
1545212221.765 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212221.765 * [misc]taylor:  Taking taylor expansion of w in w
1545212221.765 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.765 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.765 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212221.765 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212221.766 * [misc]taylor:  Taking taylor expansion of D in w
1545212221.766 * [misc]backup-simplify:  Simplify D into D
1545212221.766 * [misc]taylor:  Taking taylor expansion of h in w
1545212221.766 * [misc]backup-simplify:  Simplify h into h
1545212221.766 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.766 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.766 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.766 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.766 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212221.766 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.766 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212221.766 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212221.766 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212221.766 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in h
1545212221.766 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in h
1545212221.766 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in h
1545212221.766 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in h
1545212221.766 * [misc]taylor:  Taking taylor expansion of M in h
1545212221.766 * [misc]backup-simplify:  Simplify M into M
1545212221.766 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212221.766 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212221.766 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212221.766 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.766 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212221.766 * [misc]taylor:  Taking taylor expansion of d in h
1545212221.766 * [misc]backup-simplify:  Simplify d into d
1545212221.766 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212221.766 * [misc]taylor:  Taking taylor expansion of w in h
1545212221.767 * [misc]backup-simplify:  Simplify w into w
1545212221.767 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212221.767 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212221.767 * [misc]taylor:  Taking taylor expansion of D in h
1545212221.767 * [misc]backup-simplify:  Simplify D into D
1545212221.767 * [misc]taylor:  Taking taylor expansion of h in h
1545212221.767 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.767 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.767 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.767 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.767 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.767 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.767 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212221.767 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.767 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212221.767 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212221.767 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212221.767 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in h
1545212221.767 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212221.767 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212221.767 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212221.767 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.767 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212221.767 * [misc]taylor:  Taking taylor expansion of d in h
1545212221.767 * [misc]backup-simplify:  Simplify d into d
1545212221.767 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212221.767 * [misc]taylor:  Taking taylor expansion of w in h
1545212221.768 * [misc]backup-simplify:  Simplify w into w
1545212221.768 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212221.768 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212221.768 * [misc]taylor:  Taking taylor expansion of D in h
1545212221.768 * [misc]backup-simplify:  Simplify D into D
1545212221.768 * [misc]taylor:  Taking taylor expansion of h in h
1545212221.768 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.768 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.768 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.768 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.768 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.768 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.768 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212221.768 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.768 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212221.768 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212221.768 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212221.768 * [misc]taylor:  Taking taylor expansion of M in h
1545212221.768 * [misc]backup-simplify:  Simplify M into M
1545212221.769 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (pow D 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212221.769 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (pow D 2))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212221.769 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (/ (* c0 (pow d 2)) (* (pow D 2) w))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))
1545212221.769 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212221.769 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.769 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.769 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.769 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212221.770 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212221.770 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212221.770 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212221.770 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212221.770 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.770 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.770 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.770 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212221.771 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212221.771 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212221.771 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212221.774 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) w)))) into (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w)))
1545212221.774 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))))) into 0
1545212221.774 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212221.774 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212221.774 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212221.774 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.774 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212221.774 * [misc]taylor:  Taking taylor expansion of d in h
1545212221.774 * [misc]backup-simplify:  Simplify d into d
1545212221.774 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212221.774 * [misc]taylor:  Taking taylor expansion of w in h
1545212221.774 * [misc]backup-simplify:  Simplify w into w
1545212221.774 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212221.774 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212221.774 * [misc]taylor:  Taking taylor expansion of D in h
1545212221.774 * [misc]backup-simplify:  Simplify D into D
1545212221.774 * [misc]taylor:  Taking taylor expansion of h in h
1545212221.774 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.774 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.774 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.774 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.774 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.775 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.775 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212221.775 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.775 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212221.775 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212221.775 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212221.775 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in c0
1545212221.775 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in c0
1545212221.775 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in c0
1545212221.775 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in c0
1545212221.775 * [misc]taylor:  Taking taylor expansion of M in c0
1545212221.775 * [misc]backup-simplify:  Simplify M into M
1545212221.775 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212221.775 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212221.775 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.775 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.775 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.775 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212221.775 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.775 * [misc]backup-simplify:  Simplify d into d
1545212221.775 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212221.775 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.775 * [misc]backup-simplify:  Simplify w into w
1545212221.775 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212221.776 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212221.776 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.776 * [misc]backup-simplify:  Simplify D into D
1545212221.776 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.776 * [misc]backup-simplify:  Simplify h into h
1545212221.776 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.776 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212221.776 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.776 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212221.776 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.776 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.776 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.776 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212221.776 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in c0
1545212221.776 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212221.776 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212221.776 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.776 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.776 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.776 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212221.776 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.776 * [misc]backup-simplify:  Simplify d into d
1545212221.776 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212221.776 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.776 * [misc]backup-simplify:  Simplify w into w
1545212221.776 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212221.776 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212221.776 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.776 * [misc]backup-simplify:  Simplify D into D
1545212221.776 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.776 * [misc]backup-simplify:  Simplify h into h
1545212221.776 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.777 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212221.777 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.777 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212221.777 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.777 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.777 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.777 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212221.777 * [misc]taylor:  Taking taylor expansion of M in c0
1545212221.777 * [misc]backup-simplify:  Simplify M into M
1545212221.777 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212221.777 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212221.777 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212221.777 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212221.777 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212221.777 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.778 * [misc]backup-simplify:  Simplify (+ (/ (pow d 2) (* w (* (pow D 2) h))) 0) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212221.778 * [misc]backup-simplify:  Simplify (+ 0 (/ (pow d 2) (* w (* (pow D 2) h)))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212221.778 * [misc]backup-simplify:  Simplify (+ (* M (/ (pow d 2) (* w (* (pow D 2) h)))) (* (/ (pow d 2) (* w (* (pow D 2) h))) (- M))) into 0
1545212221.778 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212221.778 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212221.778 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212221.778 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.778 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.778 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.778 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212221.778 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.778 * [misc]backup-simplify:  Simplify d into d
1545212221.778 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212221.778 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.778 * [misc]backup-simplify:  Simplify w into w
1545212221.778 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212221.778 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212221.778 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.778 * [misc]backup-simplify:  Simplify D into D
1545212221.778 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.778 * [misc]backup-simplify:  Simplify h into h
1545212221.778 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.778 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212221.778 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.779 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212221.779 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.779 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.779 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.779 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212221.779 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of M in M
1545212221.779 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.779 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.779 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.779 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.779 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.779 * [misc]backup-simplify:  Simplify d into d
1545212221.779 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.779 * [misc]backup-simplify:  Simplify w into w
1545212221.779 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.779 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.779 * [misc]backup-simplify:  Simplify D into D
1545212221.779 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.779 * [misc]backup-simplify:  Simplify h into h
1545212221.779 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.779 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.779 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.779 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.780 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.780 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212221.780 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212221.780 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212221.780 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.780 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.780 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.780 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.780 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.780 * [misc]backup-simplify:  Simplify d into d
1545212221.780 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212221.780 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.780 * [misc]backup-simplify:  Simplify w into w
1545212221.780 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212221.780 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.780 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.780 * [misc]backup-simplify:  Simplify D into D
1545212221.780 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.780 * [misc]backup-simplify:  Simplify h into h
1545212221.780 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.780 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.780 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.780 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.780 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.780 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212221.780 * [misc]taylor:  Taking taylor expansion of M in M
1545212221.780 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.780 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.780 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212221.781 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.781 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212221.781 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212221.781 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212221.781 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.781 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.781 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.781 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212221.782 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212221.782 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.782 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212221.782 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212221.782 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.782 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.782 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.782 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212221.782 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212221.783 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.783 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212221.783 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212221.784 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212221.784 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.784 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.784 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.784 * [misc]backup-simplify:  Simplify d into d
1545212221.784 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.784 * [misc]backup-simplify:  Simplify w into w
1545212221.784 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.784 * [misc]backup-simplify:  Simplify D into D
1545212221.784 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.784 * [misc]backup-simplify:  Simplify h into h
1545212221.784 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.784 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.784 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.784 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.784 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.784 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212221.784 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of M in M
1545212221.784 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.784 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.784 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.784 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.784 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.784 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.784 * [misc]backup-simplify:  Simplify d into d
1545212221.784 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.785 * [misc]backup-simplify:  Simplify w into w
1545212221.785 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.785 * [misc]backup-simplify:  Simplify D into D
1545212221.785 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.785 * [misc]backup-simplify:  Simplify h into h
1545212221.785 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.785 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.785 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.785 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.785 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.785 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212221.785 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.785 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.785 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.785 * [misc]backup-simplify:  Simplify d into d
1545212221.785 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.785 * [misc]backup-simplify:  Simplify w into w
1545212221.785 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.785 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.785 * [misc]backup-simplify:  Simplify D into D
1545212221.785 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.785 * [misc]backup-simplify:  Simplify h into h
1545212221.785 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.785 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.785 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.785 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.785 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.786 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212221.786 * [misc]taylor:  Taking taylor expansion of M in M
1545212221.786 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.786 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.786 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212221.786 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.786 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212221.786 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212221.787 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212221.787 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.787 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.787 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.787 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212221.787 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212221.787 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.787 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212221.787 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212221.787 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.788 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.788 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.788 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212221.788 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212221.788 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.788 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212221.788 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212221.789 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212221.789 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212221.789 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.789 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.789 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.789 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.789 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.789 * [misc]backup-simplify:  Simplify d into d
1545212221.789 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212221.789 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.789 * [misc]backup-simplify:  Simplify w into w
1545212221.789 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212221.789 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.789 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.789 * [misc]backup-simplify:  Simplify D into D
1545212221.789 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.789 * [misc]backup-simplify:  Simplify h into h
1545212221.789 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.789 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.789 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.789 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212221.789 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212221.790 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212221.790 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212221.790 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in c0
1545212221.790 * [misc]taylor:  Taking taylor expansion of 2 in c0
1545212221.790 * [misc]backup-simplify:  Simplify 2 into 2
1545212221.790 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in c0
1545212221.790 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212221.790 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.790 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.790 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.790 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212221.790 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.790 * [misc]backup-simplify:  Simplify d into d
1545212221.790 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in c0
1545212221.790 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212221.790 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.790 * [misc]backup-simplify:  Simplify D into D
1545212221.790 * [misc]taylor:  Taking taylor expansion of (* w h) in c0
1545212221.790 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.790 * [misc]backup-simplify:  Simplify w into w
1545212221.790 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.790 * [misc]backup-simplify:  Simplify h into h
1545212221.790 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.790 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212221.790 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.791 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212221.791 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.791 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212221.791 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.791 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212221.791 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.791 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.791 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.791 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212221.791 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212221.792 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.792 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.792 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212221.792 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.792 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.792 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.792 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (* w (* (pow D 2) h)))) into (* 2 (/ (pow d 2) (* w (* (pow D 2) h))))
1545212221.792 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (* w (* (pow D 2) h)))) in h
1545212221.792 * [misc]taylor:  Taking taylor expansion of 2 in h
1545212221.792 * [misc]backup-simplify:  Simplify 2 into 2
1545212221.792 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212221.792 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212221.792 * [misc]taylor:  Taking taylor expansion of d in h
1545212221.792 * [misc]backup-simplify:  Simplify d into d
1545212221.792 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212221.792 * [misc]taylor:  Taking taylor expansion of w in h
1545212221.792 * [misc]backup-simplify:  Simplify w into w
1545212221.792 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212221.792 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212221.792 * [misc]taylor:  Taking taylor expansion of D in h
1545212221.792 * [misc]backup-simplify:  Simplify D into D
1545212221.792 * [misc]taylor:  Taking taylor expansion of h in h
1545212221.792 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.792 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.792 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.792 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.792 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.792 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212221.792 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.793 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212221.793 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212221.793 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212221.793 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (* w (pow D 2)))) into (* 2 (/ (pow d 2) (* w (pow D 2))))
1545212221.793 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (* w (pow D 2)))) in w
1545212221.793 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212221.793 * [misc]backup-simplify:  Simplify 2 into 2
1545212221.793 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212221.793 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212221.793 * [misc]taylor:  Taking taylor expansion of d in w
1545212221.793 * [misc]backup-simplify:  Simplify d into d
1545212221.793 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212221.793 * [misc]taylor:  Taking taylor expansion of w in w
1545212221.793 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.793 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.793 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212221.793 * [misc]taylor:  Taking taylor expansion of D in w
1545212221.793 * [misc]backup-simplify:  Simplify D into D
1545212221.793 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.793 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.793 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212221.793 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.793 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212221.794 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212221.794 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (pow D 2))) into (* 2 (/ (pow d 2) (pow D 2)))
1545212221.794 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (pow D 2))) in d
1545212221.794 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212221.794 * [misc]backup-simplify:  Simplify 2 into 2
1545212221.794 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212221.794 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212221.794 * [misc]taylor:  Taking taylor expansion of d in d
1545212221.794 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.794 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.794 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212221.794 * [misc]taylor:  Taking taylor expansion of D in d
1545212221.794 * [misc]backup-simplify:  Simplify D into D
1545212221.794 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.794 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.794 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212221.794 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.794 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212221.795 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.795 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212221.795 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212221.795 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.795 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.795 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.796 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.796 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212221.796 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.796 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212221.796 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212221.797 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.797 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.797 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))) into (- 1)
1545212221.798 * [misc]backup-simplify:  Simplify (/ (- (- 1) (pow 0 2) (+)) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2))))
1545212221.798 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.798 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212221.798 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.799 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212221.799 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212221.799 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.799 * [misc]backup-simplify:  Simplify (+ (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 0) into (- (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))))
1545212221.799 * [misc]taylor:  Taking taylor expansion of (- (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) in c0
1545212221.799 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in c0
1545212221.799 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212221.799 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212221.799 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212221.799 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212221.799 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212221.800 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.800 * [misc]backup-simplify:  Simplify D into D
1545212221.800 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212221.800 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.800 * [misc]backup-simplify:  Simplify h into h
1545212221.800 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.800 * [misc]backup-simplify:  Simplify w into w
1545212221.800 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212221.800 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.800 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.800 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.800 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212221.800 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.800 * [misc]backup-simplify:  Simplify d into d
1545212221.800 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.800 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.800 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.800 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.800 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212221.800 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.800 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212221.800 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212221.800 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212221.800 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.800 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.801 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.801 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212221.801 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212221.801 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212221.801 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.801 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.801 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.801 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.801 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.802 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.802 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212221.802 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212221.802 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.802 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.802 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.802 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h))))) into 0
1545212221.803 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.803 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.803 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.803 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.803 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.803 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.803 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212221.803 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212221.803 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212221.804 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (* w (pow D 2))))) into 0
1545212221.804 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.804 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.804 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.804 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.804 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212221.804 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212221.804 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (pow D 2)))) into 0
1545212221.805 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.805 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.805 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.805 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.805 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.805 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.805 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.806 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212221.806 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212221.807 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.807 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.807 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.807 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.807 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.808 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.808 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212221.809 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212221.809 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.810 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.810 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))) into 0
1545212221.811 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))))))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212221.811 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.812 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.812 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.813 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212221.813 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212221.814 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.814 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.814 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212221.814 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.814 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.814 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.814 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212221.815 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.815 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212221.815 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.816 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.816 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212221.817 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212221.817 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.817 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.817 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.817 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.818 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.818 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 h))) into 0
1545212221.818 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.819 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212221.819 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.820 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h)))))) into 0
1545212221.820 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.820 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.820 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.820 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.820 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.820 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.820 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.820 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.820 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.820 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.821 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.821 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.821 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212221.822 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212221.822 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212221.823 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2)))))) into 0
1545212221.823 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.823 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.823 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.823 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.823 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.823 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.823 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.823 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.823 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.823 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.823 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.824 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.824 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212221.825 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212221.825 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2))))) into 0
1545212221.825 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.825 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.825 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.825 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.825 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.825 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.825 * [misc]backup-simplify:  Simplify (* 2 (/ 1 (pow D 2))) into (/ 2 (pow D 2))
1545212221.825 * [misc]taylor:  Taking taylor expansion of (/ 2 (pow D 2)) in D
1545212221.825 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212221.826 * [misc]backup-simplify:  Simplify 2 into 2
1545212221.826 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212221.826 * [misc]taylor:  Taking taylor expansion of D in D
1545212221.826 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.826 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.826 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.826 * [misc]backup-simplify:  Simplify (/ 2 1) into 2
1545212221.826 * [misc]backup-simplify:  Simplify 2 into 2
1545212221.827 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212221.828 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212221.828 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212221.829 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212221.829 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212221.830 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.830 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.831 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.831 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212221.832 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212221.832 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212221.833 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212221.833 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212221.834 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.834 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.835 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))))) into 0
1545212221.836 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 2) (+ (* 2 (* 0 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))))
1545212221.837 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212221.837 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212221.838 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212221.838 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212221.839 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212221.840 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.841 * [misc]backup-simplify:  Simplify (+ (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))) 0) into (- (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))))
1545212221.841 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))))) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212221.841 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212221.841 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of (* (pow D 6) (* (pow h 3) (pow w 3))) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of (pow D 6) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.841 * [misc]backup-simplify:  Simplify D into D
1545212221.841 * [misc]taylor:  Taking taylor expansion of (* (pow h 3) (pow w 3)) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of (pow h 3) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.841 * [misc]backup-simplify:  Simplify h into h
1545212221.841 * [misc]taylor:  Taking taylor expansion of (pow w 3) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.841 * [misc]backup-simplify:  Simplify w into w
1545212221.841 * [misc]taylor:  Taking taylor expansion of (* (pow c0 3) (pow d 6)) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of (pow c0 3) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.841 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.841 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.841 * [misc]taylor:  Taking taylor expansion of (pow d 6) in c0
1545212221.841 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.841 * [misc]backup-simplify:  Simplify d into d
1545212221.841 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.841 * [misc]backup-simplify:  Simplify (* D (pow D 2)) into (pow D 3)
1545212221.842 * [misc]backup-simplify:  Simplify (* (pow D 3) (pow D 3)) into (pow D 6)
1545212221.842 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212221.842 * [misc]backup-simplify:  Simplify (* h (pow h 2)) into (pow h 3)
1545212221.842 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212221.842 * [misc]backup-simplify:  Simplify (* w (pow w 2)) into (pow w 3)
1545212221.842 * [misc]backup-simplify:  Simplify (* (pow h 3) (pow w 3)) into (* (pow h 3) (pow w 3))
1545212221.842 * [misc]backup-simplify:  Simplify (* (pow D 6) (* (pow h 3) (pow w 3))) into (* (pow D 6) (* (pow h 3) (pow w 3)))
1545212221.842 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.842 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.843 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.843 * [misc]backup-simplify:  Simplify (* d (pow d 2)) into (pow d 3)
1545212221.843 * [misc]backup-simplify:  Simplify (* (pow d 3) (pow d 3)) into (pow d 6)
1545212221.843 * [misc]backup-simplify:  Simplify (* 1 (pow d 6)) into (pow d 6)
1545212221.843 * [misc]backup-simplify:  Simplify (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) into (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))
1545212221.843 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212221.844 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212221.844 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212221.844 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212221.844 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212221.844 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 (pow h 2))) into 0
1545212221.845 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212221.845 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212221.845 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212221.845 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (pow w 2))) into 0
1545212221.846 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212221.846 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212221.847 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3))))) into 0
1545212221.847 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.847 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 (pow D 2))) into 0
1545212221.847 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (* 0 (pow D 3))) into 0
1545212221.847 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (* 0 (pow w 3)))) into 0
1545212221.847 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.848 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212221.848 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (* 0 (pow D 3)))) into 0
1545212221.848 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (* 0 (pow w 3))) into 0
1545212221.849 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.849 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212221.849 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3))))) into 0
1545212221.850 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3)))))) into 0
1545212221.850 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.850 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.851 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.851 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.851 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 (pow d 2))) into 0
1545212221.851 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212221.852 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3))))) into 0
1545212221.852 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212221.852 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212221.853 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (* 0 (pow d 3)))) into 0
1545212221.853 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212221.853 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212221.853 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (* 0 (pow d 3))) into 0
1545212221.854 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212221.854 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212221.854 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6))))) into 0
1545212221.855 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (* 0 (* (pow h 3) (pow w 3)))) into 0
1545212221.855 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow d 6))) into 0
1545212221.855 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))))) into 0
1545212221.856 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 6)))) into 0
1545212221.856 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))) into 0
1545212221.857 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212221.857 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212221.858 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)))))) into 0
1545212221.858 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.858 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.859 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.859 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.859 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212221.859 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.860 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212221.860 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212221.861 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212221.861 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212221.862 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212221.862 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.862 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.862 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.862 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.862 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.863 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212221.863 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212221.864 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212221.864 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.865 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212221.865 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.866 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h))))))) into 0
1545212221.866 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.866 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.866 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.866 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.866 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.866 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.866 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.866 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.866 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.866 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.867 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.867 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.867 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.867 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.867 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.867 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.867 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.867 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.867 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.868 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212221.868 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212221.869 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212221.869 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212221.870 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2))))))) into 0
1545212221.870 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.870 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.870 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.870 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.870 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.870 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.870 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.870 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.870 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.871 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.871 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.871 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.871 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.871 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.871 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.871 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.871 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.871 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.871 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.871 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.871 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.871 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.871 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.872 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212221.873 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212221.873 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212221.874 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2)))))) into 0
1545212221.874 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.874 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.874 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.874 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.874 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.874 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.874 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.874 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.874 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.874 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.874 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.874 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.875 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212221.875 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.875 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212221.875 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ 1 (pow D 2)))) into 0
1545212221.875 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.875 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.876 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212221.876 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* 2 (/ 0 1)))) into 0
1545212221.876 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.876 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.877 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212221.878 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212221.878 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212221.879 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212221.880 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212221.881 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.881 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.881 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.882 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212221.882 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212221.883 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212221.884 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212221.884 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212221.886 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.886 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.887 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))))) into 0
1545212221.888 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))))) (* 2 (* (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212221.889 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212221.889 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212221.890 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212221.891 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212221.891 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212221.892 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.892 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.893 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212221.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.893 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.893 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212221.894 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2)))))) into 0
1545212221.894 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212221.895 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2)))))) into 0
1545212221.895 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3)))))) into 0
1545212221.896 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212221.896 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212221.897 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3)))))) into 0
1545212221.897 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))))) into 0
1545212221.898 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212221.898 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212221.899 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3)))))) into 0
1545212221.899 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212221.900 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212221.900 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6)))))) into 0
1545212221.901 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212221.904 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))))))) into 0
1545212221.904 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.904 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.904 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.904 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.904 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.904 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212221.905 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212221.905 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212221.905 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212221.906 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212221.906 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212221.907 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))))) into 0
1545212221.907 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.907 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.907 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.907 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.907 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.907 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212221.908 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212221.908 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212221.908 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212221.909 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212221.909 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212221.910 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h)))))))) into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.910 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.911 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212221.911 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212221.911 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212221.912 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212221.912 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212221.912 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2)))))))) into 0
1545212221.912 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.913 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.914 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212221.915 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212221.915 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212221.915 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212221.916 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2))))))) into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.917 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.917 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.917 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.917 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.917 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.917 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.917 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.917 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.917 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212221.917 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.918 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212221.918 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2))))) into 0
1545212221.918 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212221.918 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.918 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.918 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.918 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.919 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.919 * [misc]backup-simplify:  Simplify (* 2 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) (* c0 1)))))) into (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212221.920 * [misc]backup-simplify:  Simplify (+ (sqrt (* (+ (/ 1 M) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) (- (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) (/ 1 M)))) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) into (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))
1545212221.920 * [misc]approximate:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in (M c0 h w d D) around 0
1545212221.920 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of D in D
1545212221.920 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.920 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.920 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of h in D
1545212221.920 * [misc]backup-simplify:  Simplify h into h
1545212221.920 * [misc]taylor:  Taking taylor expansion of w in D
1545212221.920 * [misc]backup-simplify:  Simplify w into w
1545212221.920 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212221.920 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.920 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of d in D
1545212221.920 * [misc]backup-simplify:  Simplify d into d
1545212221.920 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.920 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.920 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212221.920 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.920 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.920 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212221.920 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212221.920 * [misc]taylor:  Taking taylor expansion of D in D
1545212221.921 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.921 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.921 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of h in D
1545212221.921 * [misc]backup-simplify:  Simplify h into h
1545212221.921 * [misc]taylor:  Taking taylor expansion of w in D
1545212221.921 * [misc]backup-simplify:  Simplify w into w
1545212221.921 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212221.921 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.921 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of d in D
1545212221.921 * [misc]backup-simplify:  Simplify d into d
1545212221.921 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.921 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.921 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212221.921 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.921 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.921 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212221.921 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of M in D
1545212221.921 * [misc]backup-simplify:  Simplify M into M
1545212221.921 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.921 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of D in D
1545212221.921 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.921 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.921 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of h in D
1545212221.921 * [misc]backup-simplify:  Simplify h into h
1545212221.921 * [misc]taylor:  Taking taylor expansion of w in D
1545212221.921 * [misc]backup-simplify:  Simplify w into w
1545212221.921 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212221.921 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.921 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212221.921 * [misc]taylor:  Taking taylor expansion of d in D
1545212221.921 * [misc]backup-simplify:  Simplify d into d
1545212221.922 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.922 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.922 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212221.922 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.922 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.922 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212221.922 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212221.922 * [misc]taylor:  Taking taylor expansion of M in D
1545212221.922 * [misc]backup-simplify:  Simplify M into M
1545212221.922 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.922 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212221.922 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212221.922 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212221.922 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212221.922 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212221.922 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212221.922 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.922 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212221.923 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.923 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.923 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) 0) (* 0 (/ 1 M))) into 0
1545212221.923 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212221.923 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in d
1545212221.923 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212221.923 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212221.923 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212221.923 * [misc]taylor:  Taking taylor expansion of D in d
1545212221.923 * [misc]backup-simplify:  Simplify D into D
1545212221.923 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212221.923 * [misc]taylor:  Taking taylor expansion of h in d
1545212221.923 * [misc]backup-simplify:  Simplify h into h
1545212221.923 * [misc]taylor:  Taking taylor expansion of w in d
1545212221.923 * [misc]backup-simplify:  Simplify w into w
1545212221.923 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212221.923 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212221.923 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.923 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212221.923 * [misc]taylor:  Taking taylor expansion of d in d
1545212221.923 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.923 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.923 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.923 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.923 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.923 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.923 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212221.924 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212221.924 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of D in d
1545212221.924 * [misc]backup-simplify:  Simplify D into D
1545212221.924 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of h in d
1545212221.924 * [misc]backup-simplify:  Simplify h into h
1545212221.924 * [misc]taylor:  Taking taylor expansion of w in d
1545212221.924 * [misc]backup-simplify:  Simplify w into w
1545212221.924 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212221.924 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.924 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of d in d
1545212221.924 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.924 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.924 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.924 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.924 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.924 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.924 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212221.924 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212221.924 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of M in d
1545212221.924 * [misc]backup-simplify:  Simplify M into M
1545212221.924 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.924 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of D in d
1545212221.924 * [misc]backup-simplify:  Simplify D into D
1545212221.924 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212221.924 * [misc]taylor:  Taking taylor expansion of h in d
1545212221.924 * [misc]backup-simplify:  Simplify h into h
1545212221.924 * [misc]taylor:  Taking taylor expansion of w in d
1545212221.924 * [misc]backup-simplify:  Simplify w into w
1545212221.925 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212221.925 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212221.925 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.925 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212221.925 * [misc]taylor:  Taking taylor expansion of d in d
1545212221.925 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.925 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.925 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.925 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.925 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.925 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.925 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212221.925 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212221.925 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212221.925 * [misc]taylor:  Taking taylor expansion of M in d
1545212221.925 * [misc]backup-simplify:  Simplify M into M
1545212221.925 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.925 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212221.925 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212221.925 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) c0) (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212221.926 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212221.926 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212221.926 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.926 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.926 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212221.926 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212221.926 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212221.926 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.926 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212221.927 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.927 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.927 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212221.927 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212221.927 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212221.927 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.927 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) c0) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212221.928 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212221.928 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in w
1545212221.928 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212221.928 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212221.928 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212221.928 * [misc]taylor:  Taking taylor expansion of D in w
1545212221.928 * [misc]backup-simplify:  Simplify D into D
1545212221.928 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212221.928 * [misc]taylor:  Taking taylor expansion of h in w
1545212221.928 * [misc]backup-simplify:  Simplify h into h
1545212221.928 * [misc]taylor:  Taking taylor expansion of w in w
1545212221.928 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.928 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.928 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212221.928 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212221.928 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.928 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212221.928 * [misc]taylor:  Taking taylor expansion of d in w
1545212221.928 * [misc]backup-simplify:  Simplify d into d
1545212221.928 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.928 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212221.928 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.928 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212221.928 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.928 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212221.928 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.928 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.929 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212221.929 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in w
1545212221.929 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in w
1545212221.929 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212221.929 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212221.929 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212221.929 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212221.929 * [misc]taylor:  Taking taylor expansion of D in w
1545212221.929 * [misc]backup-simplify:  Simplify D into D
1545212221.929 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212221.929 * [misc]taylor:  Taking taylor expansion of h in w
1545212221.929 * [misc]backup-simplify:  Simplify h into h
1545212221.929 * [misc]taylor:  Taking taylor expansion of w in w
1545212221.929 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.929 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.929 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212221.929 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212221.929 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.929 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212221.929 * [misc]taylor:  Taking taylor expansion of d in w
1545212221.929 * [misc]backup-simplify:  Simplify d into d
1545212221.929 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.929 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212221.929 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.929 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212221.929 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.929 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212221.929 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.929 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.930 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212221.930 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212221.930 * [misc]taylor:  Taking taylor expansion of M in w
1545212221.930 * [misc]backup-simplify:  Simplify M into M
1545212221.930 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.930 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212221.930 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212221.930 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212221.930 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212221.930 * [misc]taylor:  Taking taylor expansion of D in w
1545212221.930 * [misc]backup-simplify:  Simplify D into D
1545212221.930 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212221.930 * [misc]taylor:  Taking taylor expansion of h in w
1545212221.930 * [misc]backup-simplify:  Simplify h into h
1545212221.930 * [misc]taylor:  Taking taylor expansion of w in w
1545212221.930 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.930 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.930 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212221.930 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212221.930 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.930 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212221.930 * [misc]taylor:  Taking taylor expansion of d in w
1545212221.930 * [misc]backup-simplify:  Simplify d into d
1545212221.930 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.930 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212221.930 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.930 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212221.930 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.930 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212221.930 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.931 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.931 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212221.931 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212221.931 * [misc]taylor:  Taking taylor expansion of M in w
1545212221.931 * [misc]backup-simplify:  Simplify M into M
1545212221.931 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.931 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212221.931 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212221.931 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212221.931 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212221.931 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212221.931 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212221.931 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212221.931 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212221.932 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.932 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212221.932 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (/ (* (pow D 2) h) (* c0 (pow d 2))) (/ 1 M))) into 0
1545212221.933 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212221.933 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in h
1545212221.933 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212221.933 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212221.933 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212221.933 * [misc]taylor:  Taking taylor expansion of D in h
1545212221.933 * [misc]backup-simplify:  Simplify D into D
1545212221.933 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212221.933 * [misc]taylor:  Taking taylor expansion of h in h
1545212221.933 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.933 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.933 * [misc]taylor:  Taking taylor expansion of w in h
1545212221.933 * [misc]backup-simplify:  Simplify w into w
1545212221.933 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212221.933 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212221.933 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.933 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212221.933 * [misc]taylor:  Taking taylor expansion of d in h
1545212221.933 * [misc]backup-simplify:  Simplify d into d
1545212221.933 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.933 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212221.933 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.933 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212221.934 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.934 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212221.934 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.934 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.934 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212221.934 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in h
1545212221.934 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in h
1545212221.934 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212221.934 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212221.934 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212221.934 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212221.934 * [misc]taylor:  Taking taylor expansion of D in h
1545212221.934 * [misc]backup-simplify:  Simplify D into D
1545212221.935 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212221.935 * [misc]taylor:  Taking taylor expansion of h in h
1545212221.935 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.935 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.935 * [misc]taylor:  Taking taylor expansion of w in h
1545212221.935 * [misc]backup-simplify:  Simplify w into w
1545212221.935 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212221.935 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212221.935 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.935 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212221.935 * [misc]taylor:  Taking taylor expansion of d in h
1545212221.935 * [misc]backup-simplify:  Simplify d into d
1545212221.935 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.935 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212221.935 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.935 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212221.935 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.936 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212221.936 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.936 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.936 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212221.936 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212221.936 * [misc]taylor:  Taking taylor expansion of M in h
1545212221.936 * [misc]backup-simplify:  Simplify M into M
1545212221.936 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.936 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212221.936 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212221.936 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212221.936 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212221.936 * [misc]taylor:  Taking taylor expansion of D in h
1545212221.936 * [misc]backup-simplify:  Simplify D into D
1545212221.936 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212221.936 * [misc]taylor:  Taking taylor expansion of h in h
1545212221.936 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.936 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.936 * [misc]taylor:  Taking taylor expansion of w in h
1545212221.936 * [misc]backup-simplify:  Simplify w into w
1545212221.936 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212221.936 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212221.936 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.936 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212221.936 * [misc]taylor:  Taking taylor expansion of d in h
1545212221.936 * [misc]backup-simplify:  Simplify d into d
1545212221.937 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.937 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212221.937 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.937 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212221.937 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.937 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212221.937 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.937 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.938 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212221.938 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212221.938 * [misc]taylor:  Taking taylor expansion of M in h
1545212221.938 * [misc]backup-simplify:  Simplify M into M
1545212221.938 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.938 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212221.938 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212221.938 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212221.938 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212221.938 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212221.938 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212221.939 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212221.939 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212221.939 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.939 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212221.940 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (/ (* (pow D 2) w) (* c0 (pow d 2))) (/ 1 M))) into (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M))))
1545212221.940 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M)))) (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212221.940 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in c0
1545212221.940 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212221.940 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212221.941 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212221.941 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.941 * [misc]backup-simplify:  Simplify D into D
1545212221.941 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212221.941 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.941 * [misc]backup-simplify:  Simplify h into h
1545212221.941 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.941 * [misc]backup-simplify:  Simplify w into w
1545212221.941 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212221.941 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.941 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.941 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.941 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212221.941 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.941 * [misc]backup-simplify:  Simplify d into d
1545212221.941 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.941 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.941 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.941 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.941 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212221.941 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.942 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212221.942 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212221.942 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in c0
1545212221.942 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in c0
1545212221.942 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212221.942 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212221.942 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212221.942 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212221.942 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.942 * [misc]backup-simplify:  Simplify D into D
1545212221.942 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212221.942 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.942 * [misc]backup-simplify:  Simplify h into h
1545212221.942 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.942 * [misc]backup-simplify:  Simplify w into w
1545212221.942 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212221.942 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.942 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.942 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.942 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212221.942 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.942 * [misc]backup-simplify:  Simplify d into d
1545212221.942 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.942 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.943 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.943 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.943 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212221.943 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.943 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212221.943 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212221.943 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212221.943 * [misc]taylor:  Taking taylor expansion of M in c0
1545212221.943 * [misc]backup-simplify:  Simplify M into M
1545212221.943 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.943 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212221.943 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212221.943 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212221.944 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212221.944 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.944 * [misc]backup-simplify:  Simplify D into D
1545212221.944 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212221.944 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.944 * [misc]backup-simplify:  Simplify h into h
1545212221.944 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.944 * [misc]backup-simplify:  Simplify w into w
1545212221.944 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212221.944 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.944 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.944 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.944 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212221.944 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.944 * [misc]backup-simplify:  Simplify d into d
1545212221.944 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.944 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.944 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.944 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.944 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212221.944 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.945 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212221.945 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212221.945 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212221.945 * [misc]taylor:  Taking taylor expansion of M in c0
1545212221.945 * [misc]backup-simplify:  Simplify M into M
1545212221.945 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212221.945 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212221.945 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212221.946 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212221.946 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212221.946 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212221.946 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.946 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.947 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.947 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212221.947 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212221.947 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212221.948 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212221.948 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.948 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.948 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.948 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212221.949 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212221.949 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212221.949 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212221.949 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 1 M)) (* (- (/ 1 M)) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212221.950 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212221.950 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212221.950 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212221.950 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212221.950 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.950 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.950 * [misc]backup-simplify:  Simplify D into D
1545212221.950 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212221.950 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.950 * [misc]backup-simplify:  Simplify h into h
1545212221.950 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.950 * [misc]backup-simplify:  Simplify w into w
1545212221.950 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.950 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.950 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.950 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.950 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.950 * [misc]backup-simplify:  Simplify d into d
1545212221.950 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.950 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.951 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.951 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.951 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.951 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212221.951 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212221.951 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212221.951 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212221.951 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212221.951 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212221.951 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.951 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.951 * [misc]backup-simplify:  Simplify D into D
1545212221.951 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212221.951 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.951 * [misc]backup-simplify:  Simplify h into h
1545212221.951 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.951 * [misc]backup-simplify:  Simplify w into w
1545212221.951 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.951 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.951 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.951 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.951 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.951 * [misc]backup-simplify:  Simplify d into d
1545212221.952 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.952 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.952 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.952 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.952 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.952 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212221.952 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212221.952 * [misc]taylor:  Taking taylor expansion of M in M
1545212221.952 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.952 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.952 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212221.952 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212221.952 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212221.952 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212221.952 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.952 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.953 * [misc]backup-simplify:  Simplify D into D
1545212221.953 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212221.953 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.953 * [misc]backup-simplify:  Simplify h into h
1545212221.953 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.953 * [misc]backup-simplify:  Simplify w into w
1545212221.953 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.953 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.953 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.953 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.953 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.953 * [misc]backup-simplify:  Simplify d into d
1545212221.953 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.953 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.953 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.953 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.953 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.953 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212221.953 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212221.953 * [misc]taylor:  Taking taylor expansion of M in M
1545212221.953 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.953 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.954 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212221.954 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212221.954 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212221.954 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212221.954 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212221.954 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212221.955 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212221.955 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212221.955 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212221.955 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.956 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212221.956 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212221.957 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212221.957 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212221.957 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212221.957 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212221.957 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.957 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.957 * [misc]backup-simplify:  Simplify D into D
1545212221.957 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212221.957 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.957 * [misc]backup-simplify:  Simplify h into h
1545212221.957 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.957 * [misc]backup-simplify:  Simplify w into w
1545212221.957 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.957 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.957 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.957 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.958 * [misc]backup-simplify:  Simplify d into d
1545212221.958 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.958 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.958 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.958 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.958 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.958 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212221.958 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.958 * [misc]backup-simplify:  Simplify D into D
1545212221.958 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.958 * [misc]backup-simplify:  Simplify h into h
1545212221.958 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.958 * [misc]backup-simplify:  Simplify w into w
1545212221.958 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.958 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.958 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.958 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.958 * [misc]backup-simplify:  Simplify d into d
1545212221.958 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.958 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.958 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.958 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.958 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.959 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212221.959 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212221.959 * [misc]taylor:  Taking taylor expansion of M in M
1545212221.959 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.959 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.959 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212221.959 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212221.959 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212221.959 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212221.959 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212221.959 * [misc]taylor:  Taking taylor expansion of D in M
1545212221.959 * [misc]backup-simplify:  Simplify D into D
1545212221.959 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212221.959 * [misc]taylor:  Taking taylor expansion of h in M
1545212221.959 * [misc]backup-simplify:  Simplify h into h
1545212221.959 * [misc]taylor:  Taking taylor expansion of w in M
1545212221.959 * [misc]backup-simplify:  Simplify w into w
1545212221.959 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212221.959 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212221.959 * [misc]backup-simplify:  Simplify c0 into c0
1545212221.959 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212221.959 * [misc]taylor:  Taking taylor expansion of d in M
1545212221.959 * [misc]backup-simplify:  Simplify d into d
1545212221.959 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.959 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.959 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.959 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.959 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212221.959 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212221.959 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212221.959 * [misc]taylor:  Taking taylor expansion of M in M
1545212221.959 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.959 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.960 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212221.960 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212221.960 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212221.960 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212221.960 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212221.960 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212221.960 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212221.960 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212221.961 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212221.961 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.961 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212221.961 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212221.962 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212221.962 * [misc]backup-simplify:  Simplify (+ 0 (sqrt -1)) into (sqrt -1)
1545212221.962 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212221.962 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212221.962 * [misc]backup-simplify:  Simplify -1 into -1
1545212221.962 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212221.962 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212221.962 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212221.963 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212221.963 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212221.963 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212221.963 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.963 * [misc]backup-simplify:  Simplify D into D
1545212221.963 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212221.963 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.963 * [misc]backup-simplify:  Simplify h into h
1545212221.963 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.963 * [misc]backup-simplify:  Simplify w into w
1545212221.963 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212221.963 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.963 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.963 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.963 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212221.963 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.963 * [misc]backup-simplify:  Simplify d into d
1545212221.963 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.963 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212221.963 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212221.963 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.963 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212221.963 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.963 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212221.963 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212221.963 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212221.963 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212221.963 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212221.963 * [misc]taylor:  Taking taylor expansion of D in h
1545212221.963 * [misc]backup-simplify:  Simplify D into D
1545212221.963 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212221.963 * [misc]taylor:  Taking taylor expansion of h in h
1545212221.963 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.963 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.963 * [misc]taylor:  Taking taylor expansion of w in h
1545212221.963 * [misc]backup-simplify:  Simplify w into w
1545212221.964 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212221.964 * [misc]taylor:  Taking taylor expansion of d in h
1545212221.964 * [misc]backup-simplify:  Simplify d into d
1545212221.964 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.964 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212221.964 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.964 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212221.964 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.964 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212221.964 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.964 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212221.964 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212221.964 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212221.964 * [misc]backup-simplify:  Simplify -1 into -1
1545212221.964 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212221.964 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212221.965 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212221.965 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212221.965 * [misc]backup-simplify:  Simplify -1 into -1
1545212221.965 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212221.965 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212221.965 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212221.965 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212221.965 * [misc]backup-simplify:  Simplify -1 into -1
1545212221.965 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212221.965 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212221.965 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212221.965 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.965 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.965 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.965 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.966 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212221.966 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212221.966 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.966 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.966 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.966 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.966 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212221.966 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212221.967 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.967 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212221.967 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.967 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.967 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.967 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212221.967 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212221.967 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212221.967 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.968 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.968 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212221.969 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212221.969 * [misc]backup-simplify:  Simplify (+ 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))))
1545212221.969 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212221.969 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212221.969 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212221.969 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212221.969 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.970 * [misc]backup-simplify:  Simplify D into D
1545212221.970 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of h in c0
1545212221.970 * [misc]backup-simplify:  Simplify h into h
1545212221.970 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of w in c0
1545212221.970 * [misc]backup-simplify:  Simplify w into w
1545212221.970 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212221.970 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.970 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.970 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of d in c0
1545212221.970 * [misc]backup-simplify:  Simplify d into d
1545212221.970 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212221.970 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212221.970 * [misc]backup-simplify:  Simplify -1 into -1
1545212221.970 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212221.970 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212221.970 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.971 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212221.971 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212221.971 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212221.971 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212221.971 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212221.971 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.971 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.971 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212221.971 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212221.971 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212221.972 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212221.972 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212221.973 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212221.973 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212221.974 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212221.974 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.974 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.974 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.974 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.974 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.974 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.974 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212221.974 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.974 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212221.974 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.974 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212221.974 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212221.974 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.974 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.974 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.975 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.975 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.975 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.975 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.975 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.975 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.975 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.975 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.975 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.975 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212221.975 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212221.975 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212221.975 * [misc]taylor:  Taking taylor expansion of D in w
1545212221.975 * [misc]backup-simplify:  Simplify D into D
1545212221.975 * [misc]taylor:  Taking taylor expansion of w in w
1545212221.975 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.975 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.975 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212221.975 * [misc]taylor:  Taking taylor expansion of d in w
1545212221.975 * [misc]backup-simplify:  Simplify d into d
1545212221.975 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.975 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212221.975 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212221.975 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212221.975 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212221.975 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212221.975 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.975 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.975 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.975 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.975 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.975 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.976 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212221.976 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.976 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212221.976 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.976 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212221.977 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212221.977 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212221.977 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.977 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212221.977 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.977 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212221.978 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212221.978 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212221.978 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.978 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212221.978 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.979 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212221.979 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.979 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212221.979 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212221.979 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212221.979 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.980 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.980 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212221.981 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212221.981 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.981 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212221.981 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.981 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212221.981 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212221.981 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212221.981 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.982 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212221.982 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212221.983 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212221.983 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212221.983 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212221.983 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212221.983 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212221.984 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212221.984 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212221.985 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212221.985 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.985 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.985 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.985 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.985 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.985 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.985 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212221.985 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.986 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212221.986 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.986 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.986 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212221.986 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.986 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.986 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.986 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.986 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.986 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.987 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212221.987 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212221.987 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.987 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.987 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.987 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.987 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.987 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.987 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.988 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.988 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.988 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.988 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.988 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.988 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.988 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.988 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.988 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.988 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.988 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212221.988 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212221.988 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212221.988 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212221.988 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212221.988 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.988 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.989 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.989 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.989 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212221.989 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212221.989 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.989 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.989 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.990 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.990 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.990 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.990 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.990 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.990 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.990 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212221.990 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212221.990 * [misc]taylor:  Taking taylor expansion of D in d
1545212221.990 * [misc]backup-simplify:  Simplify D into D
1545212221.990 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212221.990 * [misc]taylor:  Taking taylor expansion of d in d
1545212221.990 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.990 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.990 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212221.990 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212221.990 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212221.990 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212221.990 * [misc]taylor:  Taking taylor expansion of D in D
1545212221.990 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.990 * [misc]backup-simplify:  Simplify 1 into 1
1545212221.990 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.990 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.991 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212221.991 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212221.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212221.991 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212221.991 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212221.991 * [misc]backup-simplify:  Simplify -1 into -1
1545212221.991 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212221.991 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212221.991 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212221.992 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212221.992 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.992 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212221.993 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.993 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.993 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212221.993 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212221.994 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.994 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212221.994 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.994 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.995 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212221.995 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212221.995 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.995 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212221.995 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212221.996 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212221.996 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212221.996 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212221.997 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212221.997 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212221.997 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212221.997 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212221.998 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212221.999 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212221.999 * [misc]backup-simplify:  Simplify (+ 0 (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) into (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))))
1545212221.999 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) in c0
1545212221.999 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212221.999 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212221.999 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212221.999 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212221.999 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212221.999 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212221.999 * [misc]taylor:  Taking taylor expansion of D in c0
1545212221.999 * [misc]backup-simplify:  Simplify D into D
1545212222.000 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212222.000 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212222.000 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.000 * [misc]backup-simplify:  Simplify h into h
1545212222.000 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212222.000 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.000 * [misc]backup-simplify:  Simplify w into w
1545212222.000 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212222.000 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212222.000 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.000 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.000 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.000 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212222.000 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212222.000 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.000 * [misc]backup-simplify:  Simplify d into d
1545212222.000 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212222.000 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212222.000 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.000 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.000 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.000 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.000 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.000 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212222.000 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212222.000 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212222.000 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212222.000 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212222.000 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212222.001 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212222.001 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212222.001 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.001 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.001 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.001 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212222.001 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212222.001 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212222.001 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212222.002 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212222.002 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212222.002 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212222.002 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.002 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212222.002 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.003 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212222.003 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212222.003 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212222.003 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212222.003 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212222.003 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212222.003 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212222.004 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212222.004 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212222.004 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212222.004 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.004 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212222.004 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212222.005 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212222.005 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.005 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212222.005 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212222.005 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212222.005 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.006 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212222.006 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212222.006 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212222.007 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212222.007 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.007 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212222.008 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212222.008 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212222.008 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212222.008 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.008 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212222.008 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212222.008 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212222.009 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.009 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212222.009 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212222.009 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212222.009 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.010 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212222.010 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212222.010 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212222.010 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.010 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.010 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212222.011 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.011 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.011 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212222.011 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.013 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.014 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212222.014 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212222.015 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212222.016 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212222.016 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212222.017 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212222.018 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212222.019 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212222.020 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212222.021 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.021 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.021 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.021 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.021 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.021 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.021 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.021 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.021 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.021 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.021 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.021 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.021 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.022 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.022 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212222.022 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212222.023 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.023 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212222.024 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212222.024 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.024 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.025 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212222.025 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212222.026 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.027 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212222.028 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212222.029 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212222.029 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.029 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.029 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.029 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.029 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.029 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.030 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.030 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.030 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.031 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.032 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212222.032 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.032 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.032 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.032 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.032 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.032 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.032 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.033 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.033 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.034 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.034 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.034 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.034 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.034 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.034 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.034 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.034 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.035 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.035 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212222.035 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.035 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.035 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.035 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.035 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.035 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.036 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.036 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.037 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.037 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.037 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.037 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.037 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.037 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.037 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.037 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.037 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.037 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.037 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.038 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.038 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212222.038 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.038 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 M)))))))) into (* (sqrt -1) M)
1545212222.040 * [misc]backup-simplify:  Simplify (+ (sqrt (* (+ (/ 1 (- M)) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) (- (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) (/ 1 (- M))))) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) into (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212222.040 * [misc]approximate:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (M c0 h w d D) around 0
1545212222.040 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212222.040 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.040 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of M in D
1545212222.040 * [misc]backup-simplify:  Simplify M into M
1545212222.040 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.040 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.040 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.040 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.040 * [misc]backup-simplify:  Simplify h into h
1545212222.040 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.040 * [misc]backup-simplify:  Simplify w into w
1545212222.040 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.040 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.040 * [misc]backup-simplify:  Simplify d into d
1545212222.040 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.040 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.040 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.040 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.040 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.040 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.040 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.041 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212222.041 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212222.041 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212222.041 * [misc]taylor:  Taking taylor expansion of M in D
1545212222.041 * [misc]backup-simplify:  Simplify M into M
1545212222.041 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.041 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212222.041 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.041 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.041 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.041 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.041 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.041 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.041 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.041 * [misc]backup-simplify:  Simplify h into h
1545212222.041 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.041 * [misc]backup-simplify:  Simplify w into w
1545212222.041 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212222.041 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.041 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.041 * [misc]backup-simplify:  Simplify d into d
1545212222.041 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.041 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.041 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.041 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.041 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.041 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.041 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.041 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212222.041 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212222.041 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212222.041 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212222.041 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212222.042 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212222.042 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212222.042 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.042 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212222.042 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.042 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) 0) (* 0 (/ 1 M))) into 0
1545212222.042 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212222.042 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212222.042 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212222.042 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.042 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.042 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.042 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.042 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.042 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.042 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.042 * [misc]backup-simplify:  Simplify h into h
1545212222.042 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.042 * [misc]backup-simplify:  Simplify w into w
1545212222.042 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212222.042 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.042 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.042 * [misc]backup-simplify:  Simplify d into d
1545212222.043 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.043 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.043 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.043 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.043 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.043 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.043 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.043 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212222.043 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212222.043 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.043 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of M in d
1545212222.043 * [misc]backup-simplify:  Simplify M into M
1545212222.043 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.043 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.043 * [misc]backup-simplify:  Simplify D into D
1545212222.043 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.043 * [misc]backup-simplify:  Simplify h into h
1545212222.043 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.043 * [misc]backup-simplify:  Simplify w into w
1545212222.043 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.043 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.043 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.043 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.043 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.043 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.043 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.044 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.044 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.044 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212222.044 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212222.044 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212222.044 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212222.044 * [misc]taylor:  Taking taylor expansion of M in d
1545212222.044 * [misc]backup-simplify:  Simplify M into M
1545212222.044 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.044 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212222.044 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.044 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.044 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.044 * [misc]backup-simplify:  Simplify D into D
1545212222.044 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.044 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.044 * [misc]backup-simplify:  Simplify h into h
1545212222.044 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.044 * [misc]backup-simplify:  Simplify w into w
1545212222.044 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212222.044 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.044 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.044 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.044 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.044 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.044 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.044 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.044 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.044 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.044 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212222.045 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212222.045 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) c0)) into (- (/ (* (pow D 2) (* h w)) c0))
1545212222.045 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) c0))) into (- (/ (* (pow D 2) (* h w)) c0))
1545212222.045 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 2) (* h w)) c0)
1545212222.045 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) c0)) (/ (* (pow D 2) (* h w)) c0)) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))
1545212222.045 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212222.046 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212222.046 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.046 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.046 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.046 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.046 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212222.046 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212222.046 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.046 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.046 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.046 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.047 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.047 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212222.047 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212222.047 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.047 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.047 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) c0)) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212222.048 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212222.048 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212222.048 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212222.048 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.048 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.048 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.048 * [misc]backup-simplify:  Simplify D into D
1545212222.048 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.048 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.048 * [misc]backup-simplify:  Simplify h into h
1545212222.048 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.048 * [misc]backup-simplify:  Simplify w into w
1545212222.048 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212222.048 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.048 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.048 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.048 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.048 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.048 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.048 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.048 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.048 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.048 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.048 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212222.049 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212222.049 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212222.049 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.049 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of M in w
1545212222.049 * [misc]backup-simplify:  Simplify M into M
1545212222.049 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.049 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.049 * [misc]backup-simplify:  Simplify D into D
1545212222.049 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.049 * [misc]backup-simplify:  Simplify h into h
1545212222.049 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.049 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.049 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.049 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.049 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.049 * [misc]backup-simplify:  Simplify d into d
1545212222.049 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.049 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.049 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.049 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.049 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.049 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.049 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.050 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.050 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.050 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.050 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.050 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212222.050 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212222.050 * [misc]taylor:  Taking taylor expansion of M in w
1545212222.050 * [misc]backup-simplify:  Simplify M into M
1545212222.050 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.050 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212222.050 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.050 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.050 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.050 * [misc]backup-simplify:  Simplify D into D
1545212222.050 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.050 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.050 * [misc]backup-simplify:  Simplify h into h
1545212222.050 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.050 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.050 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212222.050 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.050 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.050 * [misc]backup-simplify:  Simplify d into d
1545212222.050 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.050 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.050 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.050 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.050 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.050 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.050 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.051 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.051 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.051 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.051 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.051 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212222.051 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212222.051 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212222.051 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212222.051 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212222.051 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212222.051 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.051 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212222.052 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212222.052 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) h) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212222.052 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) (/ 1 M))) into 0
1545212222.052 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212222.052 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212222.052 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212222.052 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.052 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.052 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.052 * [misc]backup-simplify:  Simplify D into D
1545212222.052 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.052 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.052 * [misc]backup-simplify:  Simplify h into h
1545212222.052 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.053 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.053 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212222.053 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.053 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.053 * [misc]backup-simplify:  Simplify d into d
1545212222.053 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.053 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.053 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.053 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.053 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.053 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.053 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.053 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.053 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.053 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.053 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.053 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212222.053 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in h
1545212222.053 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in h
1545212222.053 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212222.053 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.053 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in h
1545212222.053 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212222.053 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212222.053 * [misc]taylor:  Taking taylor expansion of M in h
1545212222.053 * [misc]backup-simplify:  Simplify M into M
1545212222.054 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.054 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212222.054 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.054 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.054 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.054 * [misc]backup-simplify:  Simplify D into D
1545212222.054 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.054 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.054 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.054 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.054 * [misc]backup-simplify:  Simplify w into w
1545212222.054 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212222.054 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.054 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.054 * [misc]backup-simplify:  Simplify d into d
1545212222.054 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.054 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.054 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.054 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.054 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.054 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.054 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.054 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.054 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.054 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.054 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212222.055 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212222.055 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212222.055 * [misc]taylor:  Taking taylor expansion of M in h
1545212222.055 * [misc]backup-simplify:  Simplify M into M
1545212222.055 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.055 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212222.055 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.055 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.055 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.055 * [misc]backup-simplify:  Simplify D into D
1545212222.055 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.055 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.055 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.055 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.055 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.055 * [misc]backup-simplify:  Simplify w into w
1545212222.055 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212222.055 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.055 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.055 * [misc]backup-simplify:  Simplify d into d
1545212222.055 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.055 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.055 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.055 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.055 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.055 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.055 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.055 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.055 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.055 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.056 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212222.056 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212222.056 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212222.056 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212222.056 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212222.056 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212222.056 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212222.056 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) w) (* (pow d 2) c0))) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212222.056 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212222.056 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (* (pow d 2) c0))) into (- (/ (* (pow D 2) w) (* c0 (pow d 2))))
1545212222.056 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) w) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) w) (* (pow d 2) c0)))
1545212222.057 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) w) (* (pow d 2) c0))) (/ 1 M))) into 0
1545212222.057 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212222.057 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212222.057 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212222.057 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.057 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.057 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.057 * [misc]backup-simplify:  Simplify D into D
1545212222.057 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.057 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.057 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.057 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.057 * [misc]backup-simplify:  Simplify w into w
1545212222.057 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212222.057 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.057 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.057 * [misc]backup-simplify:  Simplify d into d
1545212222.057 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.057 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.057 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.057 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.057 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.058 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.058 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.058 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.058 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.058 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.058 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212222.058 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.058 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.058 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of M in c0
1545212222.058 * [misc]backup-simplify:  Simplify M into M
1545212222.058 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.058 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.058 * [misc]backup-simplify:  Simplify D into D
1545212222.058 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.058 * [misc]backup-simplify:  Simplify h into h
1545212222.058 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.058 * [misc]backup-simplify:  Simplify w into w
1545212222.058 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.058 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.058 * [misc]backup-simplify:  Simplify d into d
1545212222.059 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.059 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.059 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.059 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.059 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.059 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.059 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.059 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.059 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.059 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.059 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.059 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.059 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212222.059 * [misc]taylor:  Taking taylor expansion of M in c0
1545212222.059 * [misc]backup-simplify:  Simplify M into M
1545212222.059 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212222.059 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.059 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.059 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.059 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.059 * [misc]backup-simplify:  Simplify D into D
1545212222.059 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.059 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.059 * [misc]backup-simplify:  Simplify h into h
1545212222.059 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.059 * [misc]backup-simplify:  Simplify w into w
1545212222.059 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.059 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.059 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.059 * [misc]backup-simplify:  Simplify d into d
1545212222.059 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.059 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.059 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.059 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.060 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.060 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.060 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.060 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.060 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.060 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.060 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.060 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212222.060 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (pow d 2)))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212222.060 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.061 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212222.061 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212222.061 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.061 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.061 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.061 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.061 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.062 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.062 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.062 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212222.062 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.062 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.062 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.062 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.062 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.063 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.063 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.063 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212222.063 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ 1 M)) (* (/ 1 M) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212222.064 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212222.064 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212222.064 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.064 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.064 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.064 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.064 * [misc]backup-simplify:  Simplify D into D
1545212222.064 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.064 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.064 * [misc]backup-simplify:  Simplify h into h
1545212222.064 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.064 * [misc]backup-simplify:  Simplify w into w
1545212222.064 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.064 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.064 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.064 * [misc]backup-simplify:  Simplify d into d
1545212222.064 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.064 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.064 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.064 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.064 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.064 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.064 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.064 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.064 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.064 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.065 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.065 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212222.065 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.065 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of M in M
1545212222.065 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.065 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.065 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212222.065 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of D in M
1545212222.065 * [misc]backup-simplify:  Simplify D into D
1545212222.065 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of h in M
1545212222.065 * [misc]backup-simplify:  Simplify h into h
1545212222.065 * [misc]taylor:  Taking taylor expansion of w in M
1545212222.065 * [misc]backup-simplify:  Simplify w into w
1545212222.065 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212222.065 * [misc]taylor:  Taking taylor expansion of d in M
1545212222.065 * [misc]backup-simplify:  Simplify d into d
1545212222.065 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212222.065 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.065 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.065 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.065 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.065 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.065 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.065 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212222.066 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212222.066 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212222.066 * [misc]taylor:  Taking taylor expansion of M in M
1545212222.066 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.066 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.066 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212222.066 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212222.066 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212222.066 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212222.066 * [misc]taylor:  Taking taylor expansion of D in M
1545212222.066 * [misc]backup-simplify:  Simplify D into D
1545212222.066 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212222.066 * [misc]taylor:  Taking taylor expansion of h in M
1545212222.066 * [misc]backup-simplify:  Simplify h into h
1545212222.066 * [misc]taylor:  Taking taylor expansion of w in M
1545212222.066 * [misc]backup-simplify:  Simplify w into w
1545212222.066 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212222.066 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212222.066 * [misc]taylor:  Taking taylor expansion of d in M
1545212222.066 * [misc]backup-simplify:  Simplify d into d
1545212222.066 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212222.066 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.066 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.066 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.066 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.066 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.066 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.066 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212222.066 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212222.067 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212222.067 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.067 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212222.067 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.067 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212222.067 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212222.067 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212222.067 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212222.068 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212222.068 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212222.068 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212222.068 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.068 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212222.068 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212222.068 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212222.068 * [misc]taylor:  Taking taylor expansion of D in M
1545212222.069 * [misc]backup-simplify:  Simplify D into D
1545212222.069 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of h in M
1545212222.069 * [misc]backup-simplify:  Simplify h into h
1545212222.069 * [misc]taylor:  Taking taylor expansion of w in M
1545212222.069 * [misc]backup-simplify:  Simplify w into w
1545212222.069 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of d in M
1545212222.069 * [misc]backup-simplify:  Simplify d into d
1545212222.069 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212222.069 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.069 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.069 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.069 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.069 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.069 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.069 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212222.069 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212222.069 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.069 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of M in M
1545212222.069 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.069 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.069 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212222.069 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of D in M
1545212222.069 * [misc]backup-simplify:  Simplify D into D
1545212222.069 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212222.069 * [misc]taylor:  Taking taylor expansion of h in M
1545212222.069 * [misc]backup-simplify:  Simplify h into h
1545212222.069 * [misc]taylor:  Taking taylor expansion of w in M
1545212222.070 * [misc]backup-simplify:  Simplify w into w
1545212222.070 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of d in M
1545212222.070 * [misc]backup-simplify:  Simplify d into d
1545212222.070 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212222.070 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.070 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.070 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.070 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.070 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.070 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.070 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212222.070 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of M in M
1545212222.070 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.070 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.070 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212222.070 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of D in M
1545212222.070 * [misc]backup-simplify:  Simplify D into D
1545212222.070 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of h in M
1545212222.070 * [misc]backup-simplify:  Simplify h into h
1545212222.070 * [misc]taylor:  Taking taylor expansion of w in M
1545212222.070 * [misc]backup-simplify:  Simplify w into w
1545212222.070 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212222.070 * [misc]taylor:  Taking taylor expansion of d in M
1545212222.070 * [misc]backup-simplify:  Simplify d into d
1545212222.070 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212222.070 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.070 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.070 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.071 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.071 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.071 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.071 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212222.071 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212222.071 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212222.071 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.071 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212222.071 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.071 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212222.072 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212222.072 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212222.072 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212222.072 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212222.073 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212222.073 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212222.073 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.073 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212222.073 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212222.073 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212222.073 * [misc]taylor:  Taking taylor expansion of D in M
1545212222.073 * [misc]backup-simplify:  Simplify D into D
1545212222.073 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212222.073 * [misc]taylor:  Taking taylor expansion of h in M
1545212222.073 * [misc]backup-simplify:  Simplify h into h
1545212222.073 * [misc]taylor:  Taking taylor expansion of w in M
1545212222.073 * [misc]backup-simplify:  Simplify w into w
1545212222.073 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212222.073 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212222.073 * [misc]taylor:  Taking taylor expansion of d in M
1545212222.073 * [misc]backup-simplify:  Simplify d into d
1545212222.073 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212222.073 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.073 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.073 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.073 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.073 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.073 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.073 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212222.074 * [misc]backup-simplify:  Simplify (+ (sqrt -1) 0) into (sqrt -1)
1545212222.074 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212222.074 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.074 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.074 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.074 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.074 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212222.074 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212222.074 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.075 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.075 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.075 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.075 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.075 * [misc]backup-simplify:  Simplify D into D
1545212222.075 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.075 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.075 * [misc]backup-simplify:  Simplify h into h
1545212222.075 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.075 * [misc]backup-simplify:  Simplify w into w
1545212222.075 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.075 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.075 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.075 * [misc]backup-simplify:  Simplify d into d
1545212222.075 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.075 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.075 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.075 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.075 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.075 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.075 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.075 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.075 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.075 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.075 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.075 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212222.075 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212222.075 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212222.076 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.076 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.076 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.076 * [misc]backup-simplify:  Simplify D into D
1545212222.076 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.076 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.076 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.076 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.076 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.076 * [misc]backup-simplify:  Simplify w into w
1545212222.076 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.076 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.076 * [misc]backup-simplify:  Simplify d into d
1545212222.076 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.076 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.076 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.076 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.076 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.076 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.076 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.076 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212222.076 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212222.076 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212222.076 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.077 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.077 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.077 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212222.077 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212222.077 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.077 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.077 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.077 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212222.077 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212222.077 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.077 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.077 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.077 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.078 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.079 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.079 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.079 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212222.079 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212222.079 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.079 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.080 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))
1545212222.080 * [misc]backup-simplify:  Simplify (+ (* -1 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212222.081 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212222.081 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.081 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.082 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.082 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.082 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212222.082 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212222.082 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.083 * [misc]backup-simplify:  Simplify (+ (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 0) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))))
1545212222.083 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212222.083 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212222.083 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.083 * [misc]backup-simplify:  Simplify D into D
1545212222.083 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.083 * [misc]backup-simplify:  Simplify h into h
1545212222.083 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.083 * [misc]backup-simplify:  Simplify w into w
1545212222.083 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.083 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.083 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.083 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.083 * [misc]backup-simplify:  Simplify d into d
1545212222.083 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212222.083 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.083 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.083 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.083 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.083 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.083 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212222.083 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212222.083 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212222.083 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212222.084 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212222.084 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.084 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.084 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212222.084 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212222.084 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212222.084 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212222.084 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212222.084 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212222.085 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212222.085 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.085 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212222.085 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212222.085 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.085 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212222.085 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212222.085 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.085 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212222.086 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212222.086 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212222.086 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.086 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.086 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.086 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.086 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.086 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.087 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.087 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.087 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.087 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.087 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.087 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.087 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.087 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.088 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.088 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.088 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.088 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.088 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.088 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.088 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.088 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.088 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.088 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.088 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.088 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (pow d 2))) into (- (/ (* (pow D 2) w) (pow d 2)))
1545212222.088 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) w) (pow d 2))) in w
1545212222.088 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212222.088 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212222.088 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.088 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.088 * [misc]backup-simplify:  Simplify D into D
1545212222.088 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.088 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.088 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.088 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.088 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.088 * [misc]backup-simplify:  Simplify d into d
1545212222.088 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.089 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.089 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.089 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.089 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.089 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212222.089 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.089 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.089 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.089 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.089 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.089 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.090 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.090 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.090 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.091 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.091 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.091 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212222.092 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212222.092 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.092 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.092 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.093 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.093 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.093 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.093 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212222.094 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212222.094 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.094 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.095 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212222.096 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1)))) into 0
1545212222.096 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212222.096 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.097 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.097 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.097 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.097 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212222.097 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212222.097 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.098 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.098 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212222.098 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.098 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.098 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212222.098 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212222.098 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.098 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212222.099 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212222.100 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212222.100 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.100 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212222.100 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212222.100 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.101 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212222.101 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212222.102 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212222.102 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.102 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.102 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.102 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.102 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.102 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.103 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.103 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.103 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.103 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.103 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.103 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.103 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.103 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.103 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.103 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.104 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212222.104 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.104 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.104 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.104 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.104 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.104 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.104 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.104 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.104 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.104 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.104 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.104 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.104 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.105 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.105 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.105 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.105 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.105 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.105 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212222.105 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.105 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212222.105 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.105 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.105 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.105 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.106 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.106 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.106 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.106 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212222.106 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.106 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.106 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.107 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.107 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.107 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.107 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.107 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.107 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.107 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.107 * [misc]backup-simplify:  Simplify (- (/ (pow D 2) (pow d 2))) into (- (/ (pow D 2) (pow d 2)))
1545212222.107 * [misc]taylor:  Taking taylor expansion of (- (/ (pow D 2) (pow d 2))) in d
1545212222.107 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212222.107 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.107 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.107 * [misc]backup-simplify:  Simplify D into D
1545212222.107 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.107 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.107 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.107 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.107 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.107 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.107 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212222.107 * [misc]backup-simplify:  Simplify (- (pow D 2)) into (- (pow D 2))
1545212222.107 * [misc]taylor:  Taking taylor expansion of (- (pow D 2)) in D
1545212222.107 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.107 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.107 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.107 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.107 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.107 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.108 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212222.108 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.108 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.108 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212222.108 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212222.108 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.108 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.109 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.109 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.109 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.109 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.110 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.110 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.110 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.110 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212222.111 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212222.111 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.111 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.111 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.112 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.112 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.112 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.112 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212222.113 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212222.113 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.113 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212222.114 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212222.114 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))))) into 0
1545212222.115 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212222.115 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.116 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.116 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.116 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.116 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212222.117 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212222.117 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.117 * [misc]backup-simplify:  Simplify (+ (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) 0) into (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))))
1545212222.117 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212222.118 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212222.118 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.118 * [misc]backup-simplify:  Simplify D into D
1545212222.118 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.118 * [misc]backup-simplify:  Simplify h into h
1545212222.118 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.118 * [misc]backup-simplify:  Simplify w into w
1545212222.118 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.118 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.118 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.118 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.118 * [misc]backup-simplify:  Simplify d into d
1545212222.118 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212222.118 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.118 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.118 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212222.118 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212222.118 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.118 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212222.118 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212222.118 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212222.119 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212222.119 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212222.119 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212222.119 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212222.119 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212222.119 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.119 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.119 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.119 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212222.119 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212222.119 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212222.120 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212222.120 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212222.120 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212222.121 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212222.121 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.121 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212222.122 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.122 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212222.122 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212222.122 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212222.123 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212222.123 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212222.123 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212222.123 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212222.124 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212222.124 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212222.126 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212222.126 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.126 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212222.126 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212222.127 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212222.127 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.127 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212222.128 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212222.128 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212222.128 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.129 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212222.129 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212222.129 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212222.131 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212222.131 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.132 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212222.132 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212222.132 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212222.132 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212222.133 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.133 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212222.133 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212222.133 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212222.133 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.134 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212222.134 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212222.134 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212222.135 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.135 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212222.136 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212222.136 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212222.136 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.136 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.137 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212222.137 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.138 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.138 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212222.138 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.139 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.139 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212222.140 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212222.140 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212222.141 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212222.142 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212222.142 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212222.143 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212222.145 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212222.146 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212222.146 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.146 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.146 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.146 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.146 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.146 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.146 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.146 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.146 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.146 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.146 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.146 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.146 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.147 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.147 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212222.148 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212222.148 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.148 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212222.149 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212222.149 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.150 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.150 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212222.150 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212222.151 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.151 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212222.153 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212222.154 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212222.154 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.154 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.154 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.154 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.155 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.155 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.156 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.156 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.157 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.157 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.157 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.157 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.157 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.157 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.157 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.157 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.157 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.157 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.157 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.157 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.157 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.157 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.157 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.158 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.159 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.159 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.160 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212222.160 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.160 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.160 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.160 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.160 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.160 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.161 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.161 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.161 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.161 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.161 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.161 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.161 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.161 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.161 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.161 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.161 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.161 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.161 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.161 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.161 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.161 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.161 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.162 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.162 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.162 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.162 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.162 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.162 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.162 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.162 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.162 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.162 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.162 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.162 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.162 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.163 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.163 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.163 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.163 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.163 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.163 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.163 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.164 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212222.164 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.164 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.164 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.164 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.164 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212222.165 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212222.165 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.165 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.165 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.165 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.165 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.166 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.166 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.166 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.166 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 (- M))))))))) into (* -1 (* (sqrt -1) M))
1545212222.166 * * * * [misc]progress:  [ 2 / 4 ] generating series at (2 2 2)
1545212222.166 * [misc]backup-simplify:  Simplify (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* h w)))
1545212222.166 * [misc]approximate:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in (c0 h w d D) around 0
1545212222.166 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in D
1545212222.166 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212222.166 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.166 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.167 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.167 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.167 * [misc]backup-simplify:  Simplify d into d
1545212222.167 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.167 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.167 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.167 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.167 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.167 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.167 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.167 * [misc]backup-simplify:  Simplify h into h
1545212222.167 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.167 * [misc]backup-simplify:  Simplify w into w
1545212222.167 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.167 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212222.167 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.167 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.167 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.167 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212222.168 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in d
1545212222.168 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212222.168 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.168 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.168 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.168 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.168 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.168 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.168 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.168 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.168 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.168 * [misc]backup-simplify:  Simplify D into D
1545212222.168 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.168 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.168 * [misc]backup-simplify:  Simplify h into h
1545212222.168 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.168 * [misc]backup-simplify:  Simplify w into w
1545212222.168 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.168 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212222.168 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.168 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.168 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.169 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212222.169 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in w
1545212222.169 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212222.169 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.169 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.169 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.169 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.169 * [misc]backup-simplify:  Simplify d into d
1545212222.169 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.169 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.169 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.169 * [misc]backup-simplify:  Simplify D into D
1545212222.169 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.169 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.169 * [misc]backup-simplify:  Simplify h into h
1545212222.169 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.169 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.169 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.169 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.169 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212222.169 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.169 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.169 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.170 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.170 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.170 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.170 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212222.170 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in h
1545212222.170 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212222.170 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.170 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.170 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.170 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.170 * [misc]backup-simplify:  Simplify d into d
1545212222.170 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.170 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.171 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.171 * [misc]backup-simplify:  Simplify D into D
1545212222.171 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.171 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.171 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.171 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.171 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.171 * [misc]backup-simplify:  Simplify w into w
1545212222.171 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.171 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212222.171 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.171 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.171 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.171 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.171 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.172 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.172 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212222.172 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212222.172 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212222.172 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.172 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.172 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.172 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.172 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.172 * [misc]backup-simplify:  Simplify d into d
1545212222.172 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.172 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.172 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.172 * [misc]backup-simplify:  Simplify D into D
1545212222.172 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.172 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.172 * [misc]backup-simplify:  Simplify h into h
1545212222.172 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.172 * [misc]backup-simplify:  Simplify w into w
1545212222.172 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.172 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212222.173 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.173 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212222.173 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.173 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.173 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.173 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212222.173 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212222.173 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212222.173 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.173 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.173 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.173 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.173 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.173 * [misc]backup-simplify:  Simplify d into d
1545212222.174 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.174 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.174 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.174 * [misc]backup-simplify:  Simplify D into D
1545212222.174 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.174 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.174 * [misc]backup-simplify:  Simplify h into h
1545212222.174 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.174 * [misc]backup-simplify:  Simplify w into w
1545212222.174 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.174 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212222.174 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.174 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212222.174 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.174 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.174 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.175 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212222.175 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212222.175 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.175 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.175 * [misc]backup-simplify:  Simplify d into d
1545212222.175 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212222.175 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.175 * [misc]backup-simplify:  Simplify w into w
1545212222.175 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212222.175 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.175 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.175 * [misc]backup-simplify:  Simplify D into D
1545212222.175 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.175 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.175 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.175 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.175 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.175 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.175 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212222.175 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.176 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.176 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212222.176 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212222.176 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212222.176 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.176 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.176 * [misc]backup-simplify:  Simplify d into d
1545212222.176 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212222.176 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.176 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.176 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.176 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.177 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.177 * [misc]backup-simplify:  Simplify D into D
1545212222.177 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.177 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.177 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212222.177 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.177 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212222.177 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212222.177 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212222.177 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.177 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.177 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.177 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.177 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.177 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.177 * [misc]backup-simplify:  Simplify D into D
1545212222.178 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.178 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.178 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212222.178 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212222.178 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.178 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.178 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.178 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.178 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.178 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212222.178 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.179 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.179 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212222.179 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.179 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.179 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.180 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.180 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.180 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.180 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.180 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.181 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.181 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212222.181 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212222.181 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.181 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.181 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.182 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.182 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212222.182 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212222.182 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.182 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.182 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.182 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.183 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.183 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.183 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212222.183 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.183 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.183 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.184 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212222.184 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.184 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.184 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212222.185 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.185 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.185 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.186 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.186 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.186 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.186 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.187 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.187 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.187 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212222.188 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212222.188 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.188 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.188 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.188 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.189 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.189 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212222.190 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.190 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.190 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.190 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.190 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.190 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.190 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.190 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.190 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.191 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.191 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.191 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.191 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.192 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.192 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.192 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.193 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212222.193 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.194 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.194 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.195 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.195 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.195 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.195 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.195 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.195 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.195 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.195 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.196 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.196 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.197 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212222.197 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212222.197 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.197 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.197 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.198 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.198 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.198 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.198 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.198 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.198 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.199 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.199 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212222.200 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.200 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.200 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.200 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.200 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.200 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.200 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.201 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.201 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.201 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.201 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.201 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.202 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.202 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.202 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.202 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.203 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212222.204 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212222.204 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212222.205 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.205 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212222.206 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.206 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.206 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.206 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.206 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.206 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.206 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.206 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.206 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.207 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.207 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212222.208 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212222.209 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212222.209 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212222.209 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.209 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.209 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.210 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.211 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.211 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212222.212 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212222.213 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.213 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.213 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.213 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.213 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.213 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.213 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.213 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.213 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.213 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.214 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212222.214 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.215 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.215 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.215 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.215 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.215 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) c0))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212222.216 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212222.216 * [misc]approximate:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in (c0 h w d D) around 0
1545212222.216 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212222.216 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.216 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.216 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.216 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.216 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.216 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.216 * [misc]backup-simplify:  Simplify h into h
1545212222.216 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.216 * [misc]backup-simplify:  Simplify w into w
1545212222.216 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212222.216 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.216 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.216 * [misc]backup-simplify:  Simplify d into d
1545212222.216 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.216 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.216 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.216 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.217 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.217 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.217 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.217 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212222.217 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212222.217 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.217 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.217 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.217 * [misc]backup-simplify:  Simplify D into D
1545212222.217 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.217 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.217 * [misc]backup-simplify:  Simplify h into h
1545212222.217 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.217 * [misc]backup-simplify:  Simplify w into w
1545212222.217 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212222.217 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.217 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.217 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.217 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.217 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.217 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.217 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.217 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.217 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.218 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.218 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212222.218 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212222.218 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212222.218 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.218 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.218 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.218 * [misc]backup-simplify:  Simplify D into D
1545212222.218 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.218 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.218 * [misc]backup-simplify:  Simplify h into h
1545212222.218 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.218 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.218 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.218 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212222.218 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.218 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.218 * [misc]backup-simplify:  Simplify d into d
1545212222.218 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.218 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.218 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.218 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.219 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.219 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.219 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.219 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.219 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.219 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.219 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.219 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212222.219 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.220 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.220 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.220 * [misc]backup-simplify:  Simplify D into D
1545212222.220 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.220 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.220 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.220 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.220 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.220 * [misc]backup-simplify:  Simplify w into w
1545212222.220 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212222.220 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.220 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.220 * [misc]backup-simplify:  Simplify d into d
1545212222.220 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.220 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.220 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.220 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.220 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.220 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.220 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.221 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.221 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.221 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.221 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212222.221 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.221 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.221 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.221 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.221 * [misc]backup-simplify:  Simplify D into D
1545212222.221 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.221 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.221 * [misc]backup-simplify:  Simplify h into h
1545212222.221 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.221 * [misc]backup-simplify:  Simplify w into w
1545212222.221 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.221 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.221 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.221 * [misc]backup-simplify:  Simplify d into d
1545212222.221 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.221 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.221 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.222 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.222 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.222 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.222 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.222 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.222 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.222 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.222 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.222 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.222 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.222 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.222 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.222 * [misc]backup-simplify:  Simplify D into D
1545212222.223 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.223 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.223 * [misc]backup-simplify:  Simplify h into h
1545212222.223 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.223 * [misc]backup-simplify:  Simplify w into w
1545212222.223 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.223 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.223 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.223 * [misc]backup-simplify:  Simplify d into d
1545212222.223 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.223 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.223 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.223 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.223 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.223 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.223 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.223 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.223 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.224 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.224 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.224 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212222.224 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.224 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.224 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.224 * [misc]backup-simplify:  Simplify D into D
1545212222.224 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.224 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.224 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.224 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.224 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.224 * [misc]backup-simplify:  Simplify w into w
1545212222.224 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.224 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.224 * [misc]backup-simplify:  Simplify d into d
1545212222.224 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.224 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.224 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.225 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.225 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.225 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.225 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.225 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212222.225 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212222.225 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212222.225 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.225 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.225 * [misc]backup-simplify:  Simplify D into D
1545212222.225 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.225 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.225 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.226 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.226 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.226 * [misc]backup-simplify:  Simplify d into d
1545212222.226 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.226 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.226 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.226 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.226 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.226 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212222.226 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212222.226 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.226 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.226 * [misc]backup-simplify:  Simplify D into D
1545212222.226 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.226 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.226 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.226 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.227 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.227 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.227 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212222.227 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.227 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.227 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.227 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.227 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.227 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.227 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.227 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.227 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.228 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.228 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.228 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.229 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.229 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.229 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.229 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.229 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.229 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.229 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212222.229 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.230 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212222.230 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.230 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.230 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.230 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.230 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.230 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.230 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.231 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.231 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.231 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.231 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.231 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.231 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.231 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.232 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212222.232 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.232 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.232 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.233 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.233 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.233 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.234 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.234 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.234 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.234 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.234 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.234 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.234 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.234 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.234 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.234 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.234 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.234 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.235 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.235 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.236 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212222.236 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.236 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.236 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.236 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.236 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.236 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.236 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.236 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.236 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.236 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.237 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.237 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.237 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.238 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.238 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.238 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.238 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.238 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.239 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.239 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.239 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.239 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.239 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.239 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.239 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.240 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.240 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.240 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.241 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.241 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.242 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.242 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.242 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.242 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.242 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.242 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.242 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.242 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.243 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212222.243 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.244 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212222.244 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.245 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.245 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.245 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.245 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.245 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.245 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.245 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.245 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.245 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.245 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.245 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.245 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.245 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.245 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.245 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.246 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.249 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.249 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.250 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.250 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.250 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.250 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.250 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.250 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.251 * [misc]backup-simplify:  Simplify (* 1 (* (pow (/ 1 D) 2) (* (pow (/ 1 d) -2) (* (/ 1 w) (* (/ 1 h) (/ 1 (/ 1 c0))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212222.251 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212222.251 * [misc]approximate:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (c0 h w d D) around 0
1545212222.251 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212222.251 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212222.251 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.251 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212222.251 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.251 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.251 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.251 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.251 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.251 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.251 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.251 * [misc]backup-simplify:  Simplify h into h
1545212222.251 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.251 * [misc]backup-simplify:  Simplify w into w
1545212222.252 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212222.252 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.252 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.252 * [misc]backup-simplify:  Simplify d into d
1545212222.252 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.252 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.252 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.252 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.252 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.252 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.252 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.252 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212222.252 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212222.252 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212222.252 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.252 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212222.252 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.252 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.252 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.253 * [misc]backup-simplify:  Simplify D into D
1545212222.253 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.253 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.253 * [misc]backup-simplify:  Simplify h into h
1545212222.253 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.253 * [misc]backup-simplify:  Simplify w into w
1545212222.253 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212222.253 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.253 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.253 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.253 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.253 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.253 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.253 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.253 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.253 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.253 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.253 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212222.253 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212222.253 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212222.254 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212222.254 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.254 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212222.254 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.254 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.254 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.254 * [misc]backup-simplify:  Simplify D into D
1545212222.254 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.254 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.254 * [misc]backup-simplify:  Simplify h into h
1545212222.254 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.254 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.254 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.254 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212222.254 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.254 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.254 * [misc]backup-simplify:  Simplify d into d
1545212222.254 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.254 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.254 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.254 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.254 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.254 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.254 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.255 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.255 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.255 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.255 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.255 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212222.255 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212222.255 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.255 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212222.255 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.255 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.255 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.255 * [misc]backup-simplify:  Simplify D into D
1545212222.255 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.255 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.255 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.255 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.255 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.255 * [misc]backup-simplify:  Simplify w into w
1545212222.256 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212222.256 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.256 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.256 * [misc]backup-simplify:  Simplify d into d
1545212222.256 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.256 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.256 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.256 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.256 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.256 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.256 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.256 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.256 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.257 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.257 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212222.257 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.257 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.257 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.257 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.257 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.257 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.257 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.257 * [misc]backup-simplify:  Simplify D into D
1545212222.257 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.257 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.257 * [misc]backup-simplify:  Simplify h into h
1545212222.257 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.257 * [misc]backup-simplify:  Simplify w into w
1545212222.257 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.257 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.257 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.257 * [misc]backup-simplify:  Simplify d into d
1545212222.257 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.257 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.257 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.257 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.257 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.257 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.258 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.258 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.258 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.258 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.258 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.258 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.258 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.258 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.258 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.258 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.258 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.258 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.258 * [misc]backup-simplify:  Simplify D into D
1545212222.258 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.258 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.258 * [misc]backup-simplify:  Simplify h into h
1545212222.258 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.258 * [misc]backup-simplify:  Simplify w into w
1545212222.259 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.259 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.259 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.259 * [misc]backup-simplify:  Simplify d into d
1545212222.259 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.259 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.259 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.259 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.259 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.259 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.259 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.259 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.259 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.259 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.260 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.260 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212222.260 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212222.260 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212222.260 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.260 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212222.260 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.260 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.260 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.260 * [misc]backup-simplify:  Simplify D into D
1545212222.260 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.260 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.260 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.260 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.260 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.260 * [misc]backup-simplify:  Simplify w into w
1545212222.260 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.260 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.260 * [misc]backup-simplify:  Simplify d into d
1545212222.260 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.260 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.260 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.261 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.261 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.261 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.261 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.261 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212222.262 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) w) (pow d 2))) into (* -1 (/ (* (pow D 2) w) (pow d 2)))
1545212222.262 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) w) (pow d 2))) in w
1545212222.262 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212222.262 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.262 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212222.262 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212222.262 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.262 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.262 * [misc]backup-simplify:  Simplify D into D
1545212222.262 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.262 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.262 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.262 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.262 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.262 * [misc]backup-simplify:  Simplify d into d
1545212222.262 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.262 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.262 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.262 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.262 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.263 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212222.263 * [misc]backup-simplify:  Simplify (* -1 (/ (pow D 2) (pow d 2))) into (* -1 (/ (pow D 2) (pow d 2)))
1545212222.263 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (pow D 2) (pow d 2))) in d
1545212222.263 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212222.263 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.263 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212222.263 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.263 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.263 * [misc]backup-simplify:  Simplify D into D
1545212222.263 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.263 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.263 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.263 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.263 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.263 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.263 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212222.263 * [misc]backup-simplify:  Simplify (* -1 (pow D 2)) into (* -1 (pow D 2))
1545212222.263 * [misc]taylor:  Taking taylor expansion of (* -1 (pow D 2)) in D
1545212222.264 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212222.264 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.264 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.264 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.264 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.264 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.264 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.264 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212222.264 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.264 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.264 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.264 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.265 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.265 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.265 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.266 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212222.266 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.266 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.266 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.266 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212222.266 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.267 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212222.267 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.267 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.267 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))) into 0
1545212222.267 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.267 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.267 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.268 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.268 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.268 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.268 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.268 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.269 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (pow D 2) (pow d 2)))) into 0
1545212222.269 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.269 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.269 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.269 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212222.270 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (pow D 2))) into 0
1545212222.270 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.270 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.270 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.270 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.270 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212222.270 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.271 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.271 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.271 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.272 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.272 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.272 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.273 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212222.273 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.273 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.273 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.273 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.273 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.274 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.274 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.275 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212222.275 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.275 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.276 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2))))) into 0
1545212222.276 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.276 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.276 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.276 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.276 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.276 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.276 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.276 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.276 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.277 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.277 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.277 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.278 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2))))) into 0
1545212222.278 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.278 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.278 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.278 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.279 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.279 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212222.279 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.279 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.279 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.279 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.280 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.280 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.280 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.281 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.281 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.281 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.282 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.282 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.283 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.284 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212222.284 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.284 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.284 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.284 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.284 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.284 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.284 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.284 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.284 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.284 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.284 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.284 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.284 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.284 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.285 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212222.286 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.286 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212222.287 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.287 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.288 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))))) into 0
1545212222.288 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.288 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.288 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.288 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.288 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.288 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.288 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.288 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.288 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.288 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.288 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.288 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.289 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.289 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.289 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.290 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.290 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.290 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.291 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2)))))) into 0
1545212222.291 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.291 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.291 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.291 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.291 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.292 * [misc]backup-simplify:  Simplify (* -1 (* (pow (/ 1 (- D)) 2) (* (pow (/ 1 (- d)) -2) (* (/ 1 (- w)) (* (/ 1 (- h)) (/ 1 (/ 1 (- c0)))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212222.292 * * * * [misc]progress:  [ 3 / 4 ] generating series at (2 2 1 1 2 1)
1545212222.292 * [misc]backup-simplify:  Simplify (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* h w)))
1545212222.292 * [misc]approximate:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in (c0 h w d D) around 0
1545212222.292 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in D
1545212222.292 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212222.292 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.292 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.292 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.292 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.293 * [misc]backup-simplify:  Simplify d into d
1545212222.293 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.293 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.293 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.293 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.293 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.293 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.293 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.293 * [misc]backup-simplify:  Simplify h into h
1545212222.293 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.293 * [misc]backup-simplify:  Simplify w into w
1545212222.293 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.293 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212222.293 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.293 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.293 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.294 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212222.294 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in d
1545212222.294 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212222.294 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.294 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.294 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.294 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.294 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.295 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.295 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.295 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.295 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.295 * [misc]backup-simplify:  Simplify D into D
1545212222.295 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.295 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.295 * [misc]backup-simplify:  Simplify h into h
1545212222.295 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.295 * [misc]backup-simplify:  Simplify w into w
1545212222.295 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.295 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212222.295 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.295 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.295 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.295 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212222.295 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in w
1545212222.295 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212222.295 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.296 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.296 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.296 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.296 * [misc]backup-simplify:  Simplify d into d
1545212222.296 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.296 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.296 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.296 * [misc]backup-simplify:  Simplify D into D
1545212222.296 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.296 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.296 * [misc]backup-simplify:  Simplify h into h
1545212222.296 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.296 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.296 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.296 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.296 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212222.296 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.296 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.296 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.296 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.296 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.297 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.297 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212222.297 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in h
1545212222.297 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212222.297 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.297 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.297 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.297 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.297 * [misc]backup-simplify:  Simplify d into d
1545212222.297 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.297 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.297 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.297 * [misc]backup-simplify:  Simplify D into D
1545212222.297 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.297 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.297 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.297 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.297 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.297 * [misc]backup-simplify:  Simplify w into w
1545212222.298 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.298 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212222.298 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.298 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.298 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.298 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.298 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.298 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.299 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212222.299 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212222.299 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212222.299 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.299 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.299 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.299 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.299 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.299 * [misc]backup-simplify:  Simplify d into d
1545212222.299 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.299 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.299 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.299 * [misc]backup-simplify:  Simplify D into D
1545212222.299 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.299 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.299 * [misc]backup-simplify:  Simplify h into h
1545212222.299 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.299 * [misc]backup-simplify:  Simplify w into w
1545212222.299 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.299 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212222.300 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.300 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212222.300 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.300 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.300 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.300 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212222.300 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212222.300 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212222.300 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.300 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.300 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.300 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.300 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.300 * [misc]backup-simplify:  Simplify d into d
1545212222.300 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.300 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.301 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.301 * [misc]backup-simplify:  Simplify D into D
1545212222.301 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.301 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.301 * [misc]backup-simplify:  Simplify h into h
1545212222.301 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.301 * [misc]backup-simplify:  Simplify w into w
1545212222.301 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.301 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212222.301 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.301 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212222.301 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.301 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.301 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.301 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212222.302 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212222.302 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.302 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.302 * [misc]backup-simplify:  Simplify d into d
1545212222.302 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212222.302 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.302 * [misc]backup-simplify:  Simplify w into w
1545212222.302 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212222.302 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.302 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.302 * [misc]backup-simplify:  Simplify D into D
1545212222.302 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.302 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.302 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.302 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.302 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.302 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.302 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212222.302 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.303 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.303 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212222.303 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212222.303 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212222.303 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.303 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.303 * [misc]backup-simplify:  Simplify d into d
1545212222.303 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212222.303 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.303 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.303 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.303 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.303 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.303 * [misc]backup-simplify:  Simplify D into D
1545212222.303 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.303 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.303 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212222.304 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.304 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212222.304 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212222.304 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212222.304 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.304 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.304 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.304 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.304 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.304 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.304 * [misc]backup-simplify:  Simplify D into D
1545212222.304 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.304 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.304 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212222.304 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212222.304 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.305 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.305 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.305 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.305 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.305 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212222.305 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.305 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.306 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212222.306 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.306 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.306 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.306 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.306 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.306 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.306 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.307 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.307 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.307 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212222.308 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212222.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.308 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.308 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.308 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212222.309 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212222.309 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.309 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.309 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.309 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.309 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.309 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.309 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212222.309 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.309 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.310 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.310 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212222.310 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.310 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.311 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212222.311 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.311 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.312 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.312 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.312 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.312 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.312 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.312 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.313 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.313 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.313 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.314 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212222.314 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212222.314 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.314 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.314 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.315 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.315 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.315 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212222.316 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.316 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.316 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.316 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.316 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.316 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.316 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.316 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.317 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.317 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.317 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.317 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.317 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.318 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.318 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.319 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212222.319 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.320 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.320 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.321 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.321 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.321 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.321 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.321 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.321 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.321 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.321 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.322 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.322 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.323 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212222.323 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212222.323 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.323 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.323 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.324 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.324 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.324 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.324 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.324 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.324 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.324 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.324 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.324 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.324 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.324 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.324 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.325 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.325 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212222.326 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.326 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.326 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.326 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.326 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.326 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.327 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.327 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.327 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.327 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.327 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.327 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.328 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.328 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.328 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.328 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.329 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212222.330 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212222.330 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212222.331 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.331 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212222.332 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.332 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.332 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.332 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.332 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.332 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.332 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.332 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.332 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.333 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.334 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212222.334 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212222.335 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212222.335 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212222.335 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.335 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.335 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.336 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.337 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.337 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212222.338 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212222.339 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.339 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.339 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.339 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.339 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.339 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.339 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.339 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.339 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.339 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.340 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212222.340 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.341 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.341 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.341 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) c0))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212222.342 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212222.342 * [misc]approximate:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in (c0 h w d D) around 0
1545212222.342 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212222.342 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.342 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.342 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.342 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.342 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.342 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.342 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.342 * [misc]backup-simplify:  Simplify h into h
1545212222.342 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.342 * [misc]backup-simplify:  Simplify w into w
1545212222.342 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212222.342 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.342 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.342 * [misc]backup-simplify:  Simplify d into d
1545212222.342 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.342 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.342 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.342 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.342 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.342 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.343 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.343 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212222.343 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212222.343 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.343 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.343 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.343 * [misc]backup-simplify:  Simplify D into D
1545212222.343 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.343 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.343 * [misc]backup-simplify:  Simplify h into h
1545212222.343 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.343 * [misc]backup-simplify:  Simplify w into w
1545212222.343 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212222.343 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.343 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.343 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.343 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.343 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.343 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.343 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.343 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.343 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.344 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.344 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212222.344 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212222.344 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212222.344 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.344 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.344 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.344 * [misc]backup-simplify:  Simplify D into D
1545212222.344 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.344 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.344 * [misc]backup-simplify:  Simplify h into h
1545212222.344 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.344 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.344 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.344 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212222.344 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.344 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.344 * [misc]backup-simplify:  Simplify d into d
1545212222.344 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.344 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.344 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.344 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.344 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.345 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.345 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.345 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.345 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.345 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.345 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.345 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212222.346 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.346 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.346 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.346 * [misc]backup-simplify:  Simplify D into D
1545212222.346 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.346 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.346 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.346 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.346 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.346 * [misc]backup-simplify:  Simplify w into w
1545212222.346 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212222.346 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.346 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.346 * [misc]backup-simplify:  Simplify d into d
1545212222.346 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.346 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.346 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.346 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.346 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.346 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.346 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.347 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.347 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.347 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.347 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212222.347 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.347 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.347 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.347 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.347 * [misc]backup-simplify:  Simplify D into D
1545212222.347 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.347 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.347 * [misc]backup-simplify:  Simplify h into h
1545212222.347 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.347 * [misc]backup-simplify:  Simplify w into w
1545212222.347 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.347 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.347 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.347 * [misc]backup-simplify:  Simplify d into d
1545212222.347 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.347 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.348 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.348 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.348 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.348 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.348 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.348 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.348 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.348 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.348 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.348 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.348 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.349 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.349 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.349 * [misc]backup-simplify:  Simplify D into D
1545212222.349 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.349 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.349 * [misc]backup-simplify:  Simplify h into h
1545212222.349 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.349 * [misc]backup-simplify:  Simplify w into w
1545212222.349 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.349 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.349 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.349 * [misc]backup-simplify:  Simplify d into d
1545212222.349 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.349 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.349 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.349 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.349 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.349 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.349 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.349 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.350 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.350 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.350 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212222.350 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.350 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.350 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.350 * [misc]backup-simplify:  Simplify D into D
1545212222.350 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.350 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.350 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.350 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.350 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.350 * [misc]backup-simplify:  Simplify w into w
1545212222.351 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.351 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.351 * [misc]backup-simplify:  Simplify d into d
1545212222.351 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.351 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.351 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.351 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.351 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.351 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.351 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.352 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212222.352 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212222.352 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212222.352 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.352 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.352 * [misc]backup-simplify:  Simplify D into D
1545212222.352 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.352 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.352 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.352 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.352 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.352 * [misc]backup-simplify:  Simplify d into d
1545212222.352 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.352 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.352 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.352 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.352 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.353 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212222.353 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212222.353 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.353 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.353 * [misc]backup-simplify:  Simplify D into D
1545212222.353 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.353 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.353 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.353 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.353 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.353 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.353 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212222.353 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.353 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.353 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.353 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.353 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.353 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.354 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.354 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.354 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.354 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.354 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.355 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.355 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.355 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.355 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.355 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.355 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.355 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.355 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212222.356 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.356 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212222.356 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.356 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.356 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.356 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.356 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.356 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.357 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.357 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.357 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.357 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.357 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.357 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.357 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.358 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.358 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212222.358 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.358 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.358 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.358 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.358 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.359 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.359 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.359 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.359 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.360 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.360 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.360 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.360 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.360 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.360 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.361 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.361 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212222.361 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.361 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.361 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.361 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.361 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.361 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.361 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.361 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.361 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.361 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.362 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.362 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.362 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.362 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.362 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.362 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.363 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.363 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.363 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.364 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.364 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.364 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.364 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.365 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.365 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.365 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.365 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.365 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.365 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.365 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.365 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.365 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.365 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212222.366 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.366 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212222.366 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.367 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.367 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.367 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.367 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.367 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.367 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.367 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.367 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.367 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.367 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.368 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.368 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.368 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.368 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.368 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.368 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.368 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.368 * [misc]backup-simplify:  Simplify (* 1 (* (pow (/ 1 D) 2) (* (pow (/ 1 d) -2) (* (/ 1 w) (* (/ 1 h) (/ 1 (/ 1 c0))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212222.369 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212222.369 * [misc]approximate:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (c0 h w d D) around 0
1545212222.369 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212222.369 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212222.369 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.369 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212222.369 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.369 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.369 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.369 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.369 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.369 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.369 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.369 * [misc]backup-simplify:  Simplify h into h
1545212222.369 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.369 * [misc]backup-simplify:  Simplify w into w
1545212222.369 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212222.369 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.369 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.369 * [misc]backup-simplify:  Simplify d into d
1545212222.369 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.369 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.369 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.369 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.369 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.369 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.369 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.369 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212222.369 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212222.369 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212222.369 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.369 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212222.369 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.369 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.369 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.369 * [misc]backup-simplify:  Simplify D into D
1545212222.369 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.369 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.369 * [misc]backup-simplify:  Simplify h into h
1545212222.369 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.369 * [misc]backup-simplify:  Simplify w into w
1545212222.369 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212222.370 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.370 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.370 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.370 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.370 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.370 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.370 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.370 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.370 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.370 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.370 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212222.370 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212222.370 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212222.370 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212222.370 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.370 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212222.370 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.370 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.370 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.370 * [misc]backup-simplify:  Simplify D into D
1545212222.370 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.370 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.370 * [misc]backup-simplify:  Simplify h into h
1545212222.370 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.370 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.370 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.370 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212222.370 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.370 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.370 * [misc]backup-simplify:  Simplify d into d
1545212222.370 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.370 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.370 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.370 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.370 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.371 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.371 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.371 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.371 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.371 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.371 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.371 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212222.371 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212222.371 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.371 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212222.371 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.371 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.371 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.371 * [misc]backup-simplify:  Simplify D into D
1545212222.371 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.371 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.371 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.371 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.371 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.371 * [misc]backup-simplify:  Simplify w into w
1545212222.371 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212222.371 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.371 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.371 * [misc]backup-simplify:  Simplify d into d
1545212222.371 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.371 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.371 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.371 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.371 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.372 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.372 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.372 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.372 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.372 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.372 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212222.372 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.372 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.372 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.372 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.372 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.372 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.372 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.372 * [misc]backup-simplify:  Simplify D into D
1545212222.372 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.372 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.372 * [misc]backup-simplify:  Simplify h into h
1545212222.372 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.372 * [misc]backup-simplify:  Simplify w into w
1545212222.372 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.372 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.372 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.372 * [misc]backup-simplify:  Simplify d into d
1545212222.372 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.372 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.372 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.372 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.372 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.372 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.372 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.373 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.373 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.373 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.373 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.373 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.373 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.373 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.373 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.373 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.373 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.373 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.373 * [misc]backup-simplify:  Simplify D into D
1545212222.373 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.373 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.373 * [misc]backup-simplify:  Simplify h into h
1545212222.373 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.373 * [misc]backup-simplify:  Simplify w into w
1545212222.373 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.373 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.373 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.373 * [misc]backup-simplify:  Simplify d into d
1545212222.373 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.373 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.373 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.373 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.373 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.373 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.373 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.373 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.373 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.374 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.374 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.374 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212222.374 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212222.374 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212222.374 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.374 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212222.374 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.374 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.374 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.374 * [misc]backup-simplify:  Simplify D into D
1545212222.374 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.374 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.374 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.374 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.374 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.374 * [misc]backup-simplify:  Simplify w into w
1545212222.374 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.374 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.374 * [misc]backup-simplify:  Simplify d into d
1545212222.374 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.374 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.374 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.374 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.375 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.375 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.375 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.375 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212222.375 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) w) (pow d 2))) into (* -1 (/ (* (pow D 2) w) (pow d 2)))
1545212222.375 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) w) (pow d 2))) in w
1545212222.375 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212222.375 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.375 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212222.375 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212222.375 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.375 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.375 * [misc]backup-simplify:  Simplify D into D
1545212222.375 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.375 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.375 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.375 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.375 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.375 * [misc]backup-simplify:  Simplify d into d
1545212222.375 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.375 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.375 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.375 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.376 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.376 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212222.376 * [misc]backup-simplify:  Simplify (* -1 (/ (pow D 2) (pow d 2))) into (* -1 (/ (pow D 2) (pow d 2)))
1545212222.376 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (pow D 2) (pow d 2))) in d
1545212222.376 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212222.376 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.376 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212222.376 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.376 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.376 * [misc]backup-simplify:  Simplify D into D
1545212222.376 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.376 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.376 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.376 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.376 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.376 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.376 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212222.376 * [misc]backup-simplify:  Simplify (* -1 (pow D 2)) into (* -1 (pow D 2))
1545212222.376 * [misc]taylor:  Taking taylor expansion of (* -1 (pow D 2)) in D
1545212222.376 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212222.376 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.376 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.376 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.376 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.376 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.376 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.376 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212222.376 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.377 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.377 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.377 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.377 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.377 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.377 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.377 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212222.377 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.377 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.378 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.378 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.378 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.378 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.378 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212222.378 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.378 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212222.378 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.378 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.379 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))) into 0
1545212222.379 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.379 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.379 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.379 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.379 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.379 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.379 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.379 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.379 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (pow D 2) (pow d 2)))) into 0
1545212222.380 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.380 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.380 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.380 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.380 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212222.380 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (pow D 2))) into 0
1545212222.380 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.381 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.381 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.381 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.381 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212222.381 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.381 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.381 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.382 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.382 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.382 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.383 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.383 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212222.383 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.383 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.383 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.384 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.384 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.384 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.384 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.384 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.384 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.384 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.384 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.385 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.385 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212222.385 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.385 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.386 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2))))) into 0
1545212222.386 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.386 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.386 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.386 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.386 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.386 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.386 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.386 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.387 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.387 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.387 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.388 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.388 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2))))) into 0
1545212222.388 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.388 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.388 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.389 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.389 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.389 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212222.389 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.389 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.390 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.390 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.390 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.390 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.390 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.391 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.391 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.391 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.392 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.392 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.393 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.393 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212222.393 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.393 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.393 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.393 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.393 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.393 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.394 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.394 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.394 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.394 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.394 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212222.395 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.395 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212222.396 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.396 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.397 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))))) into 0
1545212222.397 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.397 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.397 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.397 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.397 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.397 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.397 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.397 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.397 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.397 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.397 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.397 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.397 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.397 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.398 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.398 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.398 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.399 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.399 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2)))))) into 0
1545212222.399 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.400 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.400 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.400 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.400 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.400 * [misc]backup-simplify:  Simplify (* -1 (* (pow (/ 1 (- D)) 2) (* (pow (/ 1 (- d)) -2) (* (/ 1 (- w)) (* (/ 1 (- h)) (/ 1 (/ 1 (- c0)))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212222.400 * * * * [misc]progress:  [ 4 / 4 ] generating series at (2 2 1 1 1 2)
1545212222.401 * [misc]backup-simplify:  Simplify (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* h w)))
1545212222.401 * [misc]approximate:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in (c0 h w d D) around 0
1545212222.401 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in D
1545212222.401 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212222.401 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.401 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.401 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.401 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.401 * [misc]backup-simplify:  Simplify d into d
1545212222.401 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.401 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.401 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.401 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.401 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.401 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.401 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.401 * [misc]backup-simplify:  Simplify h into h
1545212222.401 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.401 * [misc]backup-simplify:  Simplify w into w
1545212222.401 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.401 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212222.401 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.401 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.401 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.402 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212222.402 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in d
1545212222.402 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212222.402 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.402 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.402 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.402 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.402 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.402 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.402 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.402 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.402 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.402 * [misc]backup-simplify:  Simplify D into D
1545212222.402 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.402 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.402 * [misc]backup-simplify:  Simplify h into h
1545212222.402 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.402 * [misc]backup-simplify:  Simplify w into w
1545212222.402 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.402 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212222.402 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.402 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.402 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.403 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212222.403 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in w
1545212222.403 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212222.403 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.403 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.403 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.403 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.403 * [misc]backup-simplify:  Simplify d into d
1545212222.403 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.403 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.403 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.403 * [misc]backup-simplify:  Simplify D into D
1545212222.403 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.403 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.403 * [misc]backup-simplify:  Simplify h into h
1545212222.403 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.403 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.403 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.403 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.404 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212222.404 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.404 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.404 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.404 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.404 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.404 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.405 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212222.405 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in h
1545212222.405 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212222.405 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.405 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.405 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.405 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.405 * [misc]backup-simplify:  Simplify d into d
1545212222.405 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.405 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.405 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.405 * [misc]backup-simplify:  Simplify D into D
1545212222.405 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.405 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.405 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.405 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.405 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.405 * [misc]backup-simplify:  Simplify w into w
1545212222.405 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.405 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212222.405 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.405 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.405 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.406 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.406 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.406 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.406 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212222.406 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212222.406 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212222.406 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.406 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.406 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.406 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.406 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.406 * [misc]backup-simplify:  Simplify d into d
1545212222.406 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.406 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.406 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.406 * [misc]backup-simplify:  Simplify D into D
1545212222.406 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.406 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.407 * [misc]backup-simplify:  Simplify h into h
1545212222.407 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.407 * [misc]backup-simplify:  Simplify w into w
1545212222.407 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.407 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212222.407 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.407 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212222.407 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.407 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.407 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.407 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212222.408 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212222.408 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212222.408 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.408 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.408 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.408 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.408 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.408 * [misc]backup-simplify:  Simplify d into d
1545212222.408 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.408 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.408 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.408 * [misc]backup-simplify:  Simplify D into D
1545212222.408 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.408 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.408 * [misc]backup-simplify:  Simplify h into h
1545212222.408 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.408 * [misc]backup-simplify:  Simplify w into w
1545212222.408 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.408 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212222.408 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.408 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212222.409 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.409 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.409 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.409 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212222.409 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212222.409 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.409 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.409 * [misc]backup-simplify:  Simplify d into d
1545212222.409 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212222.409 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.409 * [misc]backup-simplify:  Simplify w into w
1545212222.409 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212222.409 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.409 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.409 * [misc]backup-simplify:  Simplify D into D
1545212222.409 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.409 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.409 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.409 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.409 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.410 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.410 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212222.410 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.410 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.410 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212222.410 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212222.410 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212222.410 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.410 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.411 * [misc]backup-simplify:  Simplify d into d
1545212222.411 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212222.411 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.411 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.411 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.411 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.411 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.411 * [misc]backup-simplify:  Simplify D into D
1545212222.411 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.411 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.411 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212222.411 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.411 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212222.411 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212222.411 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212222.411 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.411 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.411 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.412 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.412 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.412 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.412 * [misc]backup-simplify:  Simplify D into D
1545212222.412 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.412 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.412 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212222.412 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212222.412 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.412 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.412 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.412 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.412 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212222.412 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.413 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.413 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212222.413 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.413 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.413 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.414 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.414 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.414 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.414 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.414 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.414 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.415 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212222.415 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212222.415 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.415 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.415 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.416 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.416 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212222.416 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212222.416 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.416 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.416 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.416 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.417 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.417 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.417 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212222.417 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.417 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.417 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212222.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.418 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.418 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212222.419 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.419 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.419 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.420 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.420 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.420 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.420 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.420 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.420 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.420 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.421 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.421 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212222.422 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212222.422 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.422 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.422 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.422 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.423 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.423 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212222.423 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.423 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.423 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.423 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.424 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.424 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.424 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.424 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.424 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.424 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.425 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.425 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.425 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.425 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.425 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.426 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.426 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212222.427 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.427 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.428 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.428 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.428 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.429 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.429 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.429 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.429 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.429 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.429 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.430 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.430 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.431 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212222.431 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212222.431 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.431 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.431 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.431 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.431 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.431 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.431 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.432 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.432 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.432 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.432 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.432 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.432 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.432 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.432 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.433 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.433 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212222.434 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.434 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.434 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.434 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.434 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.434 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.434 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.434 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.434 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.434 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.434 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.434 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.435 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.435 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.435 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.435 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.435 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.436 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.436 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212222.436 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.436 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.437 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212222.438 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212222.438 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212222.439 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.439 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212222.440 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212222.440 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.440 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.440 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.440 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.440 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.440 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.440 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.440 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.441 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.441 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212222.442 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212222.442 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212222.443 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212222.443 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.443 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.443 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.443 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.443 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.444 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.444 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.444 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.444 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.444 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.444 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.444 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.444 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.444 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.444 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.444 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.444 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.444 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.444 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.444 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.444 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.445 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.446 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212222.447 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212222.447 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.447 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.447 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.447 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.448 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.448 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.448 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.448 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.448 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.448 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.448 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.448 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.448 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.448 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.448 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.448 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.448 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.448 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212222.449 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.449 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212222.449 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.449 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.450 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) c0))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212222.450 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212222.450 * [misc]approximate:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in (c0 h w d D) around 0
1545212222.450 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212222.450 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.450 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.450 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.450 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.451 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.451 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.451 * [misc]backup-simplify:  Simplify h into h
1545212222.451 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.451 * [misc]backup-simplify:  Simplify w into w
1545212222.451 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212222.451 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.451 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.451 * [misc]backup-simplify:  Simplify d into d
1545212222.451 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.451 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.451 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.451 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.451 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.451 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.451 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.451 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212222.451 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212222.451 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.451 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.451 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.452 * [misc]backup-simplify:  Simplify D into D
1545212222.452 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.452 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.452 * [misc]backup-simplify:  Simplify h into h
1545212222.452 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.452 * [misc]backup-simplify:  Simplify w into w
1545212222.452 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212222.452 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.452 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.452 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.452 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.452 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.452 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.452 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.452 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.452 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.452 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212222.452 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212222.452 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212222.452 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.452 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.453 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.453 * [misc]backup-simplify:  Simplify D into D
1545212222.453 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.453 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.453 * [misc]backup-simplify:  Simplify h into h
1545212222.453 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.453 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.453 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212222.453 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.453 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.453 * [misc]backup-simplify:  Simplify d into d
1545212222.453 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.453 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.453 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.453 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.453 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.453 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.453 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.454 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.454 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.454 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.454 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.454 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212222.454 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.454 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.454 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.454 * [misc]backup-simplify:  Simplify D into D
1545212222.454 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.454 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.454 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.454 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.454 * [misc]backup-simplify:  Simplify w into w
1545212222.454 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212222.454 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.454 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.454 * [misc]backup-simplify:  Simplify d into d
1545212222.454 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.454 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.454 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.454 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.455 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.455 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.455 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.455 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.455 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.455 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.455 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212222.455 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.456 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.456 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.456 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.456 * [misc]backup-simplify:  Simplify D into D
1545212222.456 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.456 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.456 * [misc]backup-simplify:  Simplify h into h
1545212222.456 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.456 * [misc]backup-simplify:  Simplify w into w
1545212222.456 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.456 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.456 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.456 * [misc]backup-simplify:  Simplify d into d
1545212222.456 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.456 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.456 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.456 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.456 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.456 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.456 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.456 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.456 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.457 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.457 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.457 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.457 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.457 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.457 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.457 * [misc]backup-simplify:  Simplify D into D
1545212222.457 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.457 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.457 * [misc]backup-simplify:  Simplify h into h
1545212222.457 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.457 * [misc]backup-simplify:  Simplify w into w
1545212222.457 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.457 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.457 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.457 * [misc]backup-simplify:  Simplify d into d
1545212222.457 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.457 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.458 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.458 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.458 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.458 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.458 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.458 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.458 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.458 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.458 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.458 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212222.459 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.459 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.459 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.459 * [misc]backup-simplify:  Simplify D into D
1545212222.459 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.459 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.459 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.459 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.459 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.459 * [misc]backup-simplify:  Simplify w into w
1545212222.459 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.459 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.459 * [misc]backup-simplify:  Simplify d into d
1545212222.459 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.459 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.459 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.459 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.459 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.460 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.460 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.460 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212222.460 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212222.460 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212222.460 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.460 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.460 * [misc]backup-simplify:  Simplify D into D
1545212222.460 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.460 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.460 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.460 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.460 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.460 * [misc]backup-simplify:  Simplify d into d
1545212222.460 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.460 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.460 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.461 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.461 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.461 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212222.461 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212222.461 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.461 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.461 * [misc]backup-simplify:  Simplify D into D
1545212222.461 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.461 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.461 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.461 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.461 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.461 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.461 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212222.461 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.461 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.461 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.461 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.462 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.462 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.462 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.462 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.462 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.462 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.463 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.463 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.463 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.463 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.463 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.463 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.463 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.463 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.463 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212222.464 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.464 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212222.464 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.464 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.464 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.464 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.464 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.464 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.465 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.465 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.465 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.465 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.465 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.465 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.465 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.466 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.466 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212222.466 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.466 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.466 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.466 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.466 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.467 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.467 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.467 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.468 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.468 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.469 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.469 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.469 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.469 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.469 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.469 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.469 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.469 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.469 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.469 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.469 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.469 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.470 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.470 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212222.470 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.471 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.471 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.471 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.471 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.471 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.471 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.471 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.471 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.471 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.471 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.472 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.472 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.472 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.472 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.472 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.473 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.473 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.473 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.473 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.473 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.473 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.474 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.474 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.474 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.474 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.475 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.475 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.475 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.476 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.476 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.476 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.476 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.476 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.476 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.477 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.477 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.477 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.477 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.477 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.477 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.477 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.477 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.477 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.477 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.477 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212222.478 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.478 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212222.479 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.479 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.479 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.479 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.479 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.479 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.479 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.479 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.480 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.480 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.480 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.480 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.480 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.480 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.480 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.480 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.480 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.481 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.481 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.481 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.481 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.481 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.482 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.482 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.482 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.482 * [misc]backup-simplify:  Simplify (* 1 (* (pow (/ 1 D) 2) (* (pow (/ 1 d) -2) (* (/ 1 w) (* (/ 1 h) (/ 1 (/ 1 c0))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212222.482 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212222.482 * [misc]approximate:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (c0 h w d D) around 0
1545212222.482 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212222.483 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212222.483 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.483 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212222.483 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212222.483 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.483 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.483 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.483 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.483 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212222.483 * [misc]taylor:  Taking taylor expansion of h in D
1545212222.483 * [misc]backup-simplify:  Simplify h into h
1545212222.483 * [misc]taylor:  Taking taylor expansion of w in D
1545212222.483 * [misc]backup-simplify:  Simplify w into w
1545212222.483 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212222.483 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212222.483 * [misc]taylor:  Taking taylor expansion of d in D
1545212222.483 * [misc]backup-simplify:  Simplify d into d
1545212222.483 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212222.483 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.483 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.483 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.483 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212222.483 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.483 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.484 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212222.484 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212222.484 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212222.484 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.484 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212222.484 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212222.484 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.484 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.484 * [misc]backup-simplify:  Simplify D into D
1545212222.484 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212222.484 * [misc]taylor:  Taking taylor expansion of h in d
1545212222.484 * [misc]backup-simplify:  Simplify h into h
1545212222.484 * [misc]taylor:  Taking taylor expansion of w in d
1545212222.484 * [misc]backup-simplify:  Simplify w into w
1545212222.484 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212222.484 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.484 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.484 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.484 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.484 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212222.484 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.484 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.484 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.484 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.484 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.484 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212222.485 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212222.485 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212222.485 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212222.485 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.485 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212222.485 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212222.485 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.485 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.485 * [misc]backup-simplify:  Simplify D into D
1545212222.485 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212222.485 * [misc]taylor:  Taking taylor expansion of h in w
1545212222.485 * [misc]backup-simplify:  Simplify h into h
1545212222.485 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.485 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.485 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.485 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212222.485 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.485 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.485 * [misc]backup-simplify:  Simplify d into d
1545212222.485 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212222.485 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.485 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.485 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212222.485 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.485 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212222.486 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.486 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212222.486 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.486 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.486 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212222.486 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212222.486 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212222.486 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.486 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212222.486 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.486 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.486 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.486 * [misc]backup-simplify:  Simplify D into D
1545212222.486 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.486 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.486 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.486 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.486 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.486 * [misc]backup-simplify:  Simplify w into w
1545212222.486 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212222.487 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.487 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.487 * [misc]backup-simplify:  Simplify d into d
1545212222.487 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212222.487 * [misc]backup-simplify:  Simplify c0 into c0
1545212222.487 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.487 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.487 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.487 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.487 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.487 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.487 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.487 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212222.488 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212222.488 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.488 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.488 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.488 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.488 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.488 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.488 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.488 * [misc]backup-simplify:  Simplify D into D
1545212222.488 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.488 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.488 * [misc]backup-simplify:  Simplify h into h
1545212222.488 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.488 * [misc]backup-simplify:  Simplify w into w
1545212222.488 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.488 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.488 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.488 * [misc]backup-simplify:  Simplify d into d
1545212222.488 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.488 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.488 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.488 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.488 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.488 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.488 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.488 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.489 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.489 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.489 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.489 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212222.489 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212222.489 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.489 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212222.489 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212222.489 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212222.489 * [misc]taylor:  Taking taylor expansion of D in c0
1545212222.489 * [misc]backup-simplify:  Simplify D into D
1545212222.489 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212222.489 * [misc]taylor:  Taking taylor expansion of h in c0
1545212222.489 * [misc]backup-simplify:  Simplify h into h
1545212222.489 * [misc]taylor:  Taking taylor expansion of w in c0
1545212222.489 * [misc]backup-simplify:  Simplify w into w
1545212222.489 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212222.489 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212222.489 * [misc]taylor:  Taking taylor expansion of d in c0
1545212222.489 * [misc]backup-simplify:  Simplify d into d
1545212222.489 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212222.489 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.489 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.489 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.490 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212222.490 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212222.490 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.490 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212222.490 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.490 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212222.490 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212222.490 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212222.491 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212222.491 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212222.491 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.491 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212222.491 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212222.491 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212222.491 * [misc]taylor:  Taking taylor expansion of D in h
1545212222.491 * [misc]backup-simplify:  Simplify D into D
1545212222.491 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212222.491 * [misc]taylor:  Taking taylor expansion of h in h
1545212222.491 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.491 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.491 * [misc]taylor:  Taking taylor expansion of w in h
1545212222.491 * [misc]backup-simplify:  Simplify w into w
1545212222.491 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212222.491 * [misc]taylor:  Taking taylor expansion of d in h
1545212222.491 * [misc]backup-simplify:  Simplify d into d
1545212222.491 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.491 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212222.491 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.491 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212222.491 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.492 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212222.492 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.492 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212222.492 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) w) (pow d 2))) into (* -1 (/ (* (pow D 2) w) (pow d 2)))
1545212222.492 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) w) (pow d 2))) in w
1545212222.492 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212222.492 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.492 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212222.492 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212222.492 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212222.492 * [misc]taylor:  Taking taylor expansion of D in w
1545212222.492 * [misc]backup-simplify:  Simplify D into D
1545212222.492 * [misc]taylor:  Taking taylor expansion of w in w
1545212222.492 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.492 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.492 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212222.492 * [misc]taylor:  Taking taylor expansion of d in w
1545212222.492 * [misc]backup-simplify:  Simplify d into d
1545212222.492 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.493 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212222.493 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.493 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212222.493 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212222.493 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212222.493 * [misc]backup-simplify:  Simplify (* -1 (/ (pow D 2) (pow d 2))) into (* -1 (/ (pow D 2) (pow d 2)))
1545212222.493 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (pow D 2) (pow d 2))) in d
1545212222.493 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212222.493 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.493 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212222.493 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212222.493 * [misc]taylor:  Taking taylor expansion of D in d
1545212222.493 * [misc]backup-simplify:  Simplify D into D
1545212222.493 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212222.493 * [misc]taylor:  Taking taylor expansion of d in d
1545212222.493 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.493 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.493 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212222.494 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.494 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212222.494 * [misc]backup-simplify:  Simplify (* -1 (pow D 2)) into (* -1 (pow D 2))
1545212222.494 * [misc]taylor:  Taking taylor expansion of (* -1 (pow D 2)) in D
1545212222.494 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212222.494 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.494 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212222.494 * [misc]taylor:  Taking taylor expansion of D in D
1545212222.494 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.494 * [misc]backup-simplify:  Simplify 1 into 1
1545212222.494 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212222.494 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212222.494 * [misc]backup-simplify:  Simplify -1 into -1
1545212222.494 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212222.495 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.495 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212222.495 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.495 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.495 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.496 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212222.496 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.496 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.496 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.496 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.496 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.496 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.496 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212222.497 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.497 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212222.497 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.497 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.497 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))) into 0
1545212222.497 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.498 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.498 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.498 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.498 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.498 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212222.498 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212222.498 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212222.499 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (pow D 2) (pow d 2)))) into 0
1545212222.499 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.499 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.499 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212222.499 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.499 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212222.500 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (pow D 2))) into 0
1545212222.500 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.500 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.500 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.500 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212222.500 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212222.500 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.500 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212222.501 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.501 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212222.501 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.502 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.502 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.502 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212222.502 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.502 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.502 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.502 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.503 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.503 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.503 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.503 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.503 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.503 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.503 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.503 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.504 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212222.504 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.504 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.505 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2))))) into 0
1545212222.505 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.505 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.505 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.505 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.505 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.505 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.505 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.505 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.505 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.506 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212222.506 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212222.506 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.507 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2))))) into 0
1545212222.507 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.507 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.507 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212222.507 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.508 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212222.508 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212222.508 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.508 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.508 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.508 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.509 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.509 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 1))) into 0
1545212222.509 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.509 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212222.510 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212222.510 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212222.510 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212222.511 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.511 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.512 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212222.512 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212222.512 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.512 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.512 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.512 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.512 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.512 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.512 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.512 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.512 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.512 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.512 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.512 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.512 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.513 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212222.513 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.514 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212222.514 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.515 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.515 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))))) into 0
1545212222.515 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212222.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.515 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.515 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.515 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.515 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.515 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.516 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.516 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.516 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.516 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212222.516 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212222.517 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212222.517 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212222.518 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2)))))) into 0
1545212222.518 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212222.518 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.518 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212222.518 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.518 * [misc]backup-simplify:  Simplify 0 into 0
1545212222.518 * [misc]backup-simplify:  Simplify (* -1 (* (pow (/ 1 (- D)) 2) (* (pow (/ 1 (- d)) -2) (* (/ 1 (- w)) (* (/ 1 (- h)) (/ 1 (/ 1 (- c0)))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212222.518 * * * [misc]progress:  simplifying candidates
1545212222.518 * * * * [misc]progress:  [ 1 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (* (exp (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212222.519 * [enter]simplify:  Simplifying (* (exp (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))
1545212222.519 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212222.524 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212222.537 * * [misc]simplify:  iters left: 4 (96 enodes)
1545212222.570 * * [misc]simplify:  iters left: 3 (324 enodes)
1545212222.790 * [exit]simplify:  Simplified to (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M)))))
1545212222.790 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))
1545212222.790 * * * * [misc]progress:  [ 2 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (pow (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) 1)))>
1545212222.790 * * * * [misc]progress:  [ 3 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212222.790 * * * * [misc]progress:  [ 4 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212222.790 * * * * [misc]progress:  [ 5 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (* (cbrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (cbrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212222.791 * * * * [misc]progress:  [ 6 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (cbrt (* (* (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212222.791 * * * * [misc]progress:  [ 7 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (sqrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212222.791 * * * * [misc]progress:  [ 8 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D))))))>
1545212222.791 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d))))
1545212222.792 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212222.804 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212222.852 * * [misc]simplify:  iters left: 4 (400 enodes)
1545212223.188 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* (* D w) D)) (* (* (* d d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212223.189 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* (* D w) D)) (* (* (* d d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D))))))
1545212223.189 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D)))
1545212223.189 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212223.194 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212223.221 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212223.463 * [exit]simplify:  Simplified to (* (* w (* D D)) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))
1545212223.463 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d)))) (* (* w (* D D)) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212223.463 * * * * [misc]progress:  [ 9 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212223.464 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d))))
1545212223.464 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212223.470 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212223.506 * * [misc]simplify:  iters left: 4 (392 enodes)
1545212223.835 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* (/ d D) (* d c0)) h)) (* (* D w) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))
1545212223.835 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* (/ d D) (* d c0)) h)) (* (* D w) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212223.836 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212223.836 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212223.850 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212223.881 * * [misc]simplify:  iters left: 4 (277 enodes)
1545212224.144 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w))
1545212224.145 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w)))))
1545212224.145 * * * * [misc]progress:  [ 10 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212224.145 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D)))))
1545212224.146 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212224.159 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212224.190 * * [misc]simplify:  iters left: 4 (393 enodes)
1545212224.504 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ c0 (/ h d)) (/ d D))) (* (* D w) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))
1545212224.504 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ c0 (/ h d)) (/ d D))) (* (* D w) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212224.504 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212224.505 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212224.514 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212224.545 * * [misc]simplify:  iters left: 4 (277 enodes)
1545212224.811 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w))
1545212224.811 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w)))))
1545212224.811 * * * * [misc]progress:  [ 11 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212224.812 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d))))
1545212224.812 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212224.826 * * [misc]simplify:  iters left: 5 (96 enodes)
1545212224.856 * * [misc]simplify:  iters left: 4 (388 enodes)
1545212225.528 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ c0 h) (/ (* d d) w))) (* (* D D) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))
1545212225.528 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ c0 h) (/ (* d d) w))) (* (* D D) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212225.528 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212225.528 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212225.536 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212225.564 * * [misc]simplify:  iters left: 4 (272 enodes)
1545212225.866 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D D))
1545212225.866 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D D)))))
1545212225.867 * * * * [misc]progress:  [ 12 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212225.867 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212225.867 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212225.880 * * [misc]simplify:  iters left: 5 (93 enodes)
1545212225.908 * * [misc]simplify:  iters left: 4 (385 enodes)
1545212226.245 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ d D) (/ (* c0 d) (* w h)))))
1545212226.246 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ d D) (/ (* c0 d) (* w h))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212226.246 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212226.246 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212226.250 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212226.269 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212226.480 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D)
1545212226.480 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D))))
1545212226.480 * * * * [misc]progress:  [ 13 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212226.480 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212226.481 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212226.493 * * [misc]simplify:  iters left: 5 (94 enodes)
1545212226.533 * * [misc]simplify:  iters left: 4 (390 enodes)
1545212226.912 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ w (* (/ d D) (* d (/ c0 h))))))
1545212226.912 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ w (* (/ d D) (* d (/ c0 h)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212226.913 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212226.913 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212226.922 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212226.953 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212227.213 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D)
1545212227.214 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D))))
1545212227.214 * * * * [misc]progress:  [ 14 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212227.214 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212227.215 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212227.227 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212227.266 * * [misc]simplify:  iters left: 4 (397 enodes)
1545212227.630 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212227.630 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212227.631 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212227.631 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212227.635 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212227.651 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212227.923 * [exit]simplify:  Simplified to (* w (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212227.923 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))))
1545212227.924 * * * * [misc]progress:  [ 15 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))))))>
1545212227.924 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d))))
1545212227.924 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212227.941 * * [misc]simplify:  iters left: 5 (93 enodes)
1545212227.983 * * [misc]simplify:  iters left: 4 (372 enodes)
1545212228.358 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (* (/ c0 h) (* d d))))
1545212228.358 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (* (/ c0 h) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))))))
1545212228.358 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D)))
1545212228.358 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212228.363 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212228.377 * * [misc]simplify:  iters left: 4 (249 enodes)
1545212228.563 * [exit]simplify:  Simplified to (* (* (* D w) D) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))
1545212228.563 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d)))) (* (* (* D w) D) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212228.563 * * * * [misc]progress:  [ 16 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212228.563 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d))))
1545212228.564 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212228.577 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212228.618 * * [misc]simplify:  iters left: 4 (364 enodes)
1545212228.914 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (/ d D)) d) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))
1545212228.914 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (/ d D)) d) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212228.915 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212228.915 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212228.927 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212228.954 * * [misc]simplify:  iters left: 4 (236 enodes)
1545212229.148 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w))
1545212229.148 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)))))
1545212229.148 * * * * [misc]progress:  [ 17 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212229.148 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D)))))
1545212229.149 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212229.159 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212229.184 * * [misc]simplify:  iters left: 4 (365 enodes)
1545212229.458 * [exit]simplify:  Simplified to (+ (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ h (* (* d c0) (/ d D)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))
1545212229.458 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ h (* (* d c0) (/ d D)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212229.459 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212229.459 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212229.463 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212229.477 * * [misc]simplify:  iters left: 4 (236 enodes)
1545212229.683 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w))
1545212229.683 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)))))
1545212229.683 * * * * [misc]progress:  [ 18 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))>
1545212229.683 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d))))
1545212229.683 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212229.691 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212229.734 * * [misc]simplify:  iters left: 4 (360 enodes)
1545212230.047 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 h) (/ w d)) d) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D)))
1545212230.047 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 h) (/ w d)) d) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))
1545212230.048 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D))
1545212230.048 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212230.056 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212230.082 * * [misc]simplify:  iters left: 4 (231 enodes)
1545212230.243 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D D))
1545212230.243 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D D)))))
1545212230.243 * * * * [misc]progress:  [ 19 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212230.244 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212230.244 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212230.260 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212230.297 * * [misc]simplify:  iters left: 4 (352 enodes)
1545212230.615 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (/ (/ (* d c0) (/ D d)) (* w h)) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212230.615 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (/ (/ (* d c0) (/ D d)) (* w h)) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212230.615 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212230.615 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212230.622 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212230.643 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212230.805 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D)
1545212230.806 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D))))
1545212230.806 * * * * [misc]progress:  [ 20 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212230.806 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212230.806 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212230.816 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212230.853 * * [misc]simplify:  iters left: 4 (357 enodes)
1545212231.168 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (* (* (/ c0 w) (/ d h)) (/ d D)) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212231.168 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (* (* (/ c0 w) (/ d h)) (/ d D)) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212231.168 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212231.168 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212231.172 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212231.188 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212231.323 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D)
1545212231.323 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D))))
1545212231.323 * * * * [misc]progress:  [ 21 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))>
1545212231.323 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212231.324 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212231.329 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212231.357 * * [misc]simplify:  iters left: 4 (360 enodes)
1545212231.676 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212231.676 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))
1545212231.677 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w)
1545212231.677 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212231.680 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212231.695 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212231.871 * [exit]simplify:  Simplified to (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212231.871 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212231.871 * * * * [misc]progress:  [ 22 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D))))))>
1545212231.872 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d))))
1545212231.872 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212231.878 * * [misc]simplify:  iters left: 5 (94 enodes)
1545212231.905 * * [misc]simplify:  iters left: 4 (387 enodes)
1545212232.229 * [exit]simplify:  Simplified to (+ (* (* w (* D D)) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (/ h (* d (* d c0)))))
1545212232.229 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (/ h (* d (* d c0))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D))))))
1545212232.230 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D)))
1545212232.230 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212232.237 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212232.252 * * [misc]simplify:  iters left: 4 (247 enodes)
1545212232.429 * [exit]simplify:  Simplified to (* (* w (* D D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212232.430 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d)))) (* (* w (* D D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212232.430 * * * * [misc]progress:  [ 23 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212232.430 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d))))
1545212232.431 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212232.443 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212232.484 * * [misc]simplify:  iters left: 4 (379 enodes)
1545212232.848 * [exit]simplify:  Simplified to (+ (/ (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ h (* (/ d D) (* d c0)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))
1545212232.848 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ h (* (/ d D) (* d c0)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212232.848 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212232.848 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212232.856 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212232.885 * * [misc]simplify:  iters left: 4 (234 enodes)
1545212233.065 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))
1545212233.065 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))))
1545212233.065 * * * * [misc]progress:  [ 24 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212233.066 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D)))))
1545212233.066 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212233.078 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212233.123 * * [misc]simplify:  iters left: 4 (380 enodes)
1545212233.507 * [exit]simplify:  Simplified to (+ (* (* (* (/ d D) d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))
1545212233.507 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ d D) d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212233.507 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212233.507 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212233.516 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212233.542 * * [misc]simplify:  iters left: 4 (234 enodes)
1545212233.781 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))
1545212233.782 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))))
1545212233.782 * * * * [misc]progress:  [ 25 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212233.782 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d))))
1545212233.782 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212233.788 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212233.810 * * [misc]simplify:  iters left: 4 (375 enodes)
1545212234.106 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (/ d w)) d) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)))
1545212234.106 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (/ d w)) d) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212234.106 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212234.106 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212234.114 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212234.141 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212234.362 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D))
1545212234.362 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)))))
1545212234.362 * * * * [misc]progress:  [ 26 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212234.363 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212234.363 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212234.369 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212234.404 * * [misc]simplify:  iters left: 4 (367 enodes)
1545212234.800 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212234.800 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212234.801 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212234.801 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212234.808 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212234.833 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212235.018 * [exit]simplify:  Simplified to (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212235.018 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212235.019 * * * * [misc]progress:  [ 27 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212235.019 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212235.019 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212235.031 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212235.075 * * [misc]simplify:  iters left: 4 (372 enodes)
1545212235.430 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ w (* (* (/ d D) d) (/ c0 h)))))
1545212235.430 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ w (* (* (/ d D) d) (/ c0 h))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212235.430 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212235.431 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212235.434 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212235.447 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212235.570 * [exit]simplify:  Simplified to (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212235.570 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212235.570 * * * * [misc]progress:  [ 28 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212235.571 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212235.571 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212235.576 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212235.598 * * [misc]simplify:  iters left: 4 (375 enodes)
1545212235.845 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) 3)) (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))))))
1545212235.845 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) 3)) (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) (/ (* (/ d D) (/ d D)) (* (/ w c0) h)))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212235.845 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212235.845 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212235.852 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212235.865 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212235.984 * [exit]simplify:  Simplified to (* w (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212235.984 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212235.984 * * * * [misc]progress:  [ 29 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))))))>
1545212235.985 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d))))
1545212235.985 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212235.993 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212236.010 * * [misc]simplify:  iters left: 4 (280 enodes)
1545212236.153 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D (* D w))) (* (* (/ c0 h) (* d d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212236.153 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D (* D w))) (* (* (/ c0 h) (* d d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))))))
1545212236.153 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D)))
1545212236.153 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212236.156 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212236.165 * * [misc]simplify:  iters left: 4 (148 enodes)
1545212236.220 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D w) D))
1545212236.220 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D w) D)))))
1545212236.221 * * * * [misc]progress:  [ 30 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212236.221 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d))))
1545212236.221 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212236.226 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212236.242 * * [misc]simplify:  iters left: 4 (278 enodes)
1545212236.404 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ h (/ (* d c0) (/ D d)))))
1545212236.404 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ h (/ (* d c0) (/ D d))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212236.405 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212236.405 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212236.410 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212236.425 * * [misc]simplify:  iters left: 4 (137 enodes)
1545212236.494 * [exit]simplify:  Simplified to (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212236.494 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d)))) (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212236.494 * * * * [misc]progress:  [ 31 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212236.494 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D)))))
1545212236.495 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212236.500 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212236.516 * * [misc]simplify:  iters left: 4 (279 enodes)
1545212236.678 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ h (/ (* d c0) (/ D d)))))
1545212236.678 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ h (/ (* d c0) (/ D d))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212236.679 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212236.679 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212236.682 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212236.690 * * [misc]simplify:  iters left: 4 (137 enodes)
1545212236.775 * [exit]simplify:  Simplified to (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212236.775 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D))))) (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212236.776 * * * * [misc]progress:  [ 32 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))>
1545212236.776 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d))))
1545212236.776 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212236.781 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212236.806 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212237.005 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ w (* (* d d) (/ c0 h)))))
1545212237.006 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ w (* (* d d) (/ c0 h))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))
1545212237.006 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D))
1545212237.006 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212237.012 * * [misc]simplify:  iters left: 5 (41 enodes)
1545212237.029 * * [misc]simplify:  iters left: 4 (132 enodes)
1545212237.105 * [exit]simplify:  Simplified to (* (* D D) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212237.105 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d)))) (* (* D D) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212237.105 * * * * [misc]progress:  [ 33 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212237.106 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212237.106 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212237.116 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212237.146 * * [misc]simplify:  iters left: 4 (266 enodes)
1545212237.418 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ w (* (/ c0 h) (* (/ d D) d)))))
1545212237.418 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ w (* (/ c0 h) (* (/ d D) d))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212237.418 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212237.419 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212237.421 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212237.429 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212237.501 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D)
1545212237.502 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D))))
1545212237.502 * * * * [misc]progress:  [ 34 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212237.502 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212237.502 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212237.507 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212237.523 * * [misc]simplify:  iters left: 4 (271 enodes)
1545212237.741 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ w (/ (* (* d c0) (/ d D)) h))))
1545212237.741 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ w (/ (* (* d c0) (/ d D)) h)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212237.741 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212237.741 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212237.749 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212237.760 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212237.820 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D)
1545212237.820 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D))))
1545212237.820 * * * * [misc]progress:  [ 35 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))>
1545212237.821 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212237.821 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212237.825 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212237.847 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212238.028 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h)))) (- (* (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (* M M)))) w) (/ (sqrt (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))) (/ h (* (* c0 (/ d D)) (/ d D)))))
1545212238.028 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h)))) (- (* (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (* M M)))) w) (/ (sqrt (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))) (/ h (* (* c0 (/ d D)) (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))
1545212238.029 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w)
1545212238.029 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212238.031 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212238.039 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212238.088 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) w)
1545212238.088 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) w))))
1545212238.089 * * * * [misc]progress:  [ 36 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w (* D D))))))>
1545212238.089 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d d))))
1545212238.089 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212238.100 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212238.131 * * [misc]simplify:  iters left: 4 (289 enodes)
1545212238.308 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) (* (* D w) D)) (* (* (/ c0 h) (* d d)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))
1545212238.308 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) (* (* D w) D)) (* (* (/ c0 h) (* d d)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w (* D D))))))
1545212238.308 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w (* D D)))
1545212238.309 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212238.312 * * [misc]simplify:  iters left: 5 (50 enodes)
1545212238.323 * * [misc]simplify:  iters left: 4 (171 enodes)
1545212238.413 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))) (* w (* D D)))
1545212238.413 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))) (* w (* D D))))))
1545212238.413 * * * * [misc]progress:  [ 37 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212238.413 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) d))))
1545212238.414 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212238.424 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212238.452 * * [misc]simplify:  iters left: 4 (287 enodes)
1545212238.599 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (/ (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))) (/ h (* (* d c0) (/ d D)))))
1545212238.599 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (/ (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))) (/ h (* (* d c0) (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212238.599 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212238.599 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212238.603 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212238.613 * * [misc]simplify:  iters left: 4 (162 enodes)
1545212238.680 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D))
1545212238.680 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D)))))
1545212238.680 * * * * [misc]progress:  [ 38 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212238.680 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d (/ d D)))))
1545212238.680 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212238.688 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212238.704 * * [misc]simplify:  iters left: 4 (288 enodes)
1545212238.898 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* d (* (/ d D) (/ c0 h))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))
1545212238.898 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* d (* (/ d D) (/ c0 h))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212238.898 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212238.898 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212238.902 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212238.912 * * [misc]simplify:  iters left: 4 (162 enodes)
1545212239.013 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D))
1545212239.013 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D)))))
1545212239.013 * * * * [misc]progress:  [ 39 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212239.014 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d d))))
1545212239.014 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212239.024 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212239.049 * * [misc]simplify:  iters left: 4 (283 enodes)
1545212239.214 * [exit]simplify:  Simplified to (+ (* (* D D) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* (* d d) (/ (/ c0 w) h)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))
1545212239.214 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D D) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* (* d d) (/ (/ c0 w) h)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212239.214 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212239.214 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212239.218 * * [misc]simplify:  iters left: 5 (46 enodes)
1545212239.236 * * [misc]simplify:  iters left: 4 (157 enodes)
1545212239.368 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) (* D D))
1545212239.368 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) (* D D)))))
1545212239.368 * * * * [misc]progress:  [ 40 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212239.369 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212239.369 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212239.383 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212239.415 * * [misc]simplify:  iters left: 4 (275 enodes)
1545212239.626 * [exit]simplify:  Simplified to (+ (/ (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ w (* (/ c0 h) (/ d (/ D d))))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) D))
1545212239.626 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ w (* (/ c0 h) (/ d (/ D d))))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212239.627 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212239.627 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212239.634 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212239.652 * * [misc]simplify:  iters left: 4 (152 enodes)
1545212239.776 * [exit]simplify:  Simplified to (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212239.776 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))
1545212239.776 * * * * [misc]progress:  [ 41 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212239.777 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212239.777 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212239.782 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212239.802 * * [misc]simplify:  iters left: 4 (280 enodes)
1545212240.023 * [exit]simplify:  Simplified to (+ (* (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (* d (/ d D)))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))) D))
1545212240.023 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (* d (/ d D)))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212240.023 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212240.024 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212240.034 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212240.051 * * [misc]simplify:  iters left: 4 (152 enodes)
1545212240.134 * [exit]simplify:  Simplified to (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212240.134 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))
1545212240.134 * * * * [misc]progress:  [ 42 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212240.134 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212240.135 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212240.145 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212240.177 * * [misc]simplify:  iters left: 4 (285 enodes)
1545212240.394 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (/ (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ h (* c0 (* (/ d D) (/ d D))))))
1545212240.394 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (/ (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ h (* c0 (* (/ d D) (/ d D)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212240.395 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212240.395 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212240.401 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212240.412 * * [misc]simplify:  iters left: 4 (152 enodes)
1545212240.490 * [exit]simplify:  Simplified to (* w (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212240.490 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))
1545212240.491 * * * * [misc]progress:  [ 43 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w (* D D))))))>
1545212240.491 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d d))))
1545212240.491 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212240.501 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212240.526 * * [misc]simplify:  iters left: 4 (201 enodes)
1545212240.646 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* w (* D D))) (* (* (/ c0 h) (* d d)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))
1545212240.646 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* w (* D D))) (* (* (/ c0 h) (* d d)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w (* D D))))))
1545212240.646 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w (* D D)))
1545212240.646 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212240.652 * * [misc]simplify:  iters left: 5 (34 enodes)
1545212240.667 * * [misc]simplify:  iters left: 4 (87 enodes)
1545212240.702 * * [misc]simplify:  iters left: 3 (212 enodes)
1545212240.791 * [exit]simplify:  Simplified to (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) (* w (* D D)))
1545212240.791 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d d)))) (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) (* w (* D D))))))
1545212240.792 * * * * [misc]progress:  [ 44 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))>
1545212240.792 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) d))))
1545212240.792 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212240.802 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212240.825 * * [misc]simplify:  iters left: 4 (201 enodes)
1545212240.983 * [exit]simplify:  Simplified to (+ (* (/ c0 (/ (/ h d) (/ d D))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))
1545212240.984 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ c0 (/ (/ h d) (/ d D))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))
1545212240.985 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D))
1545212240.985 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212240.990 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212241.001 * * [misc]simplify:  iters left: 4 (76 enodes)
1545212241.031 * * [misc]simplify:  iters left: 3 (193 enodes)
1545212241.140 * [exit]simplify:  Simplified to (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))
1545212241.140 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) d)))) (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))))
1545212241.140 * * * * [misc]progress:  [ 45 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))>
1545212241.141 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d (/ d D)))))
1545212241.141 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212241.147 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212241.159 * * [misc]simplify:  iters left: 4 (202 enodes)
1545212241.649 * [exit]simplify:  Simplified to (+ (* (/ (* (* d c0) (/ d D)) h) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))
1545212241.649 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (* d c0) (/ d D)) h) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))
1545212241.650 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D))
1545212241.650 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212241.655 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212241.665 * * [misc]simplify:  iters left: 4 (76 enodes)
1545212241.694 * * [misc]simplify:  iters left: 3 (193 enodes)
1545212241.768 * [exit]simplify:  Simplified to (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))
1545212241.768 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d (/ d D))))) (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))))
1545212241.768 * * * * [misc]progress:  [ 46 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* D D)))))>
1545212241.769 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d d))))
1545212241.769 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212241.773 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212241.785 * * [misc]simplify:  iters left: 4 (195 enodes)
1545212241.897 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (/ (* d d) w)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)))
1545212241.897 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 h) (/ (* d d) w)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* D D)))))
1545212241.898 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* D D))
1545212241.898 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212241.902 * * [misc]simplify:  iters left: 5 (30 enodes)
1545212241.912 * * [misc]simplify:  iters left: 4 (71 enodes)
1545212241.928 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212241.983 * [exit]simplify:  Simplified to (* (* D D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D))))))
1545212241.983 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d d)))) (* (* D D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))
1545212241.983 * * * * [misc]progress:  [ 47 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))>
1545212241.983 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212241.983 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212241.988 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212242.007 * * [misc]simplify:  iters left: 4 (189 enodes)
1545212242.094 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (/ (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (/ w (* (* (/ d D) (/ c0 h)) d))))
1545212242.094 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (/ (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (/ w (* (* (/ d D) (/ c0 h)) d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))
1545212242.095 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D)
1545212242.095 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212242.099 * * [misc]simplify:  iters left: 5 (27 enodes)
1545212242.108 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212242.133 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212242.234 * [exit]simplify:  Simplified to (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D)
1545212242.234 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D))))
1545212242.234 * * * * [misc]progress:  [ 48 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))>
1545212242.234 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212242.235 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212242.243 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212242.264 * * [misc]simplify:  iters left: 4 (194 enodes)
1545212242.406 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ w (* (* (/ d D) (/ c0 h)) d))))
1545212242.406 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ w (* (* (/ d D) (/ c0 h)) d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))
1545212242.406 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D)
1545212242.406 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212242.408 * * [misc]simplify:  iters left: 5 (27 enodes)
1545212242.413 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212242.431 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212242.489 * [exit]simplify:  Simplified to (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D)
1545212242.489 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D))))
1545212242.489 * * * * [misc]progress:  [ 49 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) w))))>
1545212242.489 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212242.489 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212242.494 * * [misc]simplify:  iters left: 5 (52 enodes)
1545212242.507 * * [misc]simplify:  iters left: 4 (195 enodes)
1545212242.602 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) w) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212242.602 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) w) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) w))))
1545212242.602 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) w)
1545212242.602 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212242.605 * * [misc]simplify:  iters left: 5 (27 enodes)
1545212242.609 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212242.630 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212242.706 * [exit]simplify:  Simplified to (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) w)
1545212242.706 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) w))))
1545212242.706 * * * * [misc]progress:  [ 50 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d d)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w (* D D))))))>
1545212242.707 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d d))))
1545212242.707 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212242.713 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212242.731 * * [misc]simplify:  iters left: 4 (307 enodes)
1545212242.922 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* (* D D) w)) (* (* (* d d) (/ c0 h)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))
1545212242.922 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* (* D D) w)) (* (* (* d d) (/ c0 h)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w (* D D))))))
1545212242.923 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w (* D D)))
1545212242.923 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212242.927 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212242.938 * * [misc]simplify:  iters left: 4 (197 enodes)
1545212243.027 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* (* D w) D))
1545212243.027 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d d)))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* (* D w) D)))))
1545212243.027 * * * * [misc]progress:  [ 51 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212243.027 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) d))))
1545212243.028 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212243.033 * * [misc]simplify:  iters left: 5 (79 enodes)
1545212243.051 * * [misc]simplify:  iters left: 4 (303 enodes)
1545212243.255 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* (* d (/ d D)) (/ c0 h)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212243.255 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* (* d (/ d D)) (/ c0 h)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212243.255 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212243.256 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212243.259 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212243.270 * * [misc]simplify:  iters left: 4 (186 enodes)
1545212243.385 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w))
1545212243.385 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w)))))
1545212243.385 * * * * [misc]progress:  [ 52 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212243.385 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d (/ d D)))))
1545212243.385 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212243.395 * * [misc]simplify:  iters left: 5 (79 enodes)
1545212243.432 * * [misc]simplify:  iters left: 4 (304 enodes)
1545212243.677 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ h (* (/ d D) (* d c0)))))
1545212243.677 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ h (* (/ d D) (* d c0))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212243.678 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212243.678 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212243.681 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212243.693 * * [misc]simplify:  iters left: 4 (186 enodes)
1545212243.832 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w))
1545212243.832 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w)))))
1545212243.832 * * * * [misc]progress:  [ 53 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212243.833 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d d))))
1545212243.833 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212243.839 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212243.857 * * [misc]simplify:  iters left: 4 (301 enodes)
1545212244.065 * [exit]simplify:  Simplified to (+ (* (* D D) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ w (* (* d d) (/ c0 h)))))
1545212244.065 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D D) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ w (* (* d d) (/ c0 h))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212244.066 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212244.066 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212244.072 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212244.083 * * [misc]simplify:  iters left: 4 (181 enodes)
1545212244.203 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* D D))
1545212244.203 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* D D)))))
1545212244.203 * * * * [misc]progress:  [ 54 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212244.203 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212244.203 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212244.209 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212244.232 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212244.496 * [exit]simplify:  Simplified to (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (/ (* (* c0 d) (/ d D)) (* w h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D))
1545212244.496 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (/ (* (* c0 d) (/ d D)) (* w h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212244.497 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212244.497 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212244.504 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212244.529 * * [misc]simplify:  iters left: 4 (176 enodes)
1545212244.671 * [exit]simplify:  Simplified to (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))
1545212244.671 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212244.671 * * * * [misc]progress:  [ 55 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212244.671 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212244.671 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212244.678 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212244.706 * * [misc]simplify:  iters left: 4 (296 enodes)
1545212244.933 * [exit]simplify:  Simplified to (+ (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) (/ w (/ (* (/ d D) (* d c0)) h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D))
1545212244.933 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) (/ w (/ (* (/ d D) (* d c0)) h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212244.933 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212244.934 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212244.939 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212244.955 * * [misc]simplify:  iters left: 4 (176 enodes)
1545212245.085 * [exit]simplify:  Simplified to (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))
1545212245.085 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212245.085 * * * * [misc]progress:  [ 56 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212245.085 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212245.086 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212245.096 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212245.121 * * [misc]simplify:  iters left: 4 (301 enodes)
1545212245.360 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ h (* c0 (* (/ d D) (/ d D))))))
1545212245.360 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ h (* c0 (* (/ d D) (/ d D)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212245.361 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212245.361 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212245.364 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212245.374 * * [misc]simplify:  iters left: 4 (176 enodes)
1545212245.459 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) w)
1545212245.459 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) w))))
1545212245.459 * * * * [misc]progress:  [ 57 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d d)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w (* D D))))))>
1545212245.459 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d d))))
1545212245.459 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212245.464 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212245.478 * * [misc]simplify:  iters left: 4 (233 enodes)
1545212245.581 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (* (* (/ c0 h) (* d d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212245.581 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (* (* (/ c0 h) (* d d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w (* D D))))))
1545212245.582 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w (* D D)))
1545212245.582 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212245.585 * * [misc]simplify:  iters left: 5 (35 enodes)
1545212245.591 * * [misc]simplify:  iters left: 4 (103 enodes)
1545212245.613 * * [misc]simplify:  iters left: 3 (292 enodes)
1545212245.711 * [exit]simplify:  Simplified to (* (sqrt (- M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d))))) (* w (* D D)))
1545212245.711 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d d)))) (* (sqrt (- M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d))))) (* w (* D D))))))
1545212245.711 * * * * [misc]progress:  [ 58 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))>
1545212245.712 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) d))))
1545212245.712 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212245.716 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212245.729 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212245.900 * [exit]simplify:  Simplified to (+ (* (* d (* (/ c0 h) (/ d D))) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))
1545212245.900 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (* (/ c0 h) (/ d D))) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))
1545212245.900 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D))
1545212245.900 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212245.909 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212245.919 * * [misc]simplify:  iters left: 4 (90 enodes)
1545212245.953 * * [misc]simplify:  iters left: 3 (270 enodes)
1545212246.114 * [exit]simplify:  Simplified to (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))
1545212246.114 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) d)))) (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212246.114 * * * * [misc]progress:  [ 59 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))>
1545212246.115 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d (/ d D)))))
1545212246.115 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212246.123 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212246.152 * * [misc]simplify:  iters left: 4 (230 enodes)
1545212246.303 * [exit]simplify:  Simplified to (+ (* (/ (* (* d d) c0) (* h D)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)))
1545212246.303 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (* d d) c0) (* h D)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))
1545212246.303 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D))
1545212246.303 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212246.308 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212246.320 * * [misc]simplify:  iters left: 4 (90 enodes)
1545212246.357 * * [misc]simplify:  iters left: 3 (270 enodes)
1545212246.516 * [exit]simplify:  Simplified to (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))
1545212246.516 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d (/ d D))))) (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212246.516 * * * * [misc]progress:  [ 60 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* D D)))))>
1545212246.516 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d d))))
1545212246.517 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212246.526 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212246.552 * * [misc]simplify:  iters left: 4 (223 enodes)
1545212246.707 * [exit]simplify:  Simplified to (+ (* (/ (* (* d d) (/ c0 h)) w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)))
1545212246.707 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (* d d) (/ c0 h)) w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* D D)))))
1545212246.707 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* D D))
1545212246.707 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212246.710 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212246.719 * * [misc]simplify:  iters left: 4 (85 enodes)
1545212246.745 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212246.865 * [exit]simplify:  Simplified to (* (* D D) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))
1545212246.865 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d d)))) (* (* D D) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))))
1545212246.865 * * * * [misc]progress:  [ 61 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))>
1545212246.865 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212246.866 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212246.870 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212246.884 * * [misc]simplify:  iters left: 4 (217 enodes)
1545212247.043 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ w (* (* d (/ c0 h)) (/ d D)))))
1545212247.043 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ w (* (* d (/ c0 h)) (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))
1545212247.044 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D)
1545212247.044 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212247.046 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212247.051 * * [misc]simplify:  iters left: 4 (82 enodes)
1545212247.070 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212247.172 * [exit]simplify:  Simplified to (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D)
1545212247.172 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D))))
1545212247.172 * * * * [misc]progress:  [ 62 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))>
1545212247.172 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212247.173 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212247.182 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212247.206 * * [misc]simplify:  iters left: 4 (222 enodes)
1545212247.389 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (/ (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (/ w (* (* d (/ c0 h)) (/ d D)))))
1545212247.389 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (/ (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (/ w (* (* d (/ c0 h)) (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))
1545212247.389 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D)
1545212247.390 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212247.394 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212247.405 * * [misc]simplify:  iters left: 4 (82 enodes)
1545212247.437 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212247.581 * [exit]simplify:  Simplified to (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D)
1545212247.582 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D))))
1545212247.582 * * * * [misc]progress:  [ 63 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) w))))>
1545212247.582 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212247.582 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212247.591 * * [misc]simplify:  iters left: 5 (56 enodes)
1545212247.612 * * [misc]simplify:  iters left: 4 (223 enodes)
1545212247.731 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w))) (* (- (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)) M) (- M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)))))) w) (* (sqrt (- M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212247.732 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w))) (* (- (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)) M) (- M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)))))) w) (* (sqrt (- M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) w))))
1545212247.732 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) w)
1545212247.732 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212247.734 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212247.739 * * [misc]simplify:  iters left: 4 (82 enodes)
1545212247.757 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212247.910 * [exit]simplify:  Simplified to (* w (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))
1545212247.910 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212247.910 * * * * [misc]progress:  [ 64 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (pow (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))>
1545212247.911 * * * * [misc]progress:  [ 65 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 1 (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))>
1545212247.911 * * * * [misc]progress:  [ 66 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (- (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))>
1545212247.911 * * * * [misc]progress:  [ 67 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))>
1545212247.911 * * * * [misc]progress:  [ 68 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1))))>
1545212247.911 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212247.911 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212247.914 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212247.921 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212247.934 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212248.003 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212248.003 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1))))
1545212248.003 * * * * [misc]progress:  [ 69 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1))))>
1545212248.003 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212248.003 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212248.005 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212248.009 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212248.022 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212248.115 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212248.115 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1))))
1545212248.115 * * * * [misc]progress:  [ 70 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1))))>
1545212248.115 * * * * [misc]progress:  [ 71 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))))))>
1545212248.115 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))
1545212248.115 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212248.117 * * [misc]simplify:  iters left: 5 (23 enodes)
1545212248.121 * * [misc]simplify:  iters left: 4 (49 enodes)
1545212248.130 * * [misc]simplify:  iters left: 3 (125 enodes)
1545212248.169 * * [misc]simplify:  iters left: 2 (471 enodes)
1545212248.541 * [exit]simplify:  Simplified to (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))
1545212248.541 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))))))
1545212248.541 * * * * [misc]progress:  [ 72 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))))))>
1545212248.541 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))
1545212248.541 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212248.543 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212248.547 * * [misc]simplify:  iters left: 4 (53 enodes)
1545212248.555 * * [misc]simplify:  iters left: 3 (114 enodes)
1545212248.600 * * [misc]simplify:  iters left: 2 (347 enodes)
1545212248.866 * [exit]simplify:  Simplified to (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))
1545212248.866 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))))))
1545212248.866 * * * * [misc]progress:  [ 73 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (log (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212248.866 * * * * [misc]progress:  [ 74 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (log (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212248.866 * * * * [misc]progress:  [ 75 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))))))>
1545212248.866 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))
1545212248.866 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212248.869 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212248.878 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212248.977 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212248.977 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))))))
1545212248.977 * * * * [misc]progress:  [ 76 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))))))>
1545212248.977 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))
1545212248.977 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212248.980 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212248.990 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212249.086 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212249.086 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))))))
1545212249.086 * * * * [misc]progress:  [ 77 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212249.086 * * * * [misc]progress:  [ 78 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212249.086 * * * * [misc]progress:  [ 79 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212249.086 * * * * [misc]progress:  [ 80 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* d d)) (* w (* D D))))))>
1545212249.087 * [enter]simplify:  Simplifying (* (/ c0 h) (* d d))
1545212249.087 * * [misc]simplify:  iters left: 4 (6 enodes)
1545212249.089 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212249.092 * * [misc]simplify:  iters left: 2 (20 enodes)
1545212249.098 * * [misc]simplify:  iters left: 1 (28 enodes)
1545212249.105 * [exit]simplify:  Simplified to (/ (* d d) (/ h c0))
1545212249.105 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (/ (* d d) (/ h c0)) (* w (* D D))))))
1545212249.105 * [enter]simplify:  Simplifying (* w (* D D))
1545212249.106 * * [misc]simplify:  iters left: 4 (4 enodes)
1545212249.107 * * [misc]simplify:  iters left: 3 (7 enodes)
1545212249.109 * * [misc]simplify:  iters left: 2 (9 enodes)
1545212249.112 * [exit]simplify:  Simplified to (* w (* D D))
1545212249.112 * [misc]simplify:  Simplified (2 2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* d d)) (* w (* D D))))))
1545212249.112 * * * * [misc]progress:  [ 81 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* (/ d D) d)) (* w D)))))>
1545212249.112 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) d))
1545212249.112 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212249.115 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212249.120 * * [misc]simplify:  iters left: 4 (40 enodes)
1545212249.136 * * [misc]simplify:  iters left: 3 (79 enodes)
1545212249.148 * * [misc]simplify:  iters left: 2 (132 enodes)
1545212249.179 * * [misc]simplify:  iters left: 1 (191 enodes)
1545212249.235 * [exit]simplify:  Simplified to (* (* d (/ d h)) (/ c0 D))
1545212249.235 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (* d (/ d h)) (/ c0 D)) (* w D)))))
1545212249.235 * [enter]simplify:  Simplifying (* w D)
1545212249.235 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212249.235 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212249.236 * [exit]simplify:  Simplified to (* w D)
1545212249.236 * [misc]simplify:  Simplified (2 2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* (/ d D) d)) (* w D)))))
1545212249.236 * * * * [misc]progress:  [ 82 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* d (/ d D))) (* w D)))))>
1545212249.236 * [enter]simplify:  Simplifying (* (/ c0 h) (* d (/ d D)))
1545212249.236 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212249.238 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212249.240 * * [misc]simplify:  iters left: 4 (41 enodes)
1545212249.248 * * [misc]simplify:  iters left: 3 (75 enodes)
1545212249.259 * * [misc]simplify:  iters left: 2 (125 enodes)
1545212249.281 * * [misc]simplify:  iters left: 1 (181 enodes)
1545212249.334 * [exit]simplify:  Simplified to (* (/ d D) (* c0 (/ d h)))
1545212249.334 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ d D) (* c0 (/ d h))) (* w D)))))
1545212249.334 * [enter]simplify:  Simplifying (* w D)
1545212249.335 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212249.335 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212249.336 * [exit]simplify:  Simplified to (* w D)
1545212249.336 * [misc]simplify:  Simplified (2 2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* d (/ d D))) (* w D)))))
1545212249.336 * * * * [misc]progress:  [ 83 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))>
1545212249.336 * * * * [misc]progress:  [ 84 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212249.336 * [enter]simplify:  Simplifying (/ d D)
1545212249.336 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212249.336 * [exit]simplify:  Simplified to (/ d D)
1545212249.336 * [misc]simplify:  Simplified (2 2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212249.336 * * * * [misc]progress:  [ 85 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))))))>
1545212249.337 * [enter]simplify:  Simplifying (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212249.337 * * [misc]simplify:  iters left: 6 (7 enodes)
1545212249.338 * * [misc]simplify:  iters left: 5 (9 enodes)
1545212249.339 * * [misc]simplify:  iters left: 4 (12 enodes)
1545212249.341 * [exit]simplify:  Simplified to (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212249.341 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))))))
1545212249.341 * * * * [misc]progress:  [ 86 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))))))>
1545212249.341 * [enter]simplify:  Simplifying (sqrt (/ (/ c0 h) w))
1545212249.341 * * [misc]simplify:  iters left: 5 (6 enodes)
1545212249.342 * * [misc]simplify:  iters left: 4 (8 enodes)
1545212249.343 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212249.344 * [exit]simplify:  Simplified to (sqrt (/ (/ c0 h) w))
1545212249.344 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))))))
1545212249.344 * * * * [misc]progress:  [ 87 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))>
1545212249.345 * * * * [misc]progress:  [ 88 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))))))>
1545212249.345 * [enter]simplify:  Simplifying (/ c0 h)
1545212249.345 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212249.345 * [exit]simplify:  Simplified to (/ c0 h)
1545212249.345 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))))))
1545212249.345 * * * * [misc]progress:  [ 89 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d d)) (* D D)))))>
1545212249.345 * [enter]simplify:  Simplifying (* D D)
1545212249.345 * * [misc]simplify:  iters left: 2 (2 enodes)
1545212249.346 * [exit]simplify:  Simplified to (* D D)
1545212249.346 * [misc]simplify:  Simplified (2 2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d d)) (* D D)))))
1545212249.346 * * * * [misc]progress:  [ 90 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))>
1545212249.346 * * * * [misc]progress:  [ 91 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))>
1545212249.346 * * * * [misc]progress:  [ 92 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* (/ d D) (/ d D))) w))))>
1545212249.346 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) (/ d D)))
1545212249.346 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212249.347 * * [misc]simplify:  iters left: 5 (17 enodes)
1545212249.351 * * [misc]simplify:  iters left: 4 (46 enodes)
1545212249.359 * * [misc]simplify:  iters left: 3 (102 enodes)
1545212249.379 * * [misc]simplify:  iters left: 2 (213 enodes)
1545212249.455 * * [misc]simplify:  iters left: 1 (420 enodes)
1545212249.665 * [exit]simplify:  Simplified to (* (* (/ c0 h) (/ d D)) (/ d D))
1545212249.665 * [misc]simplify:  Simplified (2 2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (* (/ c0 h) (/ d D)) (/ d D)) w))))
1545212249.665 * * * * [misc]progress:  [ 93 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))>
1545212249.665 * * * * [misc]progress:  [ 94 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212249.665 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212249.666 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212249.667 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212249.671 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212249.684 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212249.738 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212249.738 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212249.738 * * * * [misc]progress:  [ 95 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212249.738 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212249.738 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212249.740 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212249.744 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212249.759 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212249.827 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212249.827 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212249.827 * * * * [misc]progress:  [ 96 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212249.827 * * * * [misc]progress:  [ 97 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212249.828 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))
1545212249.828 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212249.830 * * [misc]simplify:  iters left: 5 (23 enodes)
1545212249.833 * * [misc]simplify:  iters left: 4 (49 enodes)
1545212249.842 * * [misc]simplify:  iters left: 3 (125 enodes)
1545212249.881 * * [misc]simplify:  iters left: 2 (471 enodes)
1545212250.188 * [exit]simplify:  Simplified to (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))
1545212250.189 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.189 * * * * [misc]progress:  [ 98 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.189 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))
1545212250.189 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212250.191 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212250.194 * * [misc]simplify:  iters left: 4 (53 enodes)
1545212250.202 * * [misc]simplify:  iters left: 3 (114 enodes)
1545212250.227 * * [misc]simplify:  iters left: 2 (347 enodes)
1545212250.390 * [exit]simplify:  Simplified to (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))
1545212250.390 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.390 * * * * [misc]progress:  [ 99 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (log (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.390 * * * * [misc]progress:  [ 100 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (log (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.390 * * * * [misc]progress:  [ 101 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.390 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))
1545212250.390 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212250.393 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212250.402 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212250.472 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212250.472 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.472 * * * * [misc]progress:  [ 102 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.472 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))
1545212250.472 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212250.475 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212250.484 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212250.558 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212250.558 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.558 * * * * [misc]progress:  [ 103 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.558 * * * * [misc]progress:  [ 104 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.558 * * * * [misc]progress:  [ 105 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.558 * * * * [misc]progress:  [ 106 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d d)) (* w (* D D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.558 * [enter]simplify:  Simplifying (* (/ c0 h) (* d d))
1545212250.558 * * [misc]simplify:  iters left: 4 (6 enodes)
1545212250.559 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212250.561 * * [misc]simplify:  iters left: 2 (20 enodes)
1545212250.564 * * [misc]simplify:  iters left: 1 (28 enodes)
1545212250.567 * [exit]simplify:  Simplified to (/ (* d d) (/ h c0))
1545212250.567 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (/ (* d d) (/ h c0)) (* w (* D D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.567 * [enter]simplify:  Simplifying (* w (* D D))
1545212250.568 * * [misc]simplify:  iters left: 4 (4 enodes)
1545212250.568 * * [misc]simplify:  iters left: 3 (7 enodes)
1545212250.569 * * [misc]simplify:  iters left: 2 (9 enodes)
1545212250.570 * [exit]simplify:  Simplified to (* w (* D D))
1545212250.570 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d d)) (* w (* D D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.571 * * * * [misc]progress:  [ 107 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) d)) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.571 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) d))
1545212250.571 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212250.572 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212250.575 * * [misc]simplify:  iters left: 4 (40 enodes)
1545212250.582 * * [misc]simplify:  iters left: 3 (79 enodes)
1545212250.596 * * [misc]simplify:  iters left: 2 (132 enodes)
1545212250.620 * * [misc]simplify:  iters left: 1 (191 enodes)
1545212250.664 * [exit]simplify:  Simplified to (* (* d (/ d h)) (/ c0 D))
1545212250.664 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (* d (/ d h)) (/ c0 D)) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.664 * [enter]simplify:  Simplifying (* w D)
1545212250.665 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212250.665 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212250.666 * [exit]simplify:  Simplified to (* w D)
1545212250.666 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) d)) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.666 * * * * [misc]progress:  [ 108 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d (/ d D))) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.666 * [enter]simplify:  Simplifying (* (/ c0 h) (* d (/ d D)))
1545212250.666 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212250.667 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212250.670 * * [misc]simplify:  iters left: 4 (41 enodes)
1545212250.677 * * [misc]simplify:  iters left: 3 (75 enodes)
1545212250.688 * * [misc]simplify:  iters left: 2 (125 enodes)
1545212250.716 * * [misc]simplify:  iters left: 1 (181 enodes)
1545212250.765 * [exit]simplify:  Simplified to (* (/ d D) (* c0 (/ d h)))
1545212250.765 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ d D) (* c0 (/ d h))) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.765 * [enter]simplify:  Simplifying (* w D)
1545212250.765 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212250.766 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212250.767 * [exit]simplify:  Simplified to (* w D)
1545212250.767 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d (/ d D))) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.767 * * * * [misc]progress:  [ 109 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.767 * * * * [misc]progress:  [ 110 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.767 * [enter]simplify:  Simplifying (/ d D)
1545212250.767 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212250.767 * [exit]simplify:  Simplified to (/ d D)
1545212250.767 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.767 * * * * [misc]progress:  [ 111 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.767 * [enter]simplify:  Simplifying (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212250.768 * * [misc]simplify:  iters left: 6 (7 enodes)
1545212250.769 * * [misc]simplify:  iters left: 5 (9 enodes)
1545212250.770 * * [misc]simplify:  iters left: 4 (12 enodes)
1545212250.772 * [exit]simplify:  Simplified to (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212250.772 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.772 * * * * [misc]progress:  [ 112 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.772 * [enter]simplify:  Simplifying (sqrt (/ (/ c0 h) w))
1545212250.772 * * [misc]simplify:  iters left: 5 (6 enodes)
1545212250.773 * * [misc]simplify:  iters left: 4 (8 enodes)
1545212250.774 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212250.775 * [exit]simplify:  Simplified to (sqrt (/ (/ c0 h) w))
1545212250.775 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.775 * * * * [misc]progress:  [ 113 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.775 * * * * [misc]progress:  [ 114 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.775 * [enter]simplify:  Simplifying (/ c0 h)
1545212250.776 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212250.776 * [exit]simplify:  Simplified to (/ c0 h)
1545212250.776 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.776 * * * * [misc]progress:  [ 115 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d d)) (* D D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.776 * [enter]simplify:  Simplifying (* D D)
1545212250.776 * * [misc]simplify:  iters left: 2 (2 enodes)
1545212250.777 * [exit]simplify:  Simplified to (* D D)
1545212250.777 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d d)) (* D D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212250.777 * * * * [misc]progress:  [ 116 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.777 * * * * [misc]progress:  [ 117 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d (/ d D))) D) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.777 * * * * [misc]progress:  [ 118 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) (/ d D))) w) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212250.777 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) (/ d D)))
1545212250.777 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212250.778 * * [misc]simplify:  iters left: 5 (17 enodes)
1545212250.781 * * [misc]simplify:  iters left: 4 (46 enodes)
1545212250.789 * * [misc]simplify:  iters left: 3 (102 enodes)
1545212250.810 * * [misc]simplify:  iters left: 2 (213 enodes)
1545212250.869 * * [misc]simplify:  iters left: 1 (420 enodes)
1545212251.069 * [exit]simplify:  Simplified to (* (* (/ c0 h) (/ d D)) (/ d D))
1545212251.069 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (* (/ c0 h) (/ d D)) (/ d D)) w) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212251.070 * * * * [misc]progress:  [ 119 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.070 * * * * [misc]progress:  [ 120 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.070 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212251.070 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212251.072 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212251.076 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212251.089 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212251.149 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212251.149 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212251.149 * * * * [misc]progress:  [ 121 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.149 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212251.149 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212251.153 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212251.160 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212251.185 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212251.247 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212251.247 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212251.247 * * * * [misc]progress:  [ 122 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.247 * * * * [misc]progress:  [ 123 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.247 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))
1545212251.247 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212251.249 * * [misc]simplify:  iters left: 5 (23 enodes)
1545212251.253 * * [misc]simplify:  iters left: 4 (49 enodes)
1545212251.261 * * [misc]simplify:  iters left: 3 (125 enodes)
1545212251.298 * * [misc]simplify:  iters left: 2 (471 enodes)
1545212251.626 * [exit]simplify:  Simplified to (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))
1545212251.626 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212251.626 * * * * [misc]progress:  [ 124 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.626 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))
1545212251.626 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212251.628 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212251.635 * * [misc]simplify:  iters left: 4 (53 enodes)
1545212251.643 * * [misc]simplify:  iters left: 3 (114 enodes)
1545212251.668 * * [misc]simplify:  iters left: 2 (347 enodes)
1545212251.831 * [exit]simplify:  Simplified to (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))
1545212251.831 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212251.831 * * * * [misc]progress:  [ 125 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (log (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.831 * * * * [misc]progress:  [ 126 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (log (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.831 * * * * [misc]progress:  [ 127 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.831 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))
1545212251.832 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212251.834 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212251.843 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212251.914 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212251.915 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212251.915 * * * * [misc]progress:  [ 128 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212251.915 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))
1545212251.915 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212251.918 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212251.927 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212252.001 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212252.001 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.001 * * * * [misc]progress:  [ 129 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.001 * * * * [misc]progress:  [ 130 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.002 * * * * [misc]progress:  [ 131 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.002 * * * * [misc]progress:  [ 132 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d d)) (* w (* D D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.002 * [enter]simplify:  Simplifying (* (/ c0 h) (* d d))
1545212252.002 * * [misc]simplify:  iters left: 4 (6 enodes)
1545212252.003 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212252.005 * * [misc]simplify:  iters left: 2 (20 enodes)
1545212252.008 * * [misc]simplify:  iters left: 1 (28 enodes)
1545212252.011 * [exit]simplify:  Simplified to (/ (* d d) (/ h c0))
1545212252.011 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (/ (* d d) (/ h c0)) (* w (* D D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.011 * [enter]simplify:  Simplifying (* w (* D D))
1545212252.011 * * [misc]simplify:  iters left: 4 (4 enodes)
1545212252.012 * * [misc]simplify:  iters left: 3 (7 enodes)
1545212252.013 * * [misc]simplify:  iters left: 2 (9 enodes)
1545212252.014 * [exit]simplify:  Simplified to (* w (* D D))
1545212252.014 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d d)) (* w (* D D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.014 * * * * [misc]progress:  [ 133 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* (/ d D) d)) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.014 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) d))
1545212252.014 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212252.016 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212252.018 * * [misc]simplify:  iters left: 4 (40 enodes)
1545212252.026 * * [misc]simplify:  iters left: 3 (79 enodes)
1545212252.037 * * [misc]simplify:  iters left: 2 (132 enodes)
1545212252.063 * * [misc]simplify:  iters left: 1 (191 enodes)
1545212252.124 * [exit]simplify:  Simplified to (* (* d (/ d h)) (/ c0 D))
1545212252.124 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (* d (/ d h)) (/ c0 D)) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.124 * [enter]simplify:  Simplifying (* w D)
1545212252.124 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212252.125 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212252.126 * [exit]simplify:  Simplified to (* w D)
1545212252.126 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* (/ d D) d)) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.126 * * * * [misc]progress:  [ 134 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d (/ d D))) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.127 * [enter]simplify:  Simplifying (* (/ c0 h) (* d (/ d D)))
1545212252.127 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212252.129 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212252.134 * * [misc]simplify:  iters left: 4 (41 enodes)
1545212252.147 * * [misc]simplify:  iters left: 3 (75 enodes)
1545212252.166 * * [misc]simplify:  iters left: 2 (125 enodes)
1545212252.188 * * [misc]simplify:  iters left: 1 (181 enodes)
1545212252.231 * [exit]simplify:  Simplified to (* (/ d D) (* c0 (/ d h)))
1545212252.231 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ d D) (* c0 (/ d h))) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.232 * [enter]simplify:  Simplifying (* w D)
1545212252.232 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212252.232 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212252.233 * [exit]simplify:  Simplified to (* w D)
1545212252.233 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d (/ d D))) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.233 * * * * [misc]progress:  [ 135 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.233 * * * * [misc]progress:  [ 136 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.233 * [enter]simplify:  Simplifying (/ d D)
1545212252.233 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212252.233 * [exit]simplify:  Simplified to (/ d D)
1545212252.233 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.234 * * * * [misc]progress:  [ 137 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.234 * [enter]simplify:  Simplifying (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212252.234 * * [misc]simplify:  iters left: 6 (7 enodes)
1545212252.235 * * [misc]simplify:  iters left: 5 (9 enodes)
1545212252.236 * * [misc]simplify:  iters left: 4 (12 enodes)
1545212252.238 * [exit]simplify:  Simplified to (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212252.238 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.238 * * * * [misc]progress:  [ 138 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.238 * [enter]simplify:  Simplifying (sqrt (/ (/ c0 h) w))
1545212252.238 * * [misc]simplify:  iters left: 5 (6 enodes)
1545212252.239 * * [misc]simplify:  iters left: 4 (8 enodes)
1545212252.240 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212252.241 * [exit]simplify:  Simplified to (sqrt (/ (/ c0 h) w))
1545212252.241 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.242 * * * * [misc]progress:  [ 139 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.242 * * * * [misc]progress:  [ 140 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.242 * [enter]simplify:  Simplifying (/ c0 h)
1545212252.242 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212252.242 * [exit]simplify:  Simplified to (/ c0 h)
1545212252.242 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.242 * * * * [misc]progress:  [ 141 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d d)) (* D D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.242 * [enter]simplify:  Simplifying (* D D)
1545212252.242 * * [misc]simplify:  iters left: 2 (2 enodes)
1545212252.243 * [exit]simplify:  Simplified to (* D D)
1545212252.243 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d d)) (* D D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.243 * * * * [misc]progress:  [ 142 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.243 * * * * [misc]progress:  [ 143 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.243 * * * * [misc]progress:  [ 144 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* (/ d D) (/ d D))) w)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.243 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) (/ d D)))
1545212252.243 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212252.244 * * [misc]simplify:  iters left: 5 (17 enodes)
1545212252.248 * * [misc]simplify:  iters left: 4 (46 enodes)
1545212252.257 * * [misc]simplify:  iters left: 3 (102 enodes)
1545212252.278 * * [misc]simplify:  iters left: 2 (213 enodes)
1545212252.336 * * [misc]simplify:  iters left: 1 (420 enodes)
1545212252.513 * [exit]simplify:  Simplified to (* (* (/ c0 h) (/ d D)) (/ d D))
1545212252.514 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (* (/ c0 h) (/ d D)) (/ d D)) w)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212252.514 * * * * [misc]progress:  [ 145 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212252.514 * * * * [misc]progress:  [ 146 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))>
1545212252.514 * [enter]simplify:  Simplifying (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212252.514 * * [misc]simplify:  iters left: 6 (13 enodes)
1545212252.518 * * [misc]simplify:  iters left: 5 (30 enodes)
1545212252.524 * * [misc]simplify:  iters left: 4 (134 enodes)
1545212252.599 * [exit]simplify:  Simplified to (* (/ (* 2 c0) (* w h)) (* (/ d D) (/ d D)))
1545212252.599 * [misc]simplify:  Simplified (2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (/ (* 2 c0) (* w h)) (* (/ d D) (/ d D)))))
1545212252.599 * * * * [misc]progress:  [ 147 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (sqrt -1) M)))>
1545212252.599 * [enter]simplify:  Simplifying (* (sqrt -1) M)
1545212252.599 * * [misc]simplify:  iters left: 3 (4 enodes)
1545212252.600 * * [misc]simplify:  iters left: 2 (5 enodes)
1545212252.601 * [exit]simplify:  Simplified to (* M (sqrt -1))
1545212252.601 * [misc]simplify:  Simplified (2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* M (sqrt -1))))
1545212252.601 * * * * [misc]progress:  [ 148 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* -1 (* (sqrt -1) M))))>
1545212252.601 * [enter]simplify:  Simplifying (* -1 (* (sqrt -1) M))
1545212252.602 * * [misc]simplify:  iters left: 5 (5 enodes)
1545212252.603 * * [misc]simplify:  iters left: 4 (10 enodes)
1545212252.605 * * [misc]simplify:  iters left: 3 (21 enodes)
1545212252.608 * * [misc]simplify:  iters left: 2 (22 enodes)
1545212252.611 * [exit]simplify:  Simplified to (* (- M) (sqrt -1))
1545212252.611 * [misc]simplify:  Simplified (2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (- M) (sqrt -1))))
1545212252.611 * * * * [misc]progress:  [ 149 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))>
1545212252.611 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212252.611 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212252.613 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212252.618 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212252.651 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212252.941 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212252.941 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))
1545212252.941 * * * * [misc]progress:  [ 150 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))>
1545212252.941 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212252.941 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212252.943 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212252.948 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212252.981 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212253.252 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212253.252 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))
1545212253.252 * * * * [misc]progress:  [ 151 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))>
1545212253.253 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212253.253 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212253.255 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212253.260 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212253.293 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212253.591 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212253.591 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))
1545212253.591 * * * * [misc]progress:  [ 152 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212253.591 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212253.592 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212253.594 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212253.599 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212253.631 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212253.947 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212253.947 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212253.947 * * * * [misc]progress:  [ 153 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212253.948 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212253.948 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212253.951 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212253.961 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212254.015 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212254.356 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212254.356 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212254.356 * * * * [misc]progress:  [ 154 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212254.356 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212254.357 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212254.360 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212254.370 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212254.424 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212254.771 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212254.771 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212254.771 * * * * [misc]progress:  [ 155 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212254.771 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212254.771 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212254.773 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212254.778 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212254.809 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212255.135 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212255.135 * [misc]simplify:  Simplified (2 2 1 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212255.136 * * * * [misc]progress:  [ 156 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212255.136 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212255.136 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212255.138 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212255.143 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212255.175 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212255.444 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212255.444 * [misc]simplify:  Simplified (2 2 1 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212255.444 * * * * [misc]progress:  [ 157 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))>
1545212255.444 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212255.444 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212255.446 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212255.451 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212255.484 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212255.773 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212255.773 * [misc]simplify:  Simplified (2 2 1 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212255.773 * * * [misc]progress:  adding candidates to table
1545212258.905 * * [misc]progress:  iteration 2 / 4
1545212258.905 * * * [misc]progress:  picking best candidate
1545212259.005 * * * * [misc]pick:  Picked  #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212259.005 * * * [misc]progress:  localizing error
1545212259.019 * * * [misc]progress:  generating rewritten candidates
1545212259.019 * * * * [misc]progress:  [ 1 / 4 ] rewriting at (2 2 1 1)
1545212259.097 * * * * [misc]progress:  [ 2 / 4 ] rewriting at (2 2 1 1 2)
1545212259.109 * * * * [misc]progress:  [ 3 / 4 ] rewriting at (2 2 1 1 1 1 2 1)
1545212259.122 * * * * [misc]progress:  [ 4 / 4 ] rewriting at (2 2 1 1 1 1 1 2)
1545212259.135 * * * [misc]progress:  generating series expansions
1545212259.135 * * * * [misc]progress:  [ 1 / 4 ] generating series at (2 2 1 1)
1545212259.136 * [misc]backup-simplify:  Simplify (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) into (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))))
1545212259.136 * [misc]approximate:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in (M c0 h w d D) around 0
1545212259.136 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in D
1545212259.136 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in D
1545212259.136 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in D
1545212259.136 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in D
1545212259.136 * [misc]taylor:  Taking taylor expansion of M in D
1545212259.136 * [misc]backup-simplify:  Simplify M into M
1545212259.136 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212259.136 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212259.136 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.136 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.136 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.136 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.136 * [misc]backup-simplify:  Simplify d into d
1545212259.136 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212259.136 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.136 * [misc]backup-simplify:  Simplify w into w
1545212259.136 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212259.136 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.137 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.137 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.137 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.137 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.137 * [misc]backup-simplify:  Simplify h into h
1545212259.137 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.137 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.137 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.137 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212259.137 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212259.137 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212259.137 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in D
1545212259.137 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212259.137 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212259.137 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.137 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.137 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.137 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.137 * [misc]backup-simplify:  Simplify d into d
1545212259.137 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212259.137 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.137 * [misc]backup-simplify:  Simplify w into w
1545212259.137 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212259.137 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.137 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.137 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.137 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.137 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.137 * [misc]backup-simplify:  Simplify h into h
1545212259.137 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.137 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.138 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.138 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212259.138 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212259.138 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212259.138 * [misc]taylor:  Taking taylor expansion of M in D
1545212259.138 * [misc]backup-simplify:  Simplify M into M
1545212259.138 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w h))) into (/ (* c0 (pow d 2)) (* w h))
1545212259.138 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w h)) 0) into (/ (* c0 (pow d 2)) (* w h))
1545212259.138 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* w h)) (/ (* c0 (pow d 2)) (* w h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))
1545212259.138 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) into (/ (* c0 (pow d 2)) (* w h))
1545212259.138 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.138 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.139 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.139 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212259.139 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212259.139 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212259.139 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.139 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.139 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.139 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.140 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212259.140 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212259.140 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212259.140 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.141 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* w h)) 0) (* 0 (/ (* c0 (pow d 2)) (* w h)))) into 0
1545212259.141 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))))) into 0
1545212259.141 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212259.141 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212259.141 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.141 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.141 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.141 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.141 * [misc]backup-simplify:  Simplify d into d
1545212259.141 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212259.141 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.141 * [misc]backup-simplify:  Simplify w into w
1545212259.141 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212259.141 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.141 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.141 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.141 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.141 * [misc]backup-simplify:  Simplify h into h
1545212259.141 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.141 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.142 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.142 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212259.142 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212259.142 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212259.142 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in d
1545212259.142 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in d
1545212259.142 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in d
1545212259.142 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in d
1545212259.142 * [misc]taylor:  Taking taylor expansion of M in d
1545212259.142 * [misc]backup-simplify:  Simplify M into M
1545212259.142 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212259.142 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212259.142 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.142 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.142 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.142 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.142 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.142 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.142 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212259.142 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.142 * [misc]backup-simplify:  Simplify w into w
1545212259.142 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212259.142 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.143 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.143 * [misc]backup-simplify:  Simplify D into D
1545212259.143 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.143 * [misc]backup-simplify:  Simplify h into h
1545212259.143 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.143 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212259.143 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.143 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.143 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.143 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212259.143 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in d
1545212259.143 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212259.143 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212259.143 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.143 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.143 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.143 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.143 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.143 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.144 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212259.144 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.144 * [misc]backup-simplify:  Simplify w into w
1545212259.144 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212259.144 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.144 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.144 * [misc]backup-simplify:  Simplify D into D
1545212259.144 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.144 * [misc]backup-simplify:  Simplify h into h
1545212259.144 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.144 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212259.144 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.144 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.144 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.144 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212259.144 * [misc]taylor:  Taking taylor expansion of M in d
1545212259.144 * [misc]backup-simplify:  Simplify M into M
1545212259.144 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212259.145 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212259.145 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212259.145 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212259.145 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212259.145 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.145 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.145 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.145 * [misc]backup-simplify:  Simplify (+ (* M 0) (* 0 (- M))) into 0
1545212259.145 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212259.145 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212259.146 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212259.146 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.146 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.146 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.146 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.146 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.146 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.146 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212259.146 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.146 * [misc]backup-simplify:  Simplify w into w
1545212259.146 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212259.146 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.146 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.146 * [misc]backup-simplify:  Simplify D into D
1545212259.146 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.146 * [misc]backup-simplify:  Simplify h into h
1545212259.146 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.146 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212259.146 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.146 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.146 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.147 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212259.147 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of M in w
1545212259.147 * [misc]backup-simplify:  Simplify M into M
1545212259.147 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.147 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.147 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.147 * [misc]backup-simplify:  Simplify d into d
1545212259.147 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.147 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.147 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.147 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.147 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.147 * [misc]backup-simplify:  Simplify D into D
1545212259.147 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.147 * [misc]backup-simplify:  Simplify h into h
1545212259.147 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.147 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.147 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.148 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.148 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212259.148 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.148 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212259.148 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212259.148 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212259.148 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in w
1545212259.148 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212259.148 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212259.148 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.148 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.149 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.149 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.149 * [misc]backup-simplify:  Simplify d into d
1545212259.149 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212259.149 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.149 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.149 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.149 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212259.149 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.149 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.149 * [misc]backup-simplify:  Simplify D into D
1545212259.149 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.149 * [misc]backup-simplify:  Simplify h into h
1545212259.149 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.149 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.149 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.149 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.149 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212259.149 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.149 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212259.150 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212259.150 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212259.150 * [misc]taylor:  Taking taylor expansion of M in w
1545212259.150 * [misc]backup-simplify:  Simplify M into M
1545212259.150 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212259.150 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) h)) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212259.151 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))
1545212259.151 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212259.151 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.151 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.152 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.152 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.152 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212259.153 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212259.153 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212259.153 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212259.153 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.153 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.153 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.153 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.154 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212259.154 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212259.154 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212259.155 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) h)))) into 0
1545212259.155 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))))) into 0
1545212259.155 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212259.155 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212259.155 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.155 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.155 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.155 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.155 * [misc]backup-simplify:  Simplify d into d
1545212259.155 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212259.155 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.156 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.156 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.156 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212259.156 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.156 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.156 * [misc]backup-simplify:  Simplify D into D
1545212259.156 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.156 * [misc]backup-simplify:  Simplify h into h
1545212259.156 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.156 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.156 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.156 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.156 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212259.156 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.156 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212259.157 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212259.157 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212259.157 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of M in h
1545212259.157 * [misc]backup-simplify:  Simplify M into M
1545212259.157 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.157 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.157 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.157 * [misc]backup-simplify:  Simplify d into d
1545212259.157 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.157 * [misc]backup-simplify:  Simplify w into w
1545212259.157 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.157 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.157 * [misc]backup-simplify:  Simplify D into D
1545212259.157 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.157 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.157 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.157 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.158 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.158 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.158 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.158 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212259.158 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.158 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.158 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212259.159 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212259.159 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in h
1545212259.159 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212259.159 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212259.159 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.159 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.159 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.159 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.159 * [misc]backup-simplify:  Simplify d into d
1545212259.159 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212259.159 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.159 * [misc]backup-simplify:  Simplify w into w
1545212259.159 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212259.159 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.159 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.159 * [misc]backup-simplify:  Simplify D into D
1545212259.159 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.159 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.159 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.159 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.159 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.159 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.159 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.159 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212259.159 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.160 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.160 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212259.160 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212259.160 * [misc]taylor:  Taking taylor expansion of M in h
1545212259.160 * [misc]backup-simplify:  Simplify M into M
1545212259.160 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (pow D 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212259.161 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (pow D 2))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212259.161 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (/ (* c0 (pow d 2)) (* (pow D 2) w))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))
1545212259.161 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212259.161 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.162 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.162 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.162 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.162 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212259.163 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212259.163 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212259.163 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212259.163 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.163 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.163 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.163 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.164 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212259.164 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212259.164 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212259.165 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) w)))) into (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w)))
1545212259.166 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))))) into 0
1545212259.166 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212259.166 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212259.166 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.166 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.166 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.166 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.166 * [misc]backup-simplify:  Simplify d into d
1545212259.166 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212259.166 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.166 * [misc]backup-simplify:  Simplify w into w
1545212259.166 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212259.166 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.166 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.166 * [misc]backup-simplify:  Simplify D into D
1545212259.166 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.166 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.166 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.167 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.167 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.167 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.167 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.167 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212259.167 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.167 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.167 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212259.168 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212259.168 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of M in c0
1545212259.168 * [misc]backup-simplify:  Simplify M into M
1545212259.168 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.168 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.168 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.168 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.168 * [misc]backup-simplify:  Simplify d into d
1545212259.168 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.168 * [misc]backup-simplify:  Simplify w into w
1545212259.168 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.168 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.168 * [misc]backup-simplify:  Simplify D into D
1545212259.168 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.168 * [misc]backup-simplify:  Simplify h into h
1545212259.168 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.169 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.169 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.169 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.169 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.169 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.169 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.169 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.169 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in c0
1545212259.169 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212259.169 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.169 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.169 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.169 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.169 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.170 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.170 * [misc]backup-simplify:  Simplify d into d
1545212259.170 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212259.170 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.170 * [misc]backup-simplify:  Simplify w into w
1545212259.170 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212259.170 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.170 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.170 * [misc]backup-simplify:  Simplify D into D
1545212259.170 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.170 * [misc]backup-simplify:  Simplify h into h
1545212259.170 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.170 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.170 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.170 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.170 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.170 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.171 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.171 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.171 * [misc]taylor:  Taking taylor expansion of M in c0
1545212259.171 * [misc]backup-simplify:  Simplify M into M
1545212259.171 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212259.171 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212259.171 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212259.171 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212259.171 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212259.171 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.171 * [misc]backup-simplify:  Simplify (+ (/ (pow d 2) (* w (* (pow D 2) h))) 0) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.172 * [misc]backup-simplify:  Simplify (+ 0 (/ (pow d 2) (* w (* (pow D 2) h)))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.172 * [misc]backup-simplify:  Simplify (+ (* M (/ (pow d 2) (* w (* (pow D 2) h)))) (* (/ (pow d 2) (* w (* (pow D 2) h))) (- M))) into 0
1545212259.172 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212259.172 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212259.172 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.173 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.173 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.173 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.173 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.173 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.173 * [misc]backup-simplify:  Simplify d into d
1545212259.173 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212259.173 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.173 * [misc]backup-simplify:  Simplify w into w
1545212259.173 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212259.173 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.173 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.173 * [misc]backup-simplify:  Simplify D into D
1545212259.173 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.173 * [misc]backup-simplify:  Simplify h into h
1545212259.173 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.173 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.173 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.173 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.173 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.174 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.174 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.174 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.174 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.174 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.174 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.174 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.174 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.174 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.174 * [misc]backup-simplify:  Simplify d into d
1545212259.174 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.174 * [misc]backup-simplify:  Simplify w into w
1545212259.174 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.174 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.174 * [misc]backup-simplify:  Simplify D into D
1545212259.174 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.174 * [misc]backup-simplify:  Simplify h into h
1545212259.175 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.175 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.175 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.175 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.175 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.175 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212259.175 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212259.175 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212259.175 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.175 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.175 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.175 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.175 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.175 * [misc]backup-simplify:  Simplify d into d
1545212259.175 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212259.175 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.175 * [misc]backup-simplify:  Simplify w into w
1545212259.175 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212259.175 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.175 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.175 * [misc]backup-simplify:  Simplify D into D
1545212259.176 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.176 * [misc]backup-simplify:  Simplify h into h
1545212259.176 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.176 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.176 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.176 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.176 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.176 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212259.176 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.176 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.176 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.176 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.177 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.177 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.177 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212259.178 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.178 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.178 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.178 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.178 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212259.178 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212259.179 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.179 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212259.179 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212259.179 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.179 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.179 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.180 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212259.180 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212259.180 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.180 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212259.181 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212259.182 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212259.182 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212259.182 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.182 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.182 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.182 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.182 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.182 * [misc]backup-simplify:  Simplify d into d
1545212259.182 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212259.182 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.182 * [misc]backup-simplify:  Simplify w into w
1545212259.182 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212259.182 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.182 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.182 * [misc]backup-simplify:  Simplify D into D
1545212259.182 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.182 * [misc]backup-simplify:  Simplify h into h
1545212259.182 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.182 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.183 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.183 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.183 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.183 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212259.183 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212259.183 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212259.183 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212259.183 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212259.183 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.183 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.183 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.183 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212259.183 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.183 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.183 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.183 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.183 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.183 * [misc]backup-simplify:  Simplify d into d
1545212259.183 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212259.183 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.183 * [misc]backup-simplify:  Simplify w into w
1545212259.183 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212259.183 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.184 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.184 * [misc]backup-simplify:  Simplify D into D
1545212259.184 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.184 * [misc]backup-simplify:  Simplify h into h
1545212259.184 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.184 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.184 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.184 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.184 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.184 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212259.184 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212259.184 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212259.184 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.184 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.184 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.184 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.184 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.184 * [misc]backup-simplify:  Simplify d into d
1545212259.184 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212259.184 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.184 * [misc]backup-simplify:  Simplify w into w
1545212259.185 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212259.185 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.185 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.185 * [misc]backup-simplify:  Simplify D into D
1545212259.185 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.185 * [misc]backup-simplify:  Simplify h into h
1545212259.185 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.185 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.185 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.185 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.185 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.185 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212259.185 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.185 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.185 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.186 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.186 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.186 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.187 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212259.187 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.187 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.187 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.187 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.187 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212259.188 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212259.188 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.188 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212259.188 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212259.188 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.189 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.189 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.189 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212259.189 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212259.189 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.190 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212259.190 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212259.191 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212259.191 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212259.191 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.191 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.191 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.191 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.191 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.191 * [misc]backup-simplify:  Simplify d into d
1545212259.191 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212259.191 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.191 * [misc]backup-simplify:  Simplify w into w
1545212259.191 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212259.191 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.191 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.191 * [misc]backup-simplify:  Simplify D into D
1545212259.191 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.192 * [misc]backup-simplify:  Simplify h into h
1545212259.192 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.192 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.192 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.192 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212259.192 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212259.192 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212259.193 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212259.193 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in c0
1545212259.193 * [misc]taylor:  Taking taylor expansion of 2 in c0
1545212259.193 * [misc]backup-simplify:  Simplify 2 into 2
1545212259.193 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in c0
1545212259.193 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.193 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.193 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.193 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.193 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.193 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.193 * [misc]backup-simplify:  Simplify d into d
1545212259.193 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in c0
1545212259.193 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.193 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.193 * [misc]backup-simplify:  Simplify D into D
1545212259.193 * [misc]taylor:  Taking taylor expansion of (* w h) in c0
1545212259.193 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.193 * [misc]backup-simplify:  Simplify w into w
1545212259.193 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.193 * [misc]backup-simplify:  Simplify h into h
1545212259.193 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.193 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.193 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.194 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.194 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.194 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212259.194 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.194 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.194 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.194 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.194 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.195 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212259.195 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212259.195 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.195 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.195 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212259.195 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.195 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.195 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.196 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (* w (* (pow D 2) h)))) into (* 2 (/ (pow d 2) (* w (* (pow D 2) h))))
1545212259.196 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (* w (* (pow D 2) h)))) in h
1545212259.196 * [misc]taylor:  Taking taylor expansion of 2 in h
1545212259.196 * [misc]backup-simplify:  Simplify 2 into 2
1545212259.196 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212259.196 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.196 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.196 * [misc]backup-simplify:  Simplify d into d
1545212259.196 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212259.196 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.196 * [misc]backup-simplify:  Simplify w into w
1545212259.196 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212259.196 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.196 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.196 * [misc]backup-simplify:  Simplify D into D
1545212259.196 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.196 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.196 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.196 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.196 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.196 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212259.196 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.197 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.197 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212259.197 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212259.197 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (* w (pow D 2)))) into (* 2 (/ (pow d 2) (* w (pow D 2))))
1545212259.197 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (* w (pow D 2)))) in w
1545212259.197 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212259.197 * [misc]backup-simplify:  Simplify 2 into 2
1545212259.197 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212259.197 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.197 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.198 * [misc]backup-simplify:  Simplify d into d
1545212259.198 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212259.198 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.198 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.198 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.198 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.198 * [misc]backup-simplify:  Simplify D into D
1545212259.198 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.198 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.198 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212259.198 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.198 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212259.198 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212259.198 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (pow D 2))) into (* 2 (/ (pow d 2) (pow D 2)))
1545212259.199 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (pow D 2))) in d
1545212259.199 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212259.199 * [misc]backup-simplify:  Simplify 2 into 2
1545212259.199 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212259.199 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.199 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.199 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.199 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.199 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.199 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.199 * [misc]backup-simplify:  Simplify D into D
1545212259.199 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.199 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.199 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212259.199 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.200 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.200 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.200 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.200 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212259.201 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.201 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.201 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.202 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.202 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.202 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.202 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.203 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212259.203 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.203 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.204 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))) into (- 1)
1545212259.205 * [misc]backup-simplify:  Simplify (/ (- (- 1) (pow 0 2) (+)) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2))))
1545212259.205 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.206 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.206 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.206 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.206 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212259.207 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.207 * [misc]backup-simplify:  Simplify (+ (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 0) into (- (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))))
1545212259.208 * [misc]taylor:  Taking taylor expansion of (- (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) in c0
1545212259.208 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in c0
1545212259.208 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212259.208 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212259.208 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212259.208 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.208 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.208 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.208 * [misc]backup-simplify:  Simplify D into D
1545212259.208 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.208 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.208 * [misc]backup-simplify:  Simplify h into h
1545212259.208 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.208 * [misc]backup-simplify:  Simplify w into w
1545212259.208 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.208 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.208 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.208 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.208 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.208 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.208 * [misc]backup-simplify:  Simplify d into d
1545212259.208 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.208 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.208 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.208 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.208 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.209 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.209 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.209 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.209 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.209 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.209 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.209 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.210 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212259.210 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.210 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212259.211 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.211 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.211 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.211 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.211 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.211 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.211 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212259.212 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212259.212 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.212 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.212 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.213 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h))))) into 0
1545212259.213 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.213 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.213 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.213 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.213 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.214 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212259.214 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212259.214 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (* w (pow D 2))))) into 0
1545212259.214 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.214 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.215 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.215 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.215 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212259.216 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212259.216 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (pow D 2)))) into 0
1545212259.216 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.216 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.217 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.217 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.217 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.218 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212259.218 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212259.219 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.219 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.219 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.219 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.220 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.220 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.221 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212259.221 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212259.222 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.222 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.223 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))) into 0
1545212259.223 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))))))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212259.224 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.224 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.224 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.225 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212259.225 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212259.226 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.226 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.226 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212259.226 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.226 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.226 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.226 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.227 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.227 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.227 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.228 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.228 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.229 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212259.229 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.229 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.229 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.229 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.229 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.229 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.230 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.230 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.230 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.231 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.231 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.232 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h)))))) into 0
1545212259.232 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.232 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.232 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.232 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.232 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.232 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.233 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.233 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.233 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212259.234 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.234 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2)))))) into 0
1545212259.234 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.234 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.235 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.235 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.235 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.235 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.235 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.235 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.235 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.235 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.235 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.235 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.236 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212259.236 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.237 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2))))) into 0
1545212259.237 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.237 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.237 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.237 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.237 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.237 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.237 * [misc]backup-simplify:  Simplify (* 2 (/ 1 (pow D 2))) into (/ 2 (pow D 2))
1545212259.237 * [misc]taylor:  Taking taylor expansion of (/ 2 (pow D 2)) in D
1545212259.237 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212259.237 * [misc]backup-simplify:  Simplify 2 into 2
1545212259.237 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.237 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.237 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.237 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.237 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.238 * [misc]backup-simplify:  Simplify (/ 2 1) into 2
1545212259.238 * [misc]backup-simplify:  Simplify 2 into 2
1545212259.238 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.239 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.239 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.240 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212259.240 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212259.241 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.241 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.242 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.242 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.243 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.243 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.244 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212259.244 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212259.245 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.245 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.246 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))))) into 0
1545212259.247 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 2) (+ (* 2 (* 0 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))))
1545212259.248 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.248 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.248 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.248 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212259.249 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212259.249 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.250 * [misc]backup-simplify:  Simplify (+ (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))) 0) into (- (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))))
1545212259.250 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))))) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212259.250 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212259.250 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of (* (pow D 6) (* (pow h 3) (pow w 3))) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of (pow D 6) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.250 * [misc]backup-simplify:  Simplify D into D
1545212259.250 * [misc]taylor:  Taking taylor expansion of (* (pow h 3) (pow w 3)) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of (pow h 3) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.250 * [misc]backup-simplify:  Simplify h into h
1545212259.250 * [misc]taylor:  Taking taylor expansion of (pow w 3) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.250 * [misc]backup-simplify:  Simplify w into w
1545212259.250 * [misc]taylor:  Taking taylor expansion of (* (pow c0 3) (pow d 6)) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of (pow c0 3) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.250 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.250 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.250 * [misc]taylor:  Taking taylor expansion of (pow d 6) in c0
1545212259.250 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.250 * [misc]backup-simplify:  Simplify d into d
1545212259.250 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.250 * [misc]backup-simplify:  Simplify (* D (pow D 2)) into (pow D 3)
1545212259.250 * [misc]backup-simplify:  Simplify (* (pow D 3) (pow D 3)) into (pow D 6)
1545212259.250 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212259.250 * [misc]backup-simplify:  Simplify (* h (pow h 2)) into (pow h 3)
1545212259.250 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212259.250 * [misc]backup-simplify:  Simplify (* w (pow w 2)) into (pow w 3)
1545212259.250 * [misc]backup-simplify:  Simplify (* (pow h 3) (pow w 3)) into (* (pow h 3) (pow w 3))
1545212259.250 * [misc]backup-simplify:  Simplify (* (pow D 6) (* (pow h 3) (pow w 3))) into (* (pow D 6) (* (pow h 3) (pow w 3)))
1545212259.251 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.251 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.251 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.251 * [misc]backup-simplify:  Simplify (* d (pow d 2)) into (pow d 3)
1545212259.251 * [misc]backup-simplify:  Simplify (* (pow d 3) (pow d 3)) into (pow d 6)
1545212259.251 * [misc]backup-simplify:  Simplify (* 1 (pow d 6)) into (pow d 6)
1545212259.251 * [misc]backup-simplify:  Simplify (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) into (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))
1545212259.251 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.251 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.252 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212259.252 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212259.252 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212259.252 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 (pow h 2))) into 0
1545212259.252 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212259.252 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.252 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212259.252 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (pow w 2))) into 0
1545212259.253 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212259.253 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212259.253 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3))))) into 0
1545212259.253 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.253 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 (pow D 2))) into 0
1545212259.253 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (* 0 (pow D 3))) into 0
1545212259.254 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (* 0 (pow w 3)))) into 0
1545212259.254 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.254 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212259.254 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (* 0 (pow D 3)))) into 0
1545212259.254 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (* 0 (pow w 3))) into 0
1545212259.254 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.255 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212259.256 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3))))) into 0
1545212259.256 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3)))))) into 0
1545212259.256 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.257 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.257 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.257 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.257 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 (pow d 2))) into 0
1545212259.257 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.257 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3))))) into 0
1545212259.257 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.258 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.258 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (* 0 (pow d 3)))) into 0
1545212259.258 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.258 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.258 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (* 0 (pow d 3))) into 0
1545212259.258 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.259 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.259 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6))))) into 0
1545212259.259 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (* 0 (* (pow h 3) (pow w 3)))) into 0
1545212259.259 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow d 6))) into 0
1545212259.259 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))))) into 0
1545212259.260 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 6)))) into 0
1545212259.260 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))) into 0
1545212259.260 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212259.260 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212259.261 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)))))) into 0
1545212259.261 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.261 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.261 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.261 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.261 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.261 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.262 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.262 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.262 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.262 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.263 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.263 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212259.263 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.263 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.263 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.263 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.263 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.264 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.264 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.264 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212259.265 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.265 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.265 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.266 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h))))))) into 0
1545212259.266 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.266 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.266 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.266 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.266 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.266 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.266 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.266 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.266 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.266 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.267 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.267 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.267 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212259.268 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.269 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2))))))) into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.269 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.269 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.270 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.270 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.270 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.270 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.270 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.270 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.270 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.270 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.271 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.271 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212259.272 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.272 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2)))))) into 0
1545212259.272 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.272 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.272 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.272 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.273 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.273 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.273 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.273 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.273 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.273 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.274 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212259.274 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ 1 (pow D 2)))) into 0
1545212259.274 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.274 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.274 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.275 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* 2 (/ 0 1)))) into 0
1545212259.275 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.275 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.275 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212259.276 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212259.277 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.277 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212259.278 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212259.279 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.279 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.279 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.280 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212259.281 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212259.281 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.282 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212259.282 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212259.283 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.283 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.285 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))))) into 0
1545212259.285 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))))) (* 2 (* (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212259.286 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212259.287 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212259.287 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.288 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212259.289 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212259.290 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.290 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.290 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212259.290 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.290 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.290 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.290 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.291 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2)))))) into 0
1545212259.291 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212259.292 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2)))))) into 0
1545212259.292 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3)))))) into 0
1545212259.293 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.293 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212259.294 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3)))))) into 0
1545212259.294 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))))) into 0
1545212259.295 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.295 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.296 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3)))))) into 0
1545212259.296 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212259.297 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212259.297 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6)))))) into 0
1545212259.298 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212259.299 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))))))) into 0
1545212259.299 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.299 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.299 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.299 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.299 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.299 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.300 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.300 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212259.301 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212259.302 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212259.302 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.303 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))))) into 0
1545212259.303 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.303 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.303 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.303 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.303 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.304 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212259.305 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212259.305 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212259.306 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.306 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212259.307 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.308 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h)))))))) into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.308 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.308 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.309 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.309 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.309 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.309 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.309 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.310 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.310 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212259.311 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212259.311 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.312 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2)))))))) into 0
1545212259.312 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.312 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.312 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.312 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.312 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.312 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.312 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.312 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.312 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.313 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.313 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.314 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.314 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.315 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.315 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.316 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212259.317 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.317 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2))))))) into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.318 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.318 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.319 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.319 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.319 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.319 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.319 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.319 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.319 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.319 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.320 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.320 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.320 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.320 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2))))) into 0
1545212259.321 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.321 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.321 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.321 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.321 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.322 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.322 * [misc]backup-simplify:  Simplify (* 2 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) (* c0 1)))))) into (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212259.323 * [misc]backup-simplify:  Simplify (+ (sqrt (* (+ (/ 1 M) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) (- (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) (/ 1 M)))) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) into (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))
1545212259.323 * [misc]approximate:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in (M c0 h w d D) around 0
1545212259.323 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in D
1545212259.323 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212259.323 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.324 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.324 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.324 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.324 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.324 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.324 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.324 * [misc]backup-simplify:  Simplify h into h
1545212259.324 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.324 * [misc]backup-simplify:  Simplify w into w
1545212259.324 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212259.324 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.324 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.324 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.324 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.324 * [misc]backup-simplify:  Simplify d into d
1545212259.324 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.324 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.324 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.324 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.324 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.324 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.324 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in D
1545212259.324 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in D
1545212259.325 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212259.325 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212259.325 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.325 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.325 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.325 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.325 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.325 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.325 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.325 * [misc]backup-simplify:  Simplify h into h
1545212259.325 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.325 * [misc]backup-simplify:  Simplify w into w
1545212259.325 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212259.325 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.325 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.325 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.325 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.325 * [misc]backup-simplify:  Simplify d into d
1545212259.325 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.325 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.325 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.325 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.325 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.326 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.326 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212259.326 * [misc]taylor:  Taking taylor expansion of M in D
1545212259.326 * [misc]backup-simplify:  Simplify M into M
1545212259.326 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.326 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212259.326 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212259.326 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.326 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.326 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.326 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.326 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.326 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.326 * [misc]backup-simplify:  Simplify h into h
1545212259.326 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.326 * [misc]backup-simplify:  Simplify w into w
1545212259.326 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212259.326 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.326 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.326 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.326 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.326 * [misc]backup-simplify:  Simplify d into d
1545212259.326 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.326 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.326 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.327 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.327 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.327 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.327 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212259.327 * [misc]taylor:  Taking taylor expansion of M in D
1545212259.327 * [misc]backup-simplify:  Simplify M into M
1545212259.327 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.327 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212259.327 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212259.327 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212259.327 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212259.327 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212259.327 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.328 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.328 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.328 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.328 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.328 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) 0) (* 0 (/ 1 M))) into 0
1545212259.328 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212259.328 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in d
1545212259.328 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212259.328 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.328 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.329 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.329 * [misc]backup-simplify:  Simplify D into D
1545212259.329 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.329 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.329 * [misc]backup-simplify:  Simplify h into h
1545212259.329 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.329 * [misc]backup-simplify:  Simplify w into w
1545212259.329 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212259.329 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.329 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.329 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.329 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.329 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.329 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.329 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.329 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.329 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.329 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212259.329 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.329 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in d
1545212259.330 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in d
1545212259.330 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212259.330 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212259.330 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.330 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.330 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.330 * [misc]backup-simplify:  Simplify D into D
1545212259.330 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.330 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.330 * [misc]backup-simplify:  Simplify h into h
1545212259.330 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.330 * [misc]backup-simplify:  Simplify w into w
1545212259.330 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212259.330 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.330 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.330 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.330 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.330 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.330 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.330 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.330 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.330 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.330 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.330 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212259.331 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.331 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212259.331 * [misc]taylor:  Taking taylor expansion of M in d
1545212259.331 * [misc]backup-simplify:  Simplify M into M
1545212259.331 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.331 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212259.331 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212259.331 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.331 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.331 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.331 * [misc]backup-simplify:  Simplify D into D
1545212259.331 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.331 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.331 * [misc]backup-simplify:  Simplify h into h
1545212259.331 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.331 * [misc]backup-simplify:  Simplify w into w
1545212259.331 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212259.331 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.331 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.331 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.331 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.331 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.331 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.331 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.331 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.331 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.332 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.332 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212259.332 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.332 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212259.332 * [misc]taylor:  Taking taylor expansion of M in d
1545212259.332 * [misc]backup-simplify:  Simplify M into M
1545212259.332 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.332 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.332 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.333 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) c0) (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212259.333 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212259.333 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.333 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.333 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.333 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.334 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212259.334 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212259.334 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.334 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.334 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.334 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.335 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.335 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212259.335 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212259.335 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.335 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) c0) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212259.336 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212259.336 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in w
1545212259.336 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212259.336 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.336 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.336 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.336 * [misc]backup-simplify:  Simplify D into D
1545212259.336 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.336 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.336 * [misc]backup-simplify:  Simplify h into h
1545212259.336 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.336 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.336 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.336 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212259.336 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.336 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.336 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.336 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.336 * [misc]backup-simplify:  Simplify d into d
1545212259.336 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.336 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.336 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.337 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.337 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.337 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.337 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.337 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.337 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.337 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in w
1545212259.337 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in w
1545212259.337 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212259.337 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212259.338 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.338 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.338 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.338 * [misc]backup-simplify:  Simplify D into D
1545212259.338 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.338 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.338 * [misc]backup-simplify:  Simplify h into h
1545212259.338 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.338 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.338 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.338 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212259.338 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.338 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.338 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.338 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.338 * [misc]backup-simplify:  Simplify d into d
1545212259.338 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.338 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.338 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.338 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.338 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.339 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.339 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.339 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.339 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.339 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212259.339 * [misc]taylor:  Taking taylor expansion of M in w
1545212259.339 * [misc]backup-simplify:  Simplify M into M
1545212259.339 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.339 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212259.339 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212259.339 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.339 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.339 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.339 * [misc]backup-simplify:  Simplify D into D
1545212259.339 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.339 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.339 * [misc]backup-simplify:  Simplify h into h
1545212259.339 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.339 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.339 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.339 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212259.339 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.339 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.340 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.340 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.340 * [misc]backup-simplify:  Simplify d into d
1545212259.340 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.340 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.340 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.340 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.340 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.340 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.340 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.340 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.341 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.341 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212259.341 * [misc]taylor:  Taking taylor expansion of M in w
1545212259.341 * [misc]backup-simplify:  Simplify M into M
1545212259.341 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.341 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212259.341 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212259.341 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212259.341 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212259.341 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212259.341 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.342 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.342 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.342 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.342 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.343 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (/ (* (pow D 2) h) (* c0 (pow d 2))) (/ 1 M))) into 0
1545212259.343 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212259.343 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in h
1545212259.343 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212259.343 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.343 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.343 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.343 * [misc]backup-simplify:  Simplify D into D
1545212259.343 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.343 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.343 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.343 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.343 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.343 * [misc]backup-simplify:  Simplify w into w
1545212259.343 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212259.343 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.343 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.343 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.343 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.343 * [misc]backup-simplify:  Simplify d into d
1545212259.343 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.343 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.343 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.344 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.344 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.344 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.344 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.344 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.344 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.344 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in h
1545212259.344 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in h
1545212259.344 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212259.345 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212259.345 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.345 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.345 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.345 * [misc]backup-simplify:  Simplify D into D
1545212259.345 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.345 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.345 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.345 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.345 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.345 * [misc]backup-simplify:  Simplify w into w
1545212259.345 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212259.345 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.345 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.345 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.345 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.345 * [misc]backup-simplify:  Simplify d into d
1545212259.345 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.345 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.345 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.345 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.345 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.346 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.346 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.346 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.346 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.346 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212259.346 * [misc]taylor:  Taking taylor expansion of M in h
1545212259.346 * [misc]backup-simplify:  Simplify M into M
1545212259.346 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.346 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212259.346 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212259.346 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.346 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.346 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.346 * [misc]backup-simplify:  Simplify D into D
1545212259.346 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.346 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.346 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.346 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.346 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.346 * [misc]backup-simplify:  Simplify w into w
1545212259.347 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212259.347 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.347 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.347 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.347 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.347 * [misc]backup-simplify:  Simplify d into d
1545212259.347 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.347 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.347 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.347 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.347 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.347 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.347 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.348 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.348 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.348 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212259.348 * [misc]taylor:  Taking taylor expansion of M in h
1545212259.348 * [misc]backup-simplify:  Simplify M into M
1545212259.348 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.348 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212259.348 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212259.348 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212259.348 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212259.348 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212259.348 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.349 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212259.349 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.349 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.349 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212259.350 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (/ (* (pow D 2) w) (* c0 (pow d 2))) (/ 1 M))) into (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M))))
1545212259.350 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M)))) (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212259.350 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in c0
1545212259.350 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212259.351 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.351 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.351 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.351 * [misc]backup-simplify:  Simplify D into D
1545212259.351 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.351 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.351 * [misc]backup-simplify:  Simplify h into h
1545212259.351 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.351 * [misc]backup-simplify:  Simplify w into w
1545212259.351 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.351 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.351 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.351 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.351 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.351 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.351 * [misc]backup-simplify:  Simplify d into d
1545212259.351 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.351 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.351 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.351 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.351 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.351 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.352 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.352 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.352 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in c0
1545212259.352 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in c0
1545212259.352 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212259.352 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212259.352 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.352 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.352 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.352 * [misc]backup-simplify:  Simplify D into D
1545212259.352 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.352 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.352 * [misc]backup-simplify:  Simplify h into h
1545212259.352 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.352 * [misc]backup-simplify:  Simplify w into w
1545212259.352 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.352 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.352 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.352 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.352 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.352 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.352 * [misc]backup-simplify:  Simplify d into d
1545212259.352 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.352 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.352 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.353 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.353 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.353 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.353 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.353 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.353 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212259.353 * [misc]taylor:  Taking taylor expansion of M in c0
1545212259.353 * [misc]backup-simplify:  Simplify M into M
1545212259.353 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.353 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212259.353 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212259.353 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.353 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.353 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.353 * [misc]backup-simplify:  Simplify D into D
1545212259.353 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.353 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.354 * [misc]backup-simplify:  Simplify h into h
1545212259.354 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.354 * [misc]backup-simplify:  Simplify w into w
1545212259.354 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.354 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.354 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.354 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.354 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.354 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.354 * [misc]backup-simplify:  Simplify d into d
1545212259.354 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.354 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.354 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.354 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.354 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.354 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.354 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.355 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.355 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212259.355 * [misc]taylor:  Taking taylor expansion of M in c0
1545212259.355 * [misc]backup-simplify:  Simplify M into M
1545212259.355 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.355 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.355 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.356 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212259.356 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.356 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.356 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.356 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.356 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.357 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212259.357 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.357 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212259.357 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.357 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.357 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.358 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.358 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212259.358 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.358 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212259.358 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212259.359 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 1 M)) (* (- (/ 1 M)) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212259.359 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212259.359 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212259.359 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212259.359 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.360 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.360 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.360 * [misc]backup-simplify:  Simplify D into D
1545212259.360 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.360 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.360 * [misc]backup-simplify:  Simplify h into h
1545212259.360 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.360 * [misc]backup-simplify:  Simplify w into w
1545212259.360 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.360 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.360 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.360 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.360 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.360 * [misc]backup-simplify:  Simplify d into d
1545212259.360 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.360 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.360 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.360 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.360 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.360 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.360 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212259.360 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212259.361 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212259.361 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212259.361 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.361 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.361 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.361 * [misc]backup-simplify:  Simplify D into D
1545212259.361 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.361 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.361 * [misc]backup-simplify:  Simplify h into h
1545212259.361 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.361 * [misc]backup-simplify:  Simplify w into w
1545212259.361 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.361 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.361 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.361 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.361 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.361 * [misc]backup-simplify:  Simplify d into d
1545212259.361 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.361 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.361 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.361 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.361 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.361 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.362 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212259.362 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.362 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.362 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.362 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212259.362 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212259.362 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.362 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.362 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.362 * [misc]backup-simplify:  Simplify D into D
1545212259.362 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.362 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.362 * [misc]backup-simplify:  Simplify h into h
1545212259.362 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.362 * [misc]backup-simplify:  Simplify w into w
1545212259.362 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.362 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.362 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.362 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.362 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.362 * [misc]backup-simplify:  Simplify d into d
1545212259.362 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.362 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.362 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.363 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.363 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.363 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.363 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212259.363 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.363 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.363 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.363 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212259.363 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212259.363 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212259.364 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212259.364 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.364 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.364 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212259.365 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.365 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.365 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212259.366 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212259.367 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212259.367 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212259.367 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212259.367 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.367 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.367 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.367 * [misc]backup-simplify:  Simplify D into D
1545212259.367 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.367 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.367 * [misc]backup-simplify:  Simplify h into h
1545212259.367 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.367 * [misc]backup-simplify:  Simplify w into w
1545212259.367 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.367 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.367 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.367 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.367 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.367 * [misc]backup-simplify:  Simplify d into d
1545212259.367 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.367 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.367 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.367 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.368 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.368 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.368 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212259.368 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212259.368 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212259.368 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212259.368 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.368 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.368 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.368 * [misc]backup-simplify:  Simplify D into D
1545212259.368 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.368 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.368 * [misc]backup-simplify:  Simplify h into h
1545212259.368 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.368 * [misc]backup-simplify:  Simplify w into w
1545212259.368 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.368 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.368 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.368 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.368 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.368 * [misc]backup-simplify:  Simplify d into d
1545212259.368 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.368 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.369 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.369 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.369 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.369 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.369 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212259.369 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.369 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.369 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.369 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.369 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212259.369 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212259.369 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.369 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.369 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.369 * [misc]backup-simplify:  Simplify D into D
1545212259.369 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.369 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.369 * [misc]backup-simplify:  Simplify h into h
1545212259.369 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.369 * [misc]backup-simplify:  Simplify w into w
1545212259.369 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212259.369 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.370 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.370 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.370 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.370 * [misc]backup-simplify:  Simplify d into d
1545212259.370 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.370 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.370 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.370 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.370 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.370 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.370 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212259.370 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.370 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.370 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.370 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.371 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212259.371 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212259.371 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212259.371 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212259.371 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.371 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.372 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212259.372 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.372 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.372 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212259.373 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212259.374 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212259.374 * [misc]backup-simplify:  Simplify (+ 0 (sqrt -1)) into (sqrt -1)
1545212259.374 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212259.374 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.374 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.374 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.375 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.375 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212259.375 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212259.375 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.375 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.375 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.375 * [misc]backup-simplify:  Simplify D into D
1545212259.375 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.375 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.375 * [misc]backup-simplify:  Simplify h into h
1545212259.375 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.375 * [misc]backup-simplify:  Simplify w into w
1545212259.375 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.375 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.375 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.375 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.375 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.375 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.375 * [misc]backup-simplify:  Simplify d into d
1545212259.375 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.376 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.376 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.376 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.376 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.376 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.376 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.376 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.376 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212259.376 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.376 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.376 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.376 * [misc]backup-simplify:  Simplify D into D
1545212259.376 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.376 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.377 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.377 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.377 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.377 * [misc]backup-simplify:  Simplify w into w
1545212259.377 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.377 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.377 * [misc]backup-simplify:  Simplify d into d
1545212259.377 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.377 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.377 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.377 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.377 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.377 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.377 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.378 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212259.378 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212259.378 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212259.378 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.378 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.378 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.378 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212259.378 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212259.378 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.378 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.378 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.379 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212259.379 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212259.379 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.379 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.379 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.379 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.379 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.379 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.379 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.379 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.380 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.380 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.380 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.380 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.380 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.380 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.381 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.381 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.381 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.381 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.381 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.382 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.382 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.382 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212259.382 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.382 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.383 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.383 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.384 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212259.385 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212259.386 * [misc]backup-simplify:  Simplify (+ 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))))
1545212259.386 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212259.386 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212259.386 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.386 * [misc]backup-simplify:  Simplify D into D
1545212259.386 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.386 * [misc]backup-simplify:  Simplify h into h
1545212259.386 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.386 * [misc]backup-simplify:  Simplify w into w
1545212259.386 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.386 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.386 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.386 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.386 * [misc]backup-simplify:  Simplify d into d
1545212259.386 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212259.386 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.386 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.387 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.387 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.387 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.387 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212259.387 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212259.387 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212259.387 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212259.387 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212259.388 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.388 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.388 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212259.388 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212259.388 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212259.389 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212259.389 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212259.389 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212259.389 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212259.389 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.389 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212259.389 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212259.390 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.390 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212259.390 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212259.390 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.390 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212259.391 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212259.392 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212259.392 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.392 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.392 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.392 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.392 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.392 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.392 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.392 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.392 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.393 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.393 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212259.393 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.393 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.393 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.393 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.393 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.393 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.393 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.394 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.394 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.394 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.394 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212259.394 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212259.394 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.394 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.394 * [misc]backup-simplify:  Simplify D into D
1545212259.394 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.394 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.394 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.394 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.394 * [misc]backup-simplify:  Simplify d into d
1545212259.394 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.394 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.394 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.394 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.395 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.395 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212259.395 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.395 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.395 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.395 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.395 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.395 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.395 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.395 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.396 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.396 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.396 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.397 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.397 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.397 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.397 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.398 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.399 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.400 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.400 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.400 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.400 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.401 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.401 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.401 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.401 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.402 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.402 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.402 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.403 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.403 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212259.404 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212259.404 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.404 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212259.404 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.405 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.405 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.405 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212259.405 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.406 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212259.406 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212259.407 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.408 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.408 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.408 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212259.408 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.409 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212259.410 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212259.411 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212259.411 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.411 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.411 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.411 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.411 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.411 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.411 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.411 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.412 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.412 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.412 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.413 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.413 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.413 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.413 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.414 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.414 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.414 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.414 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.414 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.415 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.415 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.415 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.415 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.415 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.415 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.415 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.415 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.415 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.415 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.415 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.415 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.415 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.415 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.415 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212259.415 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.416 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212259.416 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.416 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.416 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.416 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.416 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.416 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.417 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.417 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.417 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.417 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.417 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.417 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.417 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212259.417 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.417 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.417 * [misc]backup-simplify:  Simplify D into D
1545212259.417 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.417 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.417 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.417 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.417 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.417 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212259.417 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.417 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.418 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.418 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.418 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.418 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.418 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.418 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.418 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.418 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212259.418 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212259.419 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.419 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.419 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.419 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.419 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.419 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.420 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.420 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.420 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.421 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.421 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.421 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.421 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.421 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.422 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.422 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.422 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.422 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.423 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.423 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.423 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.423 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.424 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.424 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.424 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.424 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.424 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.425 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212259.426 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212259.427 * [misc]backup-simplify:  Simplify (+ 0 (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) into (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))))
1545212259.427 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212259.427 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212259.427 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.427 * [misc]backup-simplify:  Simplify D into D
1545212259.427 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.427 * [misc]backup-simplify:  Simplify h into h
1545212259.427 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.427 * [misc]backup-simplify:  Simplify w into w
1545212259.427 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.427 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.427 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.427 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.427 * [misc]backup-simplify:  Simplify d into d
1545212259.427 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212259.427 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.427 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.427 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.427 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.427 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.427 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212259.427 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212259.428 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212259.428 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212259.428 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212259.428 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212259.428 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212259.428 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212259.428 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.428 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.428 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.428 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212259.428 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212259.428 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212259.429 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212259.429 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212259.429 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212259.429 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212259.429 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.429 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212259.430 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.430 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212259.430 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212259.430 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212259.430 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212259.430 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.431 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212259.431 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212259.431 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212259.431 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212259.431 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212259.431 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.431 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212259.432 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212259.432 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212259.432 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.432 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212259.432 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212259.432 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212259.433 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.433 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212259.433 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212259.433 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212259.434 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.434 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.435 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212259.435 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212259.435 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212259.435 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212259.435 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.435 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212259.435 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212259.436 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212259.436 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.436 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.436 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212259.436 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212259.436 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.437 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.437 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212259.437 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212259.437 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.437 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.438 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212259.438 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.438 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.438 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212259.438 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.438 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.439 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212259.439 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212259.439 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212259.440 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212259.440 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212259.440 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212259.441 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212259.442 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212259.443 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212259.443 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.443 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.443 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.443 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.443 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.443 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.443 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.443 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.443 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212259.444 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212259.444 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.444 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212259.444 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212259.445 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.445 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.445 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.445 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212259.446 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.446 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212259.447 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212259.447 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212259.447 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.447 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.447 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.448 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.448 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.448 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.448 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.449 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.449 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.449 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.449 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.449 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.449 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.449 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.449 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.449 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.449 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.449 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.449 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.449 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.449 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.450 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.450 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.451 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212259.451 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.451 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.451 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.451 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.451 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.451 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.451 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.451 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.451 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.451 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.451 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.452 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.452 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.452 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.453 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.453 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.453 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.453 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.453 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212259.453 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.454 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 M)))))))) into (* (sqrt -1) M)
1545212259.455 * [misc]backup-simplify:  Simplify (+ (sqrt (* (+ (/ 1 (- M)) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) (- (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) (/ 1 (- M))))) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) into (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212259.455 * [misc]approximate:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (M c0 h w d D) around 0
1545212259.455 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212259.455 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in D
1545212259.455 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in D
1545212259.455 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212259.455 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.455 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in D
1545212259.455 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212259.455 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212259.455 * [misc]taylor:  Taking taylor expansion of M in D
1545212259.455 * [misc]backup-simplify:  Simplify M into M
1545212259.455 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.455 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212259.455 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.455 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.455 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.455 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.456 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.456 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.456 * [misc]backup-simplify:  Simplify h into h
1545212259.456 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.456 * [misc]backup-simplify:  Simplify w into w
1545212259.456 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.456 * [misc]backup-simplify:  Simplify d into d
1545212259.456 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.456 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.456 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.456 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.456 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.456 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.456 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.456 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.456 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of M in D
1545212259.456 * [misc]backup-simplify:  Simplify M into M
1545212259.456 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.456 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.456 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.456 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.456 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.456 * [misc]backup-simplify:  Simplify h into h
1545212259.456 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.456 * [misc]backup-simplify:  Simplify w into w
1545212259.456 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.456 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.456 * [misc]backup-simplify:  Simplify d into d
1545212259.456 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.456 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.457 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.457 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.457 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.457 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.457 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.457 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.457 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212259.457 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212259.457 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212259.457 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212259.457 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212259.457 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.457 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.457 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.457 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.458 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) 0) (* 0 (/ 1 M))) into 0
1545212259.458 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212259.458 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212259.458 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212259.458 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.458 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.458 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.458 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.458 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.458 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.458 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.458 * [misc]backup-simplify:  Simplify h into h
1545212259.458 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.458 * [misc]backup-simplify:  Simplify w into w
1545212259.458 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212259.458 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.458 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.458 * [misc]backup-simplify:  Simplify d into d
1545212259.458 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.458 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.458 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.458 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.458 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.458 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.458 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.458 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.458 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212259.458 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in d
1545212259.458 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in d
1545212259.458 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212259.459 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.459 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of M in d
1545212259.459 * [misc]backup-simplify:  Simplify M into M
1545212259.459 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.459 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.459 * [misc]backup-simplify:  Simplify D into D
1545212259.459 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.459 * [misc]backup-simplify:  Simplify h into h
1545212259.459 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.459 * [misc]backup-simplify:  Simplify w into w
1545212259.459 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.459 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.459 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.459 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.459 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.459 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.459 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.459 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.459 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.459 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212259.459 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.459 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of M in d
1545212259.459 * [misc]backup-simplify:  Simplify M into M
1545212259.459 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.459 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.459 * [misc]backup-simplify:  Simplify D into D
1545212259.459 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.459 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.459 * [misc]backup-simplify:  Simplify h into h
1545212259.460 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.460 * [misc]backup-simplify:  Simplify w into w
1545212259.460 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212259.460 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.460 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.460 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.460 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.460 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.460 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.460 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.460 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.460 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.460 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.460 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212259.460 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.460 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) c0)) into (- (/ (* (pow D 2) (* h w)) c0))
1545212259.460 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) c0))) into (- (/ (* (pow D 2) (* h w)) c0))
1545212259.460 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 2) (* h w)) c0)
1545212259.461 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) c0)) (/ (* (pow D 2) (* h w)) c0)) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))
1545212259.461 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212259.461 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212259.461 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.461 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.462 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.462 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.462 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212259.462 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212259.462 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.462 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.462 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.462 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.462 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.463 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212259.463 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212259.463 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.463 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.463 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) c0)) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212259.463 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212259.464 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212259.464 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212259.464 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.464 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.464 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.464 * [misc]backup-simplify:  Simplify D into D
1545212259.464 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.464 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.464 * [misc]backup-simplify:  Simplify h into h
1545212259.464 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.464 * [misc]backup-simplify:  Simplify w into w
1545212259.464 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212259.464 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.464 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.464 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.464 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.464 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.464 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.464 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.464 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.464 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.464 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.464 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212259.464 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.464 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212259.464 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in w
1545212259.464 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in w
1545212259.464 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212259.464 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.464 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in w
1545212259.464 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212259.464 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212259.464 * [misc]taylor:  Taking taylor expansion of M in w
1545212259.464 * [misc]backup-simplify:  Simplify M into M
1545212259.465 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.465 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212259.465 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.465 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.465 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.465 * [misc]backup-simplify:  Simplify D into D
1545212259.465 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.465 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.465 * [misc]backup-simplify:  Simplify h into h
1545212259.465 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.465 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.465 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.465 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212259.465 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.465 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.465 * [misc]backup-simplify:  Simplify d into d
1545212259.465 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.465 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.465 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.465 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.465 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.465 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.465 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.465 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.465 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.465 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.465 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.465 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212259.466 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212259.466 * [misc]taylor:  Taking taylor expansion of M in w
1545212259.466 * [misc]backup-simplify:  Simplify M into M
1545212259.466 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.466 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212259.466 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.466 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.466 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.466 * [misc]backup-simplify:  Simplify D into D
1545212259.466 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.466 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.466 * [misc]backup-simplify:  Simplify h into h
1545212259.466 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.466 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.466 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.466 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212259.466 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.466 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.466 * [misc]backup-simplify:  Simplify d into d
1545212259.466 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.466 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.466 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.466 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.466 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.466 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.466 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.466 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.466 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.466 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.466 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.467 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212259.467 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212259.467 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212259.467 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212259.467 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212259.467 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.467 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.467 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.467 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212259.468 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) h) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212259.468 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) (/ 1 M))) into 0
1545212259.468 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212259.468 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212259.468 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212259.468 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.468 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.468 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.468 * [misc]backup-simplify:  Simplify D into D
1545212259.468 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.468 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.468 * [misc]backup-simplify:  Simplify h into h
1545212259.468 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.468 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.468 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.468 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212259.468 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.468 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.468 * [misc]backup-simplify:  Simplify d into d
1545212259.468 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.469 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.469 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.469 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.469 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.469 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.469 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.469 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.469 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.469 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.469 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.469 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212259.469 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in h
1545212259.469 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in h
1545212259.469 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212259.469 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.469 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in h
1545212259.469 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212259.469 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212259.469 * [misc]taylor:  Taking taylor expansion of M in h
1545212259.469 * [misc]backup-simplify:  Simplify M into M
1545212259.469 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.469 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212259.469 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.469 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.469 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.470 * [misc]backup-simplify:  Simplify D into D
1545212259.470 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.470 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.470 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.470 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.470 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.470 * [misc]backup-simplify:  Simplify w into w
1545212259.470 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212259.470 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.470 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.470 * [misc]backup-simplify:  Simplify d into d
1545212259.470 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.470 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.470 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.470 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.470 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.470 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.470 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.470 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.470 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.470 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.470 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.470 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212259.470 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212259.470 * [misc]taylor:  Taking taylor expansion of M in h
1545212259.470 * [misc]backup-simplify:  Simplify M into M
1545212259.470 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.470 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212259.470 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.471 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.471 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.471 * [misc]backup-simplify:  Simplify D into D
1545212259.471 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.471 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.471 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.471 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.471 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.471 * [misc]backup-simplify:  Simplify w into w
1545212259.471 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212259.471 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.471 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.471 * [misc]backup-simplify:  Simplify d into d
1545212259.471 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.471 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.471 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.471 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.471 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.471 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.471 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.471 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.471 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.471 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.471 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.471 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212259.472 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212259.472 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212259.472 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212259.472 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212259.472 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.472 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) w) (* (pow d 2) c0))) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212259.472 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212259.472 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (* (pow d 2) c0))) into (- (/ (* (pow D 2) w) (* c0 (pow d 2))))
1545212259.472 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) w) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) w) (* (pow d 2) c0)))
1545212259.473 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) w) (* (pow d 2) c0))) (/ 1 M))) into 0
1545212259.473 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212259.473 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212259.473 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212259.473 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.473 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.473 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.473 * [misc]backup-simplify:  Simplify D into D
1545212259.473 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.473 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.473 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.473 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.473 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.473 * [misc]backup-simplify:  Simplify w into w
1545212259.473 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212259.473 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.473 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.473 * [misc]backup-simplify:  Simplify d into d
1545212259.473 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.473 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.473 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.473 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.473 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.473 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.473 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.474 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.474 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.474 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.474 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.474 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.474 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.474 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of M in c0
1545212259.474 * [misc]backup-simplify:  Simplify M into M
1545212259.474 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.474 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.474 * [misc]backup-simplify:  Simplify D into D
1545212259.474 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.474 * [misc]backup-simplify:  Simplify h into h
1545212259.474 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.474 * [misc]backup-simplify:  Simplify w into w
1545212259.474 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.474 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.474 * [misc]backup-simplify:  Simplify d into d
1545212259.474 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.474 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.474 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.474 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.474 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.474 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.475 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.475 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.475 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.475 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.475 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.475 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.475 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212259.475 * [misc]taylor:  Taking taylor expansion of M in c0
1545212259.475 * [misc]backup-simplify:  Simplify M into M
1545212259.475 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212259.475 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.475 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.475 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.475 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.475 * [misc]backup-simplify:  Simplify D into D
1545212259.475 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.475 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.475 * [misc]backup-simplify:  Simplify h into h
1545212259.475 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.475 * [misc]backup-simplify:  Simplify w into w
1545212259.475 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.475 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.475 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.475 * [misc]backup-simplify:  Simplify d into d
1545212259.475 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.475 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.475 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.475 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.475 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.475 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.475 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.475 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.476 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.476 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.476 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.476 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212259.476 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (pow d 2)))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212259.476 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.477 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212259.477 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212259.477 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.477 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.477 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.477 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.477 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.477 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.478 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.478 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212259.478 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.478 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.478 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.478 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.478 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.478 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.479 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.479 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212259.479 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ 1 M)) (* (/ 1 M) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212259.479 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212259.479 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212259.479 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.480 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.480 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.480 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.480 * [misc]backup-simplify:  Simplify D into D
1545212259.480 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.480 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.480 * [misc]backup-simplify:  Simplify h into h
1545212259.480 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.480 * [misc]backup-simplify:  Simplify w into w
1545212259.480 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.480 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.480 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.480 * [misc]backup-simplify:  Simplify d into d
1545212259.480 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.480 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.480 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.480 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.480 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.480 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.480 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.480 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.480 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.480 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.480 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.480 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212259.480 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212259.480 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212259.480 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212259.480 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.480 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212259.480 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212259.480 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212259.480 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.480 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.480 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.481 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.481 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.481 * [misc]backup-simplify:  Simplify D into D
1545212259.481 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.481 * [misc]backup-simplify:  Simplify h into h
1545212259.481 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.481 * [misc]backup-simplify:  Simplify w into w
1545212259.481 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.481 * [misc]backup-simplify:  Simplify d into d
1545212259.481 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.481 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.481 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.481 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.481 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.481 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.481 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.481 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.481 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.481 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.481 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.481 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.481 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.481 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.481 * [misc]backup-simplify:  Simplify D into D
1545212259.481 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.482 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.482 * [misc]backup-simplify:  Simplify h into h
1545212259.482 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.482 * [misc]backup-simplify:  Simplify w into w
1545212259.482 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212259.482 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.482 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.482 * [misc]backup-simplify:  Simplify d into d
1545212259.482 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.482 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.482 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.482 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.482 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.482 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.482 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.482 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.482 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212259.482 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212259.482 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.482 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212259.483 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.483 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.483 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212259.483 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.483 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212259.483 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212259.484 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212259.484 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212259.484 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.484 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212259.484 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.484 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.484 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.484 * [misc]backup-simplify:  Simplify D into D
1545212259.484 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.484 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.484 * [misc]backup-simplify:  Simplify h into h
1545212259.484 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.484 * [misc]backup-simplify:  Simplify w into w
1545212259.484 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212259.484 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.484 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.484 * [misc]backup-simplify:  Simplify d into d
1545212259.484 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.484 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.484 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.484 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.484 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.484 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.485 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.485 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.485 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212259.485 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.485 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.485 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.485 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.485 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.485 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.485 * [misc]backup-simplify:  Simplify D into D
1545212259.485 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.485 * [misc]backup-simplify:  Simplify h into h
1545212259.485 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.485 * [misc]backup-simplify:  Simplify w into w
1545212259.485 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.485 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.485 * [misc]backup-simplify:  Simplify d into d
1545212259.485 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.485 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.485 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.485 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.485 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.485 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.485 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.486 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.486 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212259.486 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212259.486 * [misc]taylor:  Taking taylor expansion of M in M
1545212259.486 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.486 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.486 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.486 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212259.486 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.486 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.486 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.486 * [misc]backup-simplify:  Simplify D into D
1545212259.486 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.486 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.486 * [misc]backup-simplify:  Simplify h into h
1545212259.486 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.486 * [misc]backup-simplify:  Simplify w into w
1545212259.486 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212259.486 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.486 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.486 * [misc]backup-simplify:  Simplify d into d
1545212259.486 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.486 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.486 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.486 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.486 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.486 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.486 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.486 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.487 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212259.487 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212259.487 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.487 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212259.487 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.487 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.487 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212259.488 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.488 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212259.488 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212259.488 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212259.488 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212259.489 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.489 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212259.489 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212259.489 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212259.489 * [misc]taylor:  Taking taylor expansion of D in M
1545212259.489 * [misc]backup-simplify:  Simplify D into D
1545212259.489 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212259.489 * [misc]taylor:  Taking taylor expansion of h in M
1545212259.489 * [misc]backup-simplify:  Simplify h into h
1545212259.489 * [misc]taylor:  Taking taylor expansion of w in M
1545212259.489 * [misc]backup-simplify:  Simplify w into w
1545212259.489 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212259.489 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212259.489 * [misc]taylor:  Taking taylor expansion of d in M
1545212259.489 * [misc]backup-simplify:  Simplify d into d
1545212259.489 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212259.489 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.489 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.489 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.489 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.489 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.489 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.489 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.489 * [misc]backup-simplify:  Simplify (+ (sqrt -1) 0) into (sqrt -1)
1545212259.490 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212259.490 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.490 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.490 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.490 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.490 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212259.490 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212259.490 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.490 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.490 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.490 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.490 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.490 * [misc]backup-simplify:  Simplify D into D
1545212259.490 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.490 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.490 * [misc]backup-simplify:  Simplify h into h
1545212259.490 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.490 * [misc]backup-simplify:  Simplify w into w
1545212259.490 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.490 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.490 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.490 * [misc]backup-simplify:  Simplify d into d
1545212259.490 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.490 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.490 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.491 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.491 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.491 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.491 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.491 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.491 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.491 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.491 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.491 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212259.491 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212259.491 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212259.491 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.491 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.491 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.491 * [misc]backup-simplify:  Simplify D into D
1545212259.491 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.491 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.491 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.491 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.491 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.491 * [misc]backup-simplify:  Simplify w into w
1545212259.491 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.491 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.491 * [misc]backup-simplify:  Simplify d into d
1545212259.491 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.492 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.492 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.492 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.492 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.492 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.492 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.492 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212259.492 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212259.492 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212259.492 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.492 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.492 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.492 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212259.492 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212259.492 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.493 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.493 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.493 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212259.493 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212259.493 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.493 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.493 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.493 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.493 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.493 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.493 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.493 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.494 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212259.494 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.494 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.494 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.494 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.494 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.494 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.494 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.494 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212259.495 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.495 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.495 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.495 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))
1545212259.496 * [misc]backup-simplify:  Simplify (+ (* -1 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212259.497 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212259.497 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.497 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.497 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.497 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.497 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212259.497 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.497 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.498 * [misc]backup-simplify:  Simplify (+ (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 0) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))))
1545212259.498 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212259.498 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212259.498 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.498 * [misc]backup-simplify:  Simplify D into D
1545212259.498 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.498 * [misc]backup-simplify:  Simplify h into h
1545212259.498 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.498 * [misc]backup-simplify:  Simplify w into w
1545212259.498 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.498 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.498 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.498 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.498 * [misc]backup-simplify:  Simplify d into d
1545212259.498 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212259.498 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.498 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.498 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.499 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.499 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.499 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212259.499 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212259.499 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212259.499 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212259.499 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212259.499 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.499 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.499 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212259.499 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212259.499 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212259.501 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212259.501 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.502 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212259.502 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212259.503 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212259.503 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.503 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.503 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.503 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.503 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.503 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.503 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.503 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.503 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.503 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.503 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.503 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.504 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.504 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.504 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.504 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.504 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.504 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.504 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.504 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.504 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.504 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.504 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.504 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.504 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.504 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (pow d 2))) into (- (/ (* (pow D 2) w) (pow d 2)))
1545212259.504 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) w) (pow d 2))) in w
1545212259.504 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212259.504 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212259.504 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.504 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.504 * [misc]backup-simplify:  Simplify D into D
1545212259.504 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.504 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.504 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.504 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.504 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.504 * [misc]backup-simplify:  Simplify d into d
1545212259.504 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.504 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.504 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.504 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.505 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.505 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212259.505 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.505 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.505 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.505 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.505 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.505 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.505 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.505 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.505 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.505 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.506 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.506 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212259.506 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.506 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.506 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.507 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.507 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.507 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.507 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.507 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212259.507 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.508 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.508 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.508 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212259.509 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1)))) into 0
1545212259.509 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212259.509 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.510 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.510 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.510 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.510 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212259.510 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.511 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.511 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.511 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212259.511 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.511 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.511 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.511 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212259.511 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.511 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212259.512 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212259.513 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.513 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.513 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.513 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212259.513 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.514 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212259.514 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212259.515 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212259.515 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.515 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.515 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.515 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.515 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.515 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.516 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.516 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.516 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.516 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.516 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.516 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.516 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.516 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.516 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.516 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.517 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.517 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.517 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.517 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.517 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.517 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.517 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.517 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.517 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.517 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.517 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.517 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.517 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.517 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.518 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.518 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.518 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.518 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.518 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.518 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212259.518 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.518 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212259.518 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.518 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.518 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.518 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.518 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.519 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.519 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.519 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.520 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.520 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.520 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.520 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.520 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.520 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.520 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.520 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.520 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.520 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.520 * [misc]backup-simplify:  Simplify (- (/ (pow D 2) (pow d 2))) into (- (/ (pow D 2) (pow d 2)))
1545212259.520 * [misc]taylor:  Taking taylor expansion of (- (/ (pow D 2) (pow d 2))) in d
1545212259.520 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212259.520 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.520 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.520 * [misc]backup-simplify:  Simplify D into D
1545212259.520 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.520 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.520 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.520 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.520 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.520 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.520 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212259.520 * [misc]backup-simplify:  Simplify (- (pow D 2)) into (- (pow D 2))
1545212259.520 * [misc]taylor:  Taking taylor expansion of (- (pow D 2)) in D
1545212259.520 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.520 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.520 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.521 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.521 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.521 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.521 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.521 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.521 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.522 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212259.522 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212259.522 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.522 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.522 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.522 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.522 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.523 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.523 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.523 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.523 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.524 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212259.524 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.524 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.524 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.524 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.525 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.525 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.525 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.525 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212259.526 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.526 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.526 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212259.527 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212259.527 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))))) into 0
1545212259.528 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212259.528 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.529 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.529 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.529 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.529 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212259.530 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212259.530 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.530 * [misc]backup-simplify:  Simplify (+ (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) 0) into (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))))
1545212259.530 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212259.531 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212259.531 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.531 * [misc]backup-simplify:  Simplify D into D
1545212259.531 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.531 * [misc]backup-simplify:  Simplify h into h
1545212259.531 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.531 * [misc]backup-simplify:  Simplify w into w
1545212259.531 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.531 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.531 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.531 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.531 * [misc]backup-simplify:  Simplify d into d
1545212259.531 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212259.531 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.531 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.531 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212259.531 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212259.531 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.531 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212259.531 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212259.531 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212259.531 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212259.532 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212259.532 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212259.532 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212259.532 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212259.532 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.532 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.532 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.532 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212259.532 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212259.532 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212259.532 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212259.533 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212259.533 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212259.533 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212259.533 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.533 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212259.534 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.534 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212259.534 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212259.534 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212259.534 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212259.534 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212259.534 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212259.535 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212259.535 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212259.535 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212259.535 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212259.535 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.535 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212259.535 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212259.536 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212259.536 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.536 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212259.536 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212259.536 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212259.536 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.537 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212259.537 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212259.537 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212259.538 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212259.538 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.538 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212259.539 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212259.539 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212259.539 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212259.539 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.539 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212259.539 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212259.539 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212259.540 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.540 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212259.540 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212259.540 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212259.540 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.541 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.541 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212259.541 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212259.541 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.541 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.541 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212259.542 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.542 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.542 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212259.542 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.542 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.543 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212259.543 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212259.543 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212259.544 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212259.544 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212259.544 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212259.545 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212259.546 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212259.546 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212259.547 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.547 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.547 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.547 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.547 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.547 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.547 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.547 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.547 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.547 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.547 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.547 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.547 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.547 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.547 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212259.548 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212259.548 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.548 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212259.548 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212259.549 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.549 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.549 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.549 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212259.549 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.550 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212259.551 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212259.551 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212259.551 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.551 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.551 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.551 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.551 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.551 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.552 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.552 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.552 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.552 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.553 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.553 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.553 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.553 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.553 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.554 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.554 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.554 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.554 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.554 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.554 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.554 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.554 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.554 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.554 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.554 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.554 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.554 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.554 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.554 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.554 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.554 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.554 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.555 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212259.555 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.555 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.555 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.555 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.555 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.555 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.555 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.555 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.555 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.555 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.555 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.555 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.555 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.555 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.555 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.556 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.556 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.556 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.556 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.557 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.557 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.557 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.557 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.557 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.557 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212259.557 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.557 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.557 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.557 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.557 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212259.558 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212259.558 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.558 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 (- M))))))))) into (* -1 (* (sqrt -1) M))
1545212259.558 * * * * [misc]progress:  [ 2 / 4 ] generating series at (2 2 1 1 2)
1545212259.558 * [misc]backup-simplify:  Simplify (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* h w)))
1545212259.558 * [misc]approximate:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in (c0 h w d D) around 0
1545212259.558 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in D
1545212259.559 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212259.559 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.559 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.559 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.559 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.559 * [misc]backup-simplify:  Simplify d into d
1545212259.559 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.559 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.559 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.559 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.559 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.559 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.559 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.559 * [misc]backup-simplify:  Simplify h into h
1545212259.559 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.559 * [misc]backup-simplify:  Simplify w into w
1545212259.559 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.559 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.559 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.559 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.559 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.559 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212259.559 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in d
1545212259.559 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212259.559 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.559 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.559 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.559 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.559 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.559 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.559 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.559 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.559 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.559 * [misc]backup-simplify:  Simplify D into D
1545212259.559 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.559 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.559 * [misc]backup-simplify:  Simplify h into h
1545212259.559 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.559 * [misc]backup-simplify:  Simplify w into w
1545212259.559 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.560 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212259.560 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.560 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.560 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.560 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212259.560 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in w
1545212259.560 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212259.560 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.560 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.560 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.560 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.560 * [misc]backup-simplify:  Simplify d into d
1545212259.560 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.560 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.560 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.560 * [misc]backup-simplify:  Simplify D into D
1545212259.560 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.560 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.560 * [misc]backup-simplify:  Simplify h into h
1545212259.560 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.560 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.560 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.560 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.560 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.560 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.560 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.560 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.560 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.560 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.561 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.561 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212259.561 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in h
1545212259.561 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212259.561 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.561 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.561 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.561 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.561 * [misc]backup-simplify:  Simplify d into d
1545212259.561 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.561 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.561 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.561 * [misc]backup-simplify:  Simplify D into D
1545212259.561 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.561 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.561 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.561 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.561 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.561 * [misc]backup-simplify:  Simplify w into w
1545212259.561 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.561 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.561 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.561 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.561 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.561 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.561 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.562 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.562 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212259.562 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212259.562 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.562 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.562 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.562 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.562 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.562 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.562 * [misc]backup-simplify:  Simplify d into d
1545212259.562 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.562 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.562 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.562 * [misc]backup-simplify:  Simplify D into D
1545212259.562 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.562 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.562 * [misc]backup-simplify:  Simplify h into h
1545212259.562 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.562 * [misc]backup-simplify:  Simplify w into w
1545212259.562 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.562 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.562 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.562 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.562 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.562 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.562 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.562 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.562 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212259.562 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.563 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.563 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.563 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.563 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.563 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.563 * [misc]backup-simplify:  Simplify d into d
1545212259.563 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.563 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.563 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.563 * [misc]backup-simplify:  Simplify D into D
1545212259.563 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.563 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.563 * [misc]backup-simplify:  Simplify h into h
1545212259.563 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.563 * [misc]backup-simplify:  Simplify w into w
1545212259.563 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.563 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.563 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.563 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.563 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.563 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.563 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.563 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.563 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212259.563 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.563 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.563 * [misc]backup-simplify:  Simplify d into d
1545212259.563 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212259.563 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.563 * [misc]backup-simplify:  Simplify w into w
1545212259.563 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212259.563 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.563 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.563 * [misc]backup-simplify:  Simplify D into D
1545212259.564 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.564 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.564 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.564 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.564 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.564 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.564 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212259.564 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.564 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.564 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212259.564 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212259.564 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212259.564 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.564 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.564 * [misc]backup-simplify:  Simplify d into d
1545212259.564 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212259.564 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.564 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.564 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.564 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.564 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.564 * [misc]backup-simplify:  Simplify D into D
1545212259.564 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.564 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.564 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212259.565 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.565 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212259.565 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212259.565 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212259.565 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.565 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.565 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.565 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.565 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.565 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.565 * [misc]backup-simplify:  Simplify D into D
1545212259.565 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.565 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.565 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212259.565 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212259.565 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.565 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.565 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.565 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.565 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.565 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.565 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.566 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.566 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212259.566 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.566 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.566 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.566 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.566 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.566 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.566 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.567 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.567 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.567 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212259.567 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212259.567 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.567 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.567 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.568 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.568 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212259.568 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212259.568 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.568 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.568 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.568 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.568 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.568 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.568 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212259.568 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.568 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.569 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.569 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.569 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.569 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.569 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.570 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.570 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.570 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.570 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.570 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.570 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.570 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.570 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.570 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.571 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.571 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212259.571 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.571 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.571 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.571 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.572 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.572 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.572 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212259.572 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.572 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.572 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.572 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.572 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.572 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.572 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.573 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.573 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.573 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.573 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.573 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.573 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.573 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.573 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.574 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.574 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.574 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.574 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.575 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.575 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.575 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.575 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.575 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.575 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.575 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.575 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.575 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.576 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.576 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.576 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212259.577 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.577 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.577 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.577 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.577 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.577 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.577 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.577 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.577 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.577 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.577 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.577 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.577 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.577 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.577 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.577 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.577 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.578 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212259.578 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.578 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.578 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.578 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.578 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.578 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.578 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.578 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.578 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.578 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.578 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.579 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.579 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.579 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.579 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.579 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.579 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.579 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.579 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.580 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.580 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.580 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212259.580 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212259.581 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.581 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.581 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212259.582 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.582 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.582 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.582 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.582 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.582 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.583 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.583 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212259.584 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212259.584 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.584 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.585 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.585 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.586 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212259.586 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.586 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.586 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.586 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.586 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.586 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.586 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.586 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.586 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.586 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.586 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212259.587 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.587 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.587 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.587 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.587 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.587 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) c0))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.588 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.588 * [misc]approximate:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in (c0 h w d D) around 0
1545212259.588 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212259.588 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.588 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.588 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.588 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.588 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.588 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.588 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.588 * [misc]backup-simplify:  Simplify h into h
1545212259.588 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.588 * [misc]backup-simplify:  Simplify w into w
1545212259.588 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212259.588 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.588 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.588 * [misc]backup-simplify:  Simplify d into d
1545212259.588 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.588 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.588 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.588 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.588 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.588 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.588 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.588 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.588 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212259.588 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.588 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.588 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.588 * [misc]backup-simplify:  Simplify D into D
1545212259.588 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.588 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.588 * [misc]backup-simplify:  Simplify h into h
1545212259.588 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.588 * [misc]backup-simplify:  Simplify w into w
1545212259.588 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212259.588 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.588 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.589 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.589 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.589 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.589 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.589 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.589 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.589 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.589 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.589 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212259.589 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.589 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212259.589 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.589 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.589 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.589 * [misc]backup-simplify:  Simplify D into D
1545212259.589 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.589 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.589 * [misc]backup-simplify:  Simplify h into h
1545212259.589 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.589 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.589 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.589 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212259.589 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.589 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.589 * [misc]backup-simplify:  Simplify d into d
1545212259.589 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.589 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.589 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.589 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.589 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.589 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.589 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.590 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.590 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.590 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.590 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.590 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212259.590 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.590 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.590 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.590 * [misc]backup-simplify:  Simplify D into D
1545212259.590 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.590 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.590 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.590 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.590 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.590 * [misc]backup-simplify:  Simplify w into w
1545212259.590 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212259.590 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.590 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.590 * [misc]backup-simplify:  Simplify d into d
1545212259.590 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.590 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.590 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.590 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.590 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.590 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.590 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.591 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.591 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.591 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.591 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.591 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.591 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.591 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.591 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.591 * [misc]backup-simplify:  Simplify D into D
1545212259.591 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.591 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.591 * [misc]backup-simplify:  Simplify h into h
1545212259.591 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.591 * [misc]backup-simplify:  Simplify w into w
1545212259.591 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.591 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.591 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.591 * [misc]backup-simplify:  Simplify d into d
1545212259.591 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.591 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.591 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.591 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.591 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.591 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.591 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.591 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.591 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.592 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.592 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.592 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.592 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.592 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.592 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.592 * [misc]backup-simplify:  Simplify D into D
1545212259.592 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.592 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.592 * [misc]backup-simplify:  Simplify h into h
1545212259.592 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.592 * [misc]backup-simplify:  Simplify w into w
1545212259.592 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.592 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.592 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.592 * [misc]backup-simplify:  Simplify d into d
1545212259.592 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.592 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.592 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.592 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.592 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.592 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.592 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.592 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.592 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.592 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.592 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.593 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212259.593 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.593 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.593 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.593 * [misc]backup-simplify:  Simplify D into D
1545212259.593 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.593 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.593 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.593 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.593 * [misc]backup-simplify:  Simplify w into w
1545212259.593 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.593 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.593 * [misc]backup-simplify:  Simplify d into d
1545212259.593 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.593 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.593 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.593 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.593 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.593 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.593 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.593 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212259.593 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212259.593 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212259.593 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.593 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.593 * [misc]backup-simplify:  Simplify D into D
1545212259.593 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.593 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.593 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.594 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.594 * [misc]backup-simplify:  Simplify d into d
1545212259.594 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.594 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.594 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.594 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.594 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.594 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212259.594 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212259.594 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.594 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.594 * [misc]backup-simplify:  Simplify D into D
1545212259.594 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.594 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.594 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.594 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.594 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.594 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.594 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212259.594 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.594 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.594 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.594 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.594 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.594 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.595 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.595 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.595 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.595 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.595 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.595 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.595 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.595 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.596 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212259.597 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.597 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212259.597 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.597 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.597 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.597 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.597 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.597 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.597 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.597 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.597 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.598 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.598 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.598 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.598 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.598 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.598 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212259.598 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.598 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.598 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.598 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.598 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.598 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.599 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.599 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.599 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.599 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.599 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.599 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.600 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.600 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.600 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.600 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.600 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.600 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.600 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.600 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.600 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.600 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.600 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.600 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212259.601 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.601 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.601 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.601 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.601 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.601 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.601 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.601 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.601 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.601 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.601 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.601 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.602 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.602 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.602 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.602 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.602 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.602 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.602 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.602 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.602 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.602 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.603 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.603 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.603 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.603 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.603 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.603 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.604 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.604 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.604 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.604 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.604 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.604 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.604 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.604 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.604 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.604 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.604 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.604 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.604 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.604 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.604 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.605 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.605 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.605 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.605 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.606 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212259.606 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.606 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.606 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.606 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.606 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.606 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.606 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.606 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.606 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.606 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.606 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.606 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.606 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.606 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.606 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.606 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.607 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.607 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.607 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.607 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.607 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.607 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.607 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.607 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.607 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.608 * [misc]backup-simplify:  Simplify (* 1 (* (pow (/ 1 D) 2) (* (pow (/ 1 d) -2) (* (/ 1 w) (* (/ 1 h) (/ 1 (/ 1 c0))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.608 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212259.608 * [misc]approximate:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (c0 h w d D) around 0
1545212259.608 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212259.608 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212259.608 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.608 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212259.608 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.608 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.608 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.608 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.608 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.608 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.608 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.608 * [misc]backup-simplify:  Simplify h into h
1545212259.608 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.608 * [misc]backup-simplify:  Simplify w into w
1545212259.608 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212259.608 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.608 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.608 * [misc]backup-simplify:  Simplify d into d
1545212259.608 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.608 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.608 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.608 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.608 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.609 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.609 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.609 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.609 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212259.609 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212259.609 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.609 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212259.609 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.609 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.609 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.609 * [misc]backup-simplify:  Simplify D into D
1545212259.609 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.609 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.609 * [misc]backup-simplify:  Simplify h into h
1545212259.609 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.609 * [misc]backup-simplify:  Simplify w into w
1545212259.609 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212259.609 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.609 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.609 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.609 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.609 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.609 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.609 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.609 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.609 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.609 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.609 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212259.609 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.609 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212259.609 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212259.609 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.609 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212259.609 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.609 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.609 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.609 * [misc]backup-simplify:  Simplify D into D
1545212259.610 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.610 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.610 * [misc]backup-simplify:  Simplify h into h
1545212259.610 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.610 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.610 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.610 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212259.610 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.610 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.610 * [misc]backup-simplify:  Simplify d into d
1545212259.610 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.610 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.610 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.610 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.610 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.610 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.610 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.610 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.610 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.610 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.610 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.610 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212259.610 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212259.610 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.610 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212259.610 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.610 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.610 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.611 * [misc]backup-simplify:  Simplify D into D
1545212259.611 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.611 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.611 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.611 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.611 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.611 * [misc]backup-simplify:  Simplify w into w
1545212259.611 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212259.611 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.611 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.611 * [misc]backup-simplify:  Simplify d into d
1545212259.611 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.611 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.611 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.611 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.611 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.611 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.611 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.611 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.611 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.611 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.611 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.611 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.611 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.611 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.611 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.611 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.611 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.611 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.612 * [misc]backup-simplify:  Simplify D into D
1545212259.612 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.612 * [misc]backup-simplify:  Simplify h into h
1545212259.612 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.612 * [misc]backup-simplify:  Simplify w into w
1545212259.612 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.612 * [misc]backup-simplify:  Simplify d into d
1545212259.612 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.612 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.612 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.612 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.612 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.612 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.612 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.612 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.612 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.612 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.612 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.612 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.612 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.612 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.612 * [misc]backup-simplify:  Simplify D into D
1545212259.612 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.612 * [misc]backup-simplify:  Simplify h into h
1545212259.612 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.612 * [misc]backup-simplify:  Simplify w into w
1545212259.612 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.612 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.612 * [misc]backup-simplify:  Simplify d into d
1545212259.612 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.613 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.613 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.613 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.613 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.613 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.613 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.613 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.613 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.613 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.613 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.613 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212259.613 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212259.613 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212259.613 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.613 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212259.613 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.613 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.613 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.613 * [misc]backup-simplify:  Simplify D into D
1545212259.613 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.613 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.613 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.613 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.613 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.613 * [misc]backup-simplify:  Simplify w into w
1545212259.613 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.613 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.613 * [misc]backup-simplify:  Simplify d into d
1545212259.614 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.614 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.614 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.614 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.614 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.614 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.614 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.614 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212259.614 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) w) (pow d 2))) into (* -1 (/ (* (pow D 2) w) (pow d 2)))
1545212259.614 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) w) (pow d 2))) in w
1545212259.614 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212259.614 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.614 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212259.614 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212259.614 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.614 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.614 * [misc]backup-simplify:  Simplify D into D
1545212259.614 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.614 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.614 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.614 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.614 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.614 * [misc]backup-simplify:  Simplify d into d
1545212259.614 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.615 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.615 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.615 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.615 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.615 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212259.615 * [misc]backup-simplify:  Simplify (* -1 (/ (pow D 2) (pow d 2))) into (* -1 (/ (pow D 2) (pow d 2)))
1545212259.615 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (pow D 2) (pow d 2))) in d
1545212259.615 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212259.615 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.615 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212259.615 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.615 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.615 * [misc]backup-simplify:  Simplify D into D
1545212259.615 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.615 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.615 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.615 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.615 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.615 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.615 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212259.615 * [misc]backup-simplify:  Simplify (* -1 (pow D 2)) into (* -1 (pow D 2))
1545212259.615 * [misc]taylor:  Taking taylor expansion of (* -1 (pow D 2)) in D
1545212259.615 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212259.615 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.615 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.615 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.615 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.615 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.616 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.616 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212259.616 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.616 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.616 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.616 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.616 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.616 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.616 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.617 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212259.617 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.617 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.617 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.617 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.617 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.617 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.617 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212259.617 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.617 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212259.618 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.618 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.618 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))) into 0
1545212259.618 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.618 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.618 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.618 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.618 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.618 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.618 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.619 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.619 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (pow D 2) (pow d 2)))) into 0
1545212259.619 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.619 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.619 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.619 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.619 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212259.619 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (pow D 2))) into 0
1545212259.619 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.619 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.619 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.620 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.620 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212259.620 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.620 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.620 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.620 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.620 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.621 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.621 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.621 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212259.621 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.621 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.621 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.621 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.621 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.621 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.621 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.621 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.621 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.621 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.622 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.622 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.622 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212259.622 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.623 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.623 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2))))) into 0
1545212259.623 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.623 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.623 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.623 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.623 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.623 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.623 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.623 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.623 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.623 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.624 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.624 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.624 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2))))) into 0
1545212259.624 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.624 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.624 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.624 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.625 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.625 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212259.625 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.625 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.625 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.625 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.625 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.625 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.625 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.626 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.626 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.626 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.626 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.627 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.627 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.627 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212259.627 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.627 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.627 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.627 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.627 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.627 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.628 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.628 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.628 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.628 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.628 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.628 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.628 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.628 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.628 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.628 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.629 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212259.629 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.629 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.629 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))))) into 0
1545212259.629 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.630 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.630 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.630 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.630 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.630 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.630 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.630 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.630 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.630 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.630 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.630 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.630 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.630 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.630 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.630 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.631 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.631 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.631 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2)))))) into 0
1545212259.631 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.631 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.631 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.631 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.631 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.632 * [misc]backup-simplify:  Simplify (* -1 (* (pow (/ 1 (- D)) 2) (* (pow (/ 1 (- d)) -2) (* (/ 1 (- w)) (* (/ 1 (- h)) (/ 1 (/ 1 (- c0)))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.632 * * * * [misc]progress:  [ 3 / 4 ] generating series at (2 2 1 1 1 1 2 1)
1545212259.632 * [misc]backup-simplify:  Simplify (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* h w)))
1545212259.632 * [misc]approximate:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in (c0 h w d D) around 0
1545212259.632 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in D
1545212259.632 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212259.632 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.632 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.632 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.632 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.632 * [misc]backup-simplify:  Simplify d into d
1545212259.632 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.632 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.632 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.632 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.632 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.632 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.632 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.632 * [misc]backup-simplify:  Simplify h into h
1545212259.632 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.632 * [misc]backup-simplify:  Simplify w into w
1545212259.632 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.632 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.632 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.632 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.632 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.632 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212259.632 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in d
1545212259.632 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212259.632 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.632 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.632 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.633 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.633 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.633 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.633 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.633 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.633 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.633 * [misc]backup-simplify:  Simplify D into D
1545212259.633 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.633 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.633 * [misc]backup-simplify:  Simplify h into h
1545212259.633 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.633 * [misc]backup-simplify:  Simplify w into w
1545212259.633 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.633 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212259.633 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.633 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.633 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.633 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212259.633 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in w
1545212259.633 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212259.633 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.633 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.633 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.633 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.633 * [misc]backup-simplify:  Simplify d into d
1545212259.633 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.633 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.633 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.633 * [misc]backup-simplify:  Simplify D into D
1545212259.633 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.633 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.633 * [misc]backup-simplify:  Simplify h into h
1545212259.633 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.633 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.633 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.633 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.633 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.633 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.633 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.634 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.634 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.634 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.634 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.634 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212259.634 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in h
1545212259.634 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212259.634 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.634 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.634 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.634 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.634 * [misc]backup-simplify:  Simplify d into d
1545212259.634 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.634 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.634 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.634 * [misc]backup-simplify:  Simplify D into D
1545212259.634 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.634 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.634 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.634 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.634 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.634 * [misc]backup-simplify:  Simplify w into w
1545212259.634 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.634 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.634 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.634 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.634 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.635 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.635 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.635 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.635 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212259.635 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212259.635 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.635 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.635 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.635 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.635 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.635 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.635 * [misc]backup-simplify:  Simplify d into d
1545212259.635 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.635 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.635 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.635 * [misc]backup-simplify:  Simplify D into D
1545212259.635 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.635 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.635 * [misc]backup-simplify:  Simplify h into h
1545212259.635 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.635 * [misc]backup-simplify:  Simplify w into w
1545212259.635 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.635 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.635 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.635 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.636 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.636 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.636 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.636 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.636 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212259.636 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.636 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.636 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.636 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.636 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.636 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.636 * [misc]backup-simplify:  Simplify d into d
1545212259.636 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.636 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.636 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.636 * [misc]backup-simplify:  Simplify D into D
1545212259.636 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.636 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.636 * [misc]backup-simplify:  Simplify h into h
1545212259.636 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.636 * [misc]backup-simplify:  Simplify w into w
1545212259.636 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.636 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.636 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.636 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.636 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.636 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.636 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.637 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.637 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212259.637 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.637 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.637 * [misc]backup-simplify:  Simplify d into d
1545212259.637 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212259.637 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.637 * [misc]backup-simplify:  Simplify w into w
1545212259.637 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212259.637 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.637 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.637 * [misc]backup-simplify:  Simplify D into D
1545212259.637 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.637 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.637 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.637 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.637 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.637 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.637 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212259.637 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.637 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.637 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212259.637 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212259.637 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212259.637 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.638 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.638 * [misc]backup-simplify:  Simplify d into d
1545212259.638 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212259.638 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.638 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.638 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.638 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.638 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.638 * [misc]backup-simplify:  Simplify D into D
1545212259.638 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.638 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.638 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212259.638 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.638 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212259.638 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212259.638 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212259.638 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.638 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.638 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.638 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.638 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.638 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.638 * [misc]backup-simplify:  Simplify D into D
1545212259.638 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.638 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.638 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212259.638 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212259.638 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.638 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.638 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.638 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.639 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.639 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.639 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.639 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.639 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212259.639 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.639 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.639 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.640 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.640 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.640 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.640 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.640 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.640 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.640 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212259.640 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212259.640 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.640 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.640 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.641 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.641 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212259.641 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212259.641 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.641 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.641 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.641 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.641 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.641 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.641 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212259.641 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.641 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.642 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.642 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.642 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.642 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.642 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.642 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.643 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.643 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.643 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.643 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.643 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.643 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.643 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.643 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.644 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.644 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.644 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212259.644 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.644 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.644 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.644 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.644 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.644 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.644 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.645 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.645 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.645 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212259.645 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.645 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.645 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.645 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.645 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.645 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.645 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.646 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.646 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.646 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.646 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.646 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.646 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.646 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.646 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.647 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.647 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.647 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.648 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.648 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.648 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.648 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.648 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.648 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.648 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.648 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.648 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.649 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.649 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.649 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.649 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212259.650 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.650 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.650 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.650 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.650 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.650 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.650 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.650 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.650 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.650 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.650 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.650 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.650 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.650 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.650 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.650 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.651 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.651 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212259.651 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.651 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.651 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.651 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.651 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.651 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.651 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.651 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.651 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.651 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.651 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.652 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.652 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.652 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.652 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.652 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.652 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.652 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.652 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.653 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.653 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.653 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212259.653 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212259.654 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.654 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.654 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212259.655 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.655 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.655 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.655 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.655 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.655 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.656 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.656 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212259.656 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212259.657 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.657 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.658 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.658 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.658 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212259.659 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.659 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.659 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.659 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.659 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.659 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.659 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.659 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.659 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.659 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.659 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212259.660 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.660 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.660 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.660 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.660 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.660 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) c0))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.660 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.660 * [misc]approximate:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in (c0 h w d D) around 0
1545212259.660 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212259.660 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.661 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.661 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.661 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.661 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.661 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.661 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.661 * [misc]backup-simplify:  Simplify h into h
1545212259.661 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.661 * [misc]backup-simplify:  Simplify w into w
1545212259.661 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212259.661 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.661 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.661 * [misc]backup-simplify:  Simplify d into d
1545212259.661 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.661 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.661 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.661 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.661 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.661 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.661 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.661 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.661 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212259.661 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.661 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.661 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.661 * [misc]backup-simplify:  Simplify D into D
1545212259.661 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.661 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.661 * [misc]backup-simplify:  Simplify h into h
1545212259.661 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.661 * [misc]backup-simplify:  Simplify w into w
1545212259.661 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212259.661 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.661 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.661 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.661 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.661 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.661 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.661 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.661 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.662 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.662 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.662 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212259.662 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.662 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212259.662 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.662 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.662 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.662 * [misc]backup-simplify:  Simplify D into D
1545212259.662 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.662 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.662 * [misc]backup-simplify:  Simplify h into h
1545212259.662 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.662 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.662 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.662 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212259.662 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.662 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.662 * [misc]backup-simplify:  Simplify d into d
1545212259.662 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.662 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.662 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.662 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.662 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.662 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.662 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.662 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.663 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.663 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.663 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.663 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212259.663 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.663 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.663 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.663 * [misc]backup-simplify:  Simplify D into D
1545212259.663 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.663 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.663 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.663 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.663 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.663 * [misc]backup-simplify:  Simplify w into w
1545212259.663 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212259.663 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.663 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.663 * [misc]backup-simplify:  Simplify d into d
1545212259.663 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.663 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.663 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.663 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.663 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.663 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.663 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.663 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.664 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.664 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.664 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.664 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.664 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.664 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.664 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.664 * [misc]backup-simplify:  Simplify D into D
1545212259.664 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.664 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.664 * [misc]backup-simplify:  Simplify h into h
1545212259.664 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.664 * [misc]backup-simplify:  Simplify w into w
1545212259.664 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.664 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.664 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.664 * [misc]backup-simplify:  Simplify d into d
1545212259.664 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.664 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.664 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.664 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.664 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.664 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.664 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.664 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.664 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.664 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.664 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.664 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.664 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.665 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.665 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.665 * [misc]backup-simplify:  Simplify D into D
1545212259.665 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.665 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.665 * [misc]backup-simplify:  Simplify h into h
1545212259.665 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.665 * [misc]backup-simplify:  Simplify w into w
1545212259.665 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.665 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.665 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.665 * [misc]backup-simplify:  Simplify d into d
1545212259.665 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.665 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.665 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.665 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.665 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.665 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.665 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.665 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.665 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.665 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.665 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.665 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212259.665 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.665 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.665 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.665 * [misc]backup-simplify:  Simplify D into D
1545212259.665 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.665 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.665 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.665 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.665 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.665 * [misc]backup-simplify:  Simplify w into w
1545212259.666 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.666 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.666 * [misc]backup-simplify:  Simplify d into d
1545212259.666 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.666 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.666 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.666 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.666 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.666 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.666 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.666 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212259.666 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212259.666 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212259.666 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.666 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.666 * [misc]backup-simplify:  Simplify D into D
1545212259.666 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.666 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.666 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.666 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.666 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.666 * [misc]backup-simplify:  Simplify d into d
1545212259.666 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.666 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.666 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.667 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.667 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.667 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212259.667 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212259.667 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.667 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.667 * [misc]backup-simplify:  Simplify D into D
1545212259.667 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.667 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.667 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.667 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.667 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.667 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.667 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212259.667 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.667 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.667 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.667 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.667 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.667 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.667 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.667 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.668 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.668 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.668 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.668 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.668 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.668 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.668 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.668 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.668 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.668 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.669 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212259.669 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.669 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212259.669 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.669 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.669 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.669 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.669 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.669 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.669 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.670 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.670 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.670 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.670 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.670 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.670 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.670 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.670 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212259.670 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.670 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.670 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.670 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.670 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.671 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.671 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.671 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.671 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.671 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.672 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.672 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.672 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.672 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.672 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.672 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.672 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.672 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.672 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.672 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.672 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.672 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.672 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.673 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212259.673 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.673 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.673 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.673 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.673 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.673 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.673 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.673 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.673 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.673 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.673 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.674 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.674 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.674 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.674 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.674 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.674 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.674 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.675 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.675 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.675 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.675 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.675 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.675 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.675 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.675 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.675 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.676 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.676 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.676 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.676 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.676 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.676 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.676 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.677 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.677 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.677 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.677 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.677 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.677 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.677 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.678 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212259.678 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.678 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.678 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.678 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.678 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.678 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.678 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.678 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.678 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.678 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.678 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.678 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.678 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.678 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.678 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.678 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.679 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.679 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.679 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.679 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.679 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.679 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.680 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.680 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.680 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.680 * [misc]backup-simplify:  Simplify (* 1 (* (pow (/ 1 D) 2) (* (pow (/ 1 d) -2) (* (/ 1 w) (* (/ 1 h) (/ 1 (/ 1 c0))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.680 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212259.680 * [misc]approximate:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (c0 h w d D) around 0
1545212259.680 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212259.680 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212259.680 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.680 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212259.680 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.680 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.680 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.680 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.680 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.680 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.680 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.680 * [misc]backup-simplify:  Simplify h into h
1545212259.680 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.680 * [misc]backup-simplify:  Simplify w into w
1545212259.680 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212259.680 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.680 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.680 * [misc]backup-simplify:  Simplify d into d
1545212259.680 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.680 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.681 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.681 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.681 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.681 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.681 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.681 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.681 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212259.681 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212259.681 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.681 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212259.681 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.681 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.681 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.681 * [misc]backup-simplify:  Simplify D into D
1545212259.681 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.681 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.681 * [misc]backup-simplify:  Simplify h into h
1545212259.681 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.681 * [misc]backup-simplify:  Simplify w into w
1545212259.681 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212259.681 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.681 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.681 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.681 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.681 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.681 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.681 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.681 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.681 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.681 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.681 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212259.681 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.682 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212259.682 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212259.682 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.682 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212259.682 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.682 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.682 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.682 * [misc]backup-simplify:  Simplify D into D
1545212259.682 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.682 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.682 * [misc]backup-simplify:  Simplify h into h
1545212259.682 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.682 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.682 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.682 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212259.682 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.682 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.682 * [misc]backup-simplify:  Simplify d into d
1545212259.682 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.682 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.682 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.682 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.682 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.682 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.682 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.682 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.682 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.682 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.682 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.683 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212259.683 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212259.683 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.683 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212259.683 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.683 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.683 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.683 * [misc]backup-simplify:  Simplify D into D
1545212259.683 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.683 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.683 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.683 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.683 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.683 * [misc]backup-simplify:  Simplify w into w
1545212259.683 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212259.683 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.683 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.683 * [misc]backup-simplify:  Simplify d into d
1545212259.683 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.683 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.683 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.683 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.683 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.683 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.683 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.683 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.683 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.683 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.683 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.684 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.684 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.684 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.684 * [misc]backup-simplify:  Simplify D into D
1545212259.684 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.684 * [misc]backup-simplify:  Simplify h into h
1545212259.684 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.684 * [misc]backup-simplify:  Simplify w into w
1545212259.684 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.684 * [misc]backup-simplify:  Simplify d into d
1545212259.684 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.684 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.684 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.684 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.684 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.684 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.684 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.684 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.684 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.684 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.684 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.684 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.684 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.684 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.684 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.684 * [misc]backup-simplify:  Simplify D into D
1545212259.684 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.685 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.685 * [misc]backup-simplify:  Simplify h into h
1545212259.685 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.685 * [misc]backup-simplify:  Simplify w into w
1545212259.685 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.685 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.685 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.685 * [misc]backup-simplify:  Simplify d into d
1545212259.685 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.685 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.685 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.685 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.685 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.685 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.685 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.685 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.685 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.685 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.685 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.685 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212259.685 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212259.685 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212259.685 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.685 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212259.685 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.685 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.685 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.685 * [misc]backup-simplify:  Simplify D into D
1545212259.686 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.686 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.686 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.686 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.686 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.686 * [misc]backup-simplify:  Simplify w into w
1545212259.686 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.686 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.686 * [misc]backup-simplify:  Simplify d into d
1545212259.686 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.686 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.686 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.686 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.686 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.686 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.686 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.686 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212259.686 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) w) (pow d 2))) into (* -1 (/ (* (pow D 2) w) (pow d 2)))
1545212259.686 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) w) (pow d 2))) in w
1545212259.686 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212259.686 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.686 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212259.686 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212259.686 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.686 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.686 * [misc]backup-simplify:  Simplify D into D
1545212259.686 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.686 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.687 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.687 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.687 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.687 * [misc]backup-simplify:  Simplify d into d
1545212259.687 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.687 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.687 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.687 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.687 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.687 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212259.687 * [misc]backup-simplify:  Simplify (* -1 (/ (pow D 2) (pow d 2))) into (* -1 (/ (pow D 2) (pow d 2)))
1545212259.687 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (pow D 2) (pow d 2))) in d
1545212259.687 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212259.687 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.687 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212259.687 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.687 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.687 * [misc]backup-simplify:  Simplify D into D
1545212259.687 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.687 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.687 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.687 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.687 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.687 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.687 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212259.688 * [misc]backup-simplify:  Simplify (* -1 (pow D 2)) into (* -1 (pow D 2))
1545212259.688 * [misc]taylor:  Taking taylor expansion of (* -1 (pow D 2)) in D
1545212259.688 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212259.688 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.688 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.688 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.688 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.688 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.688 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.688 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212259.688 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.688 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.688 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.688 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.688 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.688 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.689 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.689 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212259.689 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.689 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.689 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.689 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.689 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.689 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.689 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212259.689 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.689 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212259.690 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.690 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.690 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))) into 0
1545212259.690 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.690 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.690 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.690 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.690 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.690 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.690 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.691 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.691 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (pow D 2) (pow d 2)))) into 0
1545212259.691 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.691 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.691 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.691 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.691 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212259.691 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (pow D 2))) into 0
1545212259.691 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.691 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.691 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.692 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.692 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212259.692 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.692 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.692 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.692 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.693 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.693 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.693 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.693 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212259.693 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.693 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.693 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.693 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.693 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.693 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.693 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.694 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.694 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.694 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.694 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.694 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.694 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212259.694 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.695 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.695 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2))))) into 0
1545212259.695 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.695 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.695 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.696 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.696 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.696 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.696 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.696 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.696 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.696 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.696 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.697 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.697 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2))))) into 0
1545212259.697 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.697 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.697 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.697 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.698 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.698 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212259.698 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.698 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.698 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.698 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.698 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.698 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.698 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.699 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.699 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.699 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.699 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.700 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.700 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.700 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212259.700 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.700 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.700 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.700 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.700 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.700 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.700 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.700 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.700 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.700 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.700 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.700 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.700 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.700 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.701 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.701 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.701 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212259.702 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.702 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.702 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))))) into 0
1545212259.702 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.702 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.702 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.702 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.702 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.702 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.702 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.702 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.703 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.703 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.703 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.703 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.703 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.703 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.703 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.703 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.703 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.704 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.704 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2)))))) into 0
1545212259.704 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.704 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.704 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.704 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.704 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.704 * [misc]backup-simplify:  Simplify (* -1 (* (pow (/ 1 (- D)) 2) (* (pow (/ 1 (- d)) -2) (* (/ 1 (- w)) (* (/ 1 (- h)) (/ 1 (/ 1 (- c0)))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.704 * * * * [misc]progress:  [ 4 / 4 ] generating series at (2 2 1 1 1 1 1 2)
1545212259.705 * [misc]backup-simplify:  Simplify (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* h w)))
1545212259.705 * [misc]approximate:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in (c0 h w d D) around 0
1545212259.705 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in D
1545212259.705 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212259.705 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.705 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.705 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.705 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.705 * [misc]backup-simplify:  Simplify d into d
1545212259.705 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.705 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.705 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.705 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.705 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.705 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.705 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.705 * [misc]backup-simplify:  Simplify h into h
1545212259.705 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.705 * [misc]backup-simplify:  Simplify w into w
1545212259.705 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.705 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.705 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.705 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.705 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.705 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212259.705 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in d
1545212259.705 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212259.705 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.705 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.705 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.705 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.705 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.705 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.705 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.705 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.705 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.706 * [misc]backup-simplify:  Simplify D into D
1545212259.706 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.706 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.706 * [misc]backup-simplify:  Simplify h into h
1545212259.706 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.706 * [misc]backup-simplify:  Simplify w into w
1545212259.706 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.706 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212259.706 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.706 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.706 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.706 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212259.706 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in w
1545212259.706 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212259.706 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.706 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.706 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.706 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.706 * [misc]backup-simplify:  Simplify d into d
1545212259.706 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.706 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.706 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.706 * [misc]backup-simplify:  Simplify D into D
1545212259.706 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.706 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.706 * [misc]backup-simplify:  Simplify h into h
1545212259.706 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.706 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.706 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.706 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.706 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.706 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.706 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.706 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.707 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.707 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.707 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.707 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212259.707 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in h
1545212259.707 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212259.707 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.707 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.707 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.707 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.707 * [misc]backup-simplify:  Simplify d into d
1545212259.707 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.707 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.707 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.707 * [misc]backup-simplify:  Simplify D into D
1545212259.707 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.707 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.707 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.707 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.707 * [misc]backup-simplify:  Simplify w into w
1545212259.707 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.707 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212259.707 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.707 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.707 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.708 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.708 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.708 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.708 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212259.708 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212259.708 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.708 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.708 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.708 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.708 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.708 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.708 * [misc]backup-simplify:  Simplify d into d
1545212259.708 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.708 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.708 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.708 * [misc]backup-simplify:  Simplify D into D
1545212259.708 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.708 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.708 * [misc]backup-simplify:  Simplify h into h
1545212259.708 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.708 * [misc]backup-simplify:  Simplify w into w
1545212259.708 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.708 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.708 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.708 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.708 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.708 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.709 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.709 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.709 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212259.709 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212259.709 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.709 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.709 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.709 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.709 * [misc]backup-simplify:  Simplify d into d
1545212259.709 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.709 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.709 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.709 * [misc]backup-simplify:  Simplify D into D
1545212259.709 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.709 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.709 * [misc]backup-simplify:  Simplify h into h
1545212259.709 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.709 * [misc]backup-simplify:  Simplify w into w
1545212259.709 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.709 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212259.709 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.709 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212259.709 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.709 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.709 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.709 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212259.710 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212259.710 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.710 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.710 * [misc]backup-simplify:  Simplify d into d
1545212259.710 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212259.710 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.710 * [misc]backup-simplify:  Simplify w into w
1545212259.710 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212259.710 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.710 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.710 * [misc]backup-simplify:  Simplify D into D
1545212259.710 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.710 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.710 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.710 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.710 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.710 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.710 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212259.710 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.710 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.710 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212259.710 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212259.710 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212259.710 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.710 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.710 * [misc]backup-simplify:  Simplify d into d
1545212259.710 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212259.710 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.710 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.711 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.711 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.711 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.711 * [misc]backup-simplify:  Simplify D into D
1545212259.711 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.711 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.711 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212259.711 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.711 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212259.711 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212259.711 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212259.711 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.711 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.711 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.711 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.711 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.711 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.711 * [misc]backup-simplify:  Simplify D into D
1545212259.711 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.711 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.711 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212259.711 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212259.711 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.711 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.711 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.711 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.711 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.712 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212259.712 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.712 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.712 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212259.712 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.712 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.712 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.712 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.712 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.713 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.713 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.713 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.713 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.713 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212259.713 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212259.713 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.713 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.713 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.714 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.714 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212259.714 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212259.714 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.714 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.714 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.714 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.714 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.714 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.714 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212259.714 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.714 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.715 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.715 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212259.715 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.715 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.715 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212259.715 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.716 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.716 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.716 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.716 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.716 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.716 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.716 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.716 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.717 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.717 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.717 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212259.717 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.717 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.717 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.717 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.717 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.717 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.717 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.718 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.718 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.718 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212259.718 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.719 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.719 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.719 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.719 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.719 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.719 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.719 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.719 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.719 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.719 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.719 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.719 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.720 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.720 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.720 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.720 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212259.720 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.721 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.721 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.721 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.721 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.721 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.721 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.721 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.721 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.721 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.722 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.722 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.722 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.723 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212259.723 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.723 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.723 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.723 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.723 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.723 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.723 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.723 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.723 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.723 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.723 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.723 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.723 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.723 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.723 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.723 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.724 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.724 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212259.724 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.724 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.724 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.724 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.724 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.724 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.725 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.725 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.725 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.725 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.725 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.725 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.725 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.725 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.725 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.725 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.725 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.725 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.726 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212259.726 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.726 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.726 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212259.727 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212259.727 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.727 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.728 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212259.728 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212259.728 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.728 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.728 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.728 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.728 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.728 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.728 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.728 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.729 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.729 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.729 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212259.730 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212259.730 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.730 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.730 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.731 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.731 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212259.732 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212259.732 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.732 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.732 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.732 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.732 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.732 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.732 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.732 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.732 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.732 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.732 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.732 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.732 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.732 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.732 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.732 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.732 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.732 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.732 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.733 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212259.733 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.733 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212259.733 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.733 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.733 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.733 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) c0))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.734 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212259.734 * [misc]approximate:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in (c0 h w d D) around 0
1545212259.734 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212259.734 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.734 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.734 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.734 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.734 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.734 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.734 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.734 * [misc]backup-simplify:  Simplify h into h
1545212259.734 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.734 * [misc]backup-simplify:  Simplify w into w
1545212259.734 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212259.734 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.734 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.734 * [misc]backup-simplify:  Simplify d into d
1545212259.734 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.734 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.734 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.734 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.734 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.734 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.734 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.734 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.734 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212259.734 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.734 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.734 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.734 * [misc]backup-simplify:  Simplify D into D
1545212259.734 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.734 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.735 * [misc]backup-simplify:  Simplify h into h
1545212259.735 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.735 * [misc]backup-simplify:  Simplify w into w
1545212259.735 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212259.735 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.735 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.735 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.735 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.735 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.735 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.735 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.735 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.735 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.735 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.735 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212259.735 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.735 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212259.735 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.735 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.735 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.735 * [misc]backup-simplify:  Simplify D into D
1545212259.735 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.735 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.735 * [misc]backup-simplify:  Simplify h into h
1545212259.735 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.735 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.735 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.735 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212259.735 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.735 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.735 * [misc]backup-simplify:  Simplify d into d
1545212259.735 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.735 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.735 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.735 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.735 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.736 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.736 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.736 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.736 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.736 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.736 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.736 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212259.736 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.736 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.736 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.736 * [misc]backup-simplify:  Simplify D into D
1545212259.736 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.736 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.736 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.736 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.736 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.736 * [misc]backup-simplify:  Simplify w into w
1545212259.736 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212259.736 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.736 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.736 * [misc]backup-simplify:  Simplify d into d
1545212259.736 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.736 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.736 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.736 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.736 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.736 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.737 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.737 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.737 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.737 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.737 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.737 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.737 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.737 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.737 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.737 * [misc]backup-simplify:  Simplify D into D
1545212259.737 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.737 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.737 * [misc]backup-simplify:  Simplify h into h
1545212259.737 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.737 * [misc]backup-simplify:  Simplify w into w
1545212259.737 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.737 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.737 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.737 * [misc]backup-simplify:  Simplify d into d
1545212259.737 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.737 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.737 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.737 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.737 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.737 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.737 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.737 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.737 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.738 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.738 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.738 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.738 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.738 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.738 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.738 * [misc]backup-simplify:  Simplify D into D
1545212259.738 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.738 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.738 * [misc]backup-simplify:  Simplify h into h
1545212259.738 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.738 * [misc]backup-simplify:  Simplify w into w
1545212259.738 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.738 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.738 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.738 * [misc]backup-simplify:  Simplify d into d
1545212259.738 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.738 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.738 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.738 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.738 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.738 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.738 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.738 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.738 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.738 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.739 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.739 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212259.739 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.739 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.739 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.739 * [misc]backup-simplify:  Simplify D into D
1545212259.739 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.739 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.739 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.739 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.739 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.739 * [misc]backup-simplify:  Simplify w into w
1545212259.739 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.739 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.739 * [misc]backup-simplify:  Simplify d into d
1545212259.739 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.739 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.739 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.739 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.739 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.739 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.739 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.739 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212259.739 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212259.739 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212259.740 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.740 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.740 * [misc]backup-simplify:  Simplify D into D
1545212259.740 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.740 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.740 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.740 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.740 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.740 * [misc]backup-simplify:  Simplify d into d
1545212259.740 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.740 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.740 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.740 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.740 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.740 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212259.740 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212259.740 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.740 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.740 * [misc]backup-simplify:  Simplify D into D
1545212259.740 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.740 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.740 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.740 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.740 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.740 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.740 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212259.740 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.740 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.740 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.740 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.741 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.741 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.741 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.741 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.741 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.741 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.741 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.741 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.741 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.741 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.741 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.741 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.741 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.741 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.742 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212259.742 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.742 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212259.742 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.742 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.742 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.742 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.742 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.742 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.742 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.743 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.743 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.743 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.743 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.743 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.743 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.743 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.743 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212259.743 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.743 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.743 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.743 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.744 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.744 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.744 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.744 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.744 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.744 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.745 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.745 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.745 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.745 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.745 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.745 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.745 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.745 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.745 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.745 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.745 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.745 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.745 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.746 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212259.746 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.746 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.746 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.746 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.746 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.746 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.746 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.746 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.746 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.746 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.746 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.747 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.747 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.747 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.747 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.747 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.747 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.747 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.748 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.748 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.748 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.748 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.748 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.749 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.749 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.749 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.749 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.749 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.750 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.750 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.750 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.750 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.750 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.750 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.750 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.750 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.750 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.750 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.750 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.750 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.750 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.750 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.750 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.751 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212259.751 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.751 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.751 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.751 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.751 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.751 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.751 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.751 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.751 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.751 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.751 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.751 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.751 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.751 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.751 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.751 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.752 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.752 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.752 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.753 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.753 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.753 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.753 * [misc]backup-simplify:  Simplify (* 1 (* (pow (/ 1 D) 2) (* (pow (/ 1 d) -2) (* (/ 1 w) (* (/ 1 h) (/ 1 (/ 1 c0))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.753 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212259.753 * [misc]approximate:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (c0 h w d D) around 0
1545212259.753 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212259.753 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212259.753 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.753 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212259.753 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212259.753 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.753 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.753 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.753 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212259.753 * [misc]taylor:  Taking taylor expansion of h in D
1545212259.753 * [misc]backup-simplify:  Simplify h into h
1545212259.753 * [misc]taylor:  Taking taylor expansion of w in D
1545212259.753 * [misc]backup-simplify:  Simplify w into w
1545212259.753 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212259.753 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212259.753 * [misc]taylor:  Taking taylor expansion of d in D
1545212259.753 * [misc]backup-simplify:  Simplify d into d
1545212259.754 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212259.754 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.754 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.754 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.754 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212259.754 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.754 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.754 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212259.754 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212259.754 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212259.754 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.754 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212259.754 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212259.754 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.754 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.754 * [misc]backup-simplify:  Simplify D into D
1545212259.754 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212259.754 * [misc]taylor:  Taking taylor expansion of h in d
1545212259.754 * [misc]backup-simplify:  Simplify h into h
1545212259.754 * [misc]taylor:  Taking taylor expansion of w in d
1545212259.754 * [misc]backup-simplify:  Simplify w into w
1545212259.754 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212259.754 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.754 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.754 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.754 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212259.754 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.754 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.754 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.754 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.754 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.754 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212259.755 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212259.755 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212259.755 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212259.755 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.755 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212259.755 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212259.755 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.755 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.755 * [misc]backup-simplify:  Simplify D into D
1545212259.755 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212259.755 * [misc]taylor:  Taking taylor expansion of h in w
1545212259.755 * [misc]backup-simplify:  Simplify h into h
1545212259.755 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.755 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.755 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212259.755 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.755 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.755 * [misc]backup-simplify:  Simplify d into d
1545212259.755 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212259.755 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.755 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.755 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212259.755 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.755 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212259.755 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.755 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212259.755 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.755 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.756 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212259.756 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212259.756 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212259.756 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.756 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212259.756 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.756 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.756 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.756 * [misc]backup-simplify:  Simplify D into D
1545212259.756 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.756 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.756 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.756 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.756 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.756 * [misc]backup-simplify:  Simplify w into w
1545212259.756 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212259.756 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.756 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.756 * [misc]backup-simplify:  Simplify d into d
1545212259.756 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212259.756 * [misc]backup-simplify:  Simplify c0 into c0
1545212259.756 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.756 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.756 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.756 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.756 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.756 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.756 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.756 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212259.757 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212259.757 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.757 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.757 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.757 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.757 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.757 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.757 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.757 * [misc]backup-simplify:  Simplify D into D
1545212259.757 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.757 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.757 * [misc]backup-simplify:  Simplify h into h
1545212259.757 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.757 * [misc]backup-simplify:  Simplify w into w
1545212259.757 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.757 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.757 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.757 * [misc]backup-simplify:  Simplify d into d
1545212259.757 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.757 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.757 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.757 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.757 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.757 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.757 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.757 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.757 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.757 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.757 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.757 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212259.757 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212259.757 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.757 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212259.758 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212259.758 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212259.758 * [misc]taylor:  Taking taylor expansion of D in c0
1545212259.758 * [misc]backup-simplify:  Simplify D into D
1545212259.758 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212259.758 * [misc]taylor:  Taking taylor expansion of h in c0
1545212259.758 * [misc]backup-simplify:  Simplify h into h
1545212259.758 * [misc]taylor:  Taking taylor expansion of w in c0
1545212259.758 * [misc]backup-simplify:  Simplify w into w
1545212259.758 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212259.758 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212259.758 * [misc]taylor:  Taking taylor expansion of d in c0
1545212259.758 * [misc]backup-simplify:  Simplify d into d
1545212259.758 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212259.758 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.758 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.758 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.758 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212259.758 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212259.758 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.758 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212259.758 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.758 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212259.758 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212259.758 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212259.758 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212259.758 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212259.758 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.759 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212259.759 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212259.759 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212259.759 * [misc]taylor:  Taking taylor expansion of D in h
1545212259.759 * [misc]backup-simplify:  Simplify D into D
1545212259.759 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212259.759 * [misc]taylor:  Taking taylor expansion of h in h
1545212259.759 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.759 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.759 * [misc]taylor:  Taking taylor expansion of w in h
1545212259.759 * [misc]backup-simplify:  Simplify w into w
1545212259.759 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212259.759 * [misc]taylor:  Taking taylor expansion of d in h
1545212259.759 * [misc]backup-simplify:  Simplify d into d
1545212259.759 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.759 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212259.759 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.759 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212259.759 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.759 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212259.759 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.759 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212259.759 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) w) (pow d 2))) into (* -1 (/ (* (pow D 2) w) (pow d 2)))
1545212259.759 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) w) (pow d 2))) in w
1545212259.759 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212259.759 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.760 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212259.760 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212259.760 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212259.760 * [misc]taylor:  Taking taylor expansion of D in w
1545212259.760 * [misc]backup-simplify:  Simplify D into D
1545212259.760 * [misc]taylor:  Taking taylor expansion of w in w
1545212259.760 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.760 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.760 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212259.760 * [misc]taylor:  Taking taylor expansion of d in w
1545212259.760 * [misc]backup-simplify:  Simplify d into d
1545212259.760 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.760 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212259.760 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.760 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212259.760 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212259.760 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212259.760 * [misc]backup-simplify:  Simplify (* -1 (/ (pow D 2) (pow d 2))) into (* -1 (/ (pow D 2) (pow d 2)))
1545212259.760 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (pow D 2) (pow d 2))) in d
1545212259.760 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212259.760 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.760 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212259.760 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212259.760 * [misc]taylor:  Taking taylor expansion of D in d
1545212259.760 * [misc]backup-simplify:  Simplify D into D
1545212259.760 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212259.760 * [misc]taylor:  Taking taylor expansion of d in d
1545212259.760 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.760 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.760 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212259.760 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.761 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212259.761 * [misc]backup-simplify:  Simplify (* -1 (pow D 2)) into (* -1 (pow D 2))
1545212259.761 * [misc]taylor:  Taking taylor expansion of (* -1 (pow D 2)) in D
1545212259.761 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212259.761 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.761 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212259.761 * [misc]taylor:  Taking taylor expansion of D in D
1545212259.761 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.761 * [misc]backup-simplify:  Simplify 1 into 1
1545212259.761 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212259.761 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212259.761 * [misc]backup-simplify:  Simplify -1 into -1
1545212259.761 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212259.761 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.761 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212259.761 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.761 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.762 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.762 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212259.762 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.762 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.762 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.762 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.762 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.762 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.762 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212259.762 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.763 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212259.763 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.763 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.763 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))) into 0
1545212259.763 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.763 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.763 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.763 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.763 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.763 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212259.763 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212259.764 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212259.764 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (pow D 2) (pow d 2)))) into 0
1545212259.764 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.764 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.764 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212259.764 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.764 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212259.764 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (pow D 2))) into 0
1545212259.764 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.764 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.764 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.765 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212259.765 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212259.765 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.765 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212259.765 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.765 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212259.765 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.766 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.766 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.766 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212259.766 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.766 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.766 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.766 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.766 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.766 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.766 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.766 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.766 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.766 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.767 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.767 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.767 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212259.767 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.768 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.768 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2))))) into 0
1545212259.768 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.768 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.768 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.768 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.768 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.768 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.768 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.768 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.769 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.769 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212259.769 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212259.769 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.770 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2))))) into 0
1545212259.770 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.770 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.770 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212259.770 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.770 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212259.770 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212259.770 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.770 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.771 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.771 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.771 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.771 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 1))) into 0
1545212259.771 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.771 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212259.771 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212259.772 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212259.772 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212259.772 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.772 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.773 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212259.773 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212259.773 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.773 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.773 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.773 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.773 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.773 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.773 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.773 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.773 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.773 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.773 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.773 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.773 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.773 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212259.774 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.774 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212259.774 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.775 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.775 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))))) into 0
1545212259.775 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212259.775 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.775 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.775 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.775 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.775 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.775 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.775 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.775 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.775 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.775 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.775 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.775 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.775 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.776 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212259.776 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212259.776 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212259.776 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212259.777 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2)))))) into 0
1545212259.777 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212259.777 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.777 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212259.777 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.777 * [misc]backup-simplify:  Simplify 0 into 0
1545212259.777 * [misc]backup-simplify:  Simplify (* -1 (* (pow (/ 1 (- D)) 2) (* (pow (/ 1 (- d)) -2) (* (/ 1 (- w)) (* (/ 1 (- h)) (/ 1 (/ 1 (- c0)))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212259.777 * * * [misc]progress:  simplifying candidates
1545212259.777 * * * * [misc]progress:  [ 1 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (log (* (exp (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212259.777 * [enter]simplify:  Simplifying (* (exp (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))
1545212259.777 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212259.780 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212259.787 * * [misc]simplify:  iters left: 4 (96 enodes)
1545212259.810 * * [misc]simplify:  iters left: 3 (324 enodes)
1545212259.985 * [exit]simplify:  Simplified to (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M)))))
1545212259.985 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))))
1545212259.985 * * * * [misc]progress:  [ 2 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (pow (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) 1)))))>
1545212259.985 * * * * [misc]progress:  [ 3 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212259.985 * * * * [misc]progress:  [ 4 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (log (exp (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212259.985 * * * * [misc]progress:  [ 5 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (* (* (cbrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (cbrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212259.985 * * * * [misc]progress:  [ 6 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (cbrt (* (* (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212259.985 * * * * [misc]progress:  [ 7 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (* (sqrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212259.985 * * * * [misc]progress:  [ 8 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D))))))))>
1545212259.986 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d))))
1545212259.986 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212259.992 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212260.019 * * [misc]simplify:  iters left: 4 (400 enodes)
1545212260.284 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* (* D w) D)) (* (* (* d d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212260.284 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* (* D w) D)) (* (* (* d d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D))))))))
1545212260.284 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D)))
1545212260.284 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212260.289 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212260.305 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212260.487 * [exit]simplify:  Simplified to (* (* w (* D D)) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))
1545212260.487 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d)))) (* (* w (* D D)) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))))))
1545212260.487 * * * * [misc]progress:  [ 9 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))))>
1545212260.487 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d))))
1545212260.487 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212260.494 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212260.516 * * [misc]simplify:  iters left: 4 (392 enodes)
1545212261.062 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* (/ d D) (* d c0)) h)) (* (* D w) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))
1545212261.062 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* (/ d D) (* d c0)) h)) (* (* D w) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))))
1545212261.062 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212261.062 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212261.070 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212261.097 * * [misc]simplify:  iters left: 4 (277 enodes)
1545212261.344 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w))
1545212261.344 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w)))))))
1545212261.344 * * * * [misc]progress:  [ 10 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))))>
1545212261.344 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D)))))
1545212261.345 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212261.351 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212261.374 * * [misc]simplify:  iters left: 4 (393 enodes)
1545212261.633 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ c0 (/ h d)) (/ d D))) (* (* D w) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))
1545212261.633 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ c0 (/ h d)) (/ d D))) (* (* D w) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))))
1545212261.633 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212261.633 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212261.640 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212261.663 * * [misc]simplify:  iters left: 4 (277 enodes)
1545212261.866 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w))
1545212261.866 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w)))))))
1545212261.866 * * * * [misc]progress:  [ 11 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))))>
1545212261.867 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d))))
1545212261.867 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212261.880 * * [misc]simplify:  iters left: 5 (96 enodes)
1545212261.919 * * [misc]simplify:  iters left: 4 (388 enodes)
1545212262.201 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ c0 h) (/ (* d d) w))) (* (* D D) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))
1545212262.202 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ c0 h) (/ (* d d) w))) (* (* D D) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))))
1545212262.202 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212262.202 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212262.206 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212262.222 * * [misc]simplify:  iters left: 4 (272 enodes)
1545212262.423 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D D))
1545212262.423 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D D)))))))
1545212262.424 * * * * [misc]progress:  [ 12 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))))>
1545212262.424 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212262.424 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212262.430 * * [misc]simplify:  iters left: 5 (93 enodes)
1545212262.452 * * [misc]simplify:  iters left: 4 (385 enodes)
1545212262.700 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ d D) (/ (* c0 d) (* w h)))))
1545212262.700 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ d D) (/ (* c0 d) (* w h))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))))
1545212262.700 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212262.700 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212262.705 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212262.720 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212262.893 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D)
1545212262.893 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D))))))
1545212262.894 * * * * [misc]progress:  [ 13 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))))>
1545212262.894 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212262.894 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212262.900 * * [misc]simplify:  iters left: 5 (94 enodes)
1545212262.925 * * [misc]simplify:  iters left: 4 (390 enodes)
1545212263.168 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ w (* (/ d D) (* d (/ c0 h))))))
1545212263.168 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ w (* (/ d D) (* d (/ c0 h)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))))
1545212263.168 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212263.169 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212263.173 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212263.190 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212263.363 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D)
1545212263.363 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D))))))
1545212263.364 * * * * [misc]progress:  [ 14 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))))>
1545212263.364 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212263.364 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212263.370 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212263.392 * * [misc]simplify:  iters left: 4 (397 enodes)
1545212263.661 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212263.662 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* w (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))))
1545212263.662 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212263.662 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212263.666 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212263.681 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212263.909 * [exit]simplify:  Simplified to (* w (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212263.910 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))))))
1545212263.910 * * * * [misc]progress:  [ 15 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))))))))>
1545212263.910 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d))))
1545212263.910 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212263.923 * * [misc]simplify:  iters left: 5 (93 enodes)
1545212263.968 * * [misc]simplify:  iters left: 4 (372 enodes)
1545212264.252 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (* (/ c0 h) (* d d))))
1545212264.252 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* (* D w) D) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (* (/ c0 h) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))))))))
1545212264.253 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D)))
1545212264.253 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212264.258 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212264.283 * * [misc]simplify:  iters left: 4 (249 enodes)
1545212264.420 * [exit]simplify:  Simplified to (* (* (* D w) D) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))
1545212264.420 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d)))) (* (* (* D w) D) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212264.420 * * * * [misc]progress:  [ 16 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))))>
1545212264.421 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d))))
1545212264.421 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212264.430 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212264.455 * * [misc]simplify:  iters left: 4 (364 enodes)
1545212264.675 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (/ d D)) d) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))
1545212264.675 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* (* (/ c0 h) (/ d D)) d) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))))
1545212264.676 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212264.676 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212264.680 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212264.693 * * [misc]simplify:  iters left: 4 (236 enodes)
1545212264.828 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w))
1545212264.828 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)))))))
1545212264.829 * * * * [misc]progress:  [ 17 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))))>
1545212264.829 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D)))))
1545212264.829 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212264.835 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212264.855 * * [misc]simplify:  iters left: 4 (365 enodes)
1545212265.124 * [exit]simplify:  Simplified to (+ (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ h (* (* d c0) (/ d D)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))
1545212265.124 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ h (* (* d c0) (/ d D)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))))
1545212265.125 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212265.125 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212265.131 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212265.148 * * [misc]simplify:  iters left: 4 (236 enodes)
1545212265.296 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w))
1545212265.296 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)))))))
1545212265.296 * * * * [misc]progress:  [ 18 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))))>
1545212265.296 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d))))
1545212265.297 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212265.310 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212265.346 * * [misc]simplify:  iters left: 4 (360 enodes)
1545212265.562 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 h) (/ w d)) d) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D)))
1545212265.563 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* (/ (/ c0 h) (/ w d)) d) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))))
1545212265.563 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D))
1545212265.563 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212265.567 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212265.580 * * [misc]simplify:  iters left: 4 (231 enodes)
1545212265.717 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D D))
1545212265.717 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D D)))))))
1545212265.718 * * * * [misc]progress:  [ 19 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))))>
1545212265.718 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212265.718 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212265.728 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212265.760 * * [misc]simplify:  iters left: 4 (352 enodes)
1545212266.008 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (/ (/ (* d c0) (/ D d)) (* w h)) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212266.008 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (/ (/ (* d c0) (/ D d)) (* w h)) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))))
1545212266.008 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212266.008 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212266.012 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212266.025 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212266.153 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D)
1545212266.154 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D))))))
1545212266.154 * * * * [misc]progress:  [ 20 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))))>
1545212266.154 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212266.154 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212266.160 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212266.183 * * [misc]simplify:  iters left: 4 (357 enodes)
1545212266.395 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (* (* (/ c0 w) (/ d h)) (/ d D)) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212266.395 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (* (* (/ c0 w) (/ d h)) (/ d D)) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))))
1545212266.396 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212266.396 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212266.400 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212266.412 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212266.582 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D)
1545212266.582 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D))))))
1545212266.582 * * * * [misc]progress:  [ 21 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))))>
1545212266.582 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212266.583 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212266.588 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212266.608 * * [misc]simplify:  iters left: 4 (360 enodes)
1545212266.857 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212266.857 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))))
1545212266.858 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w)
1545212266.858 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212266.865 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212266.890 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212267.110 * [exit]simplify:  Simplified to (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212267.110 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212267.110 * * * * [misc]progress:  [ 22 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D))))))))>
1545212267.111 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d))))
1545212267.111 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212267.124 * * [misc]simplify:  iters left: 5 (94 enodes)
1545212267.171 * * [misc]simplify:  iters left: 4 (387 enodes)
1545212267.505 * [exit]simplify:  Simplified to (+ (* (* w (* D D)) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (/ h (* d (* d c0)))))
1545212267.505 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* w (* D D)) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (/ h (* d (* d c0))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D))))))))
1545212267.505 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w (* D D)))
1545212267.505 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212267.510 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212267.524 * * [misc]simplify:  iters left: 4 (247 enodes)
1545212267.658 * [exit]simplify:  Simplified to (* (* w (* D D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212267.658 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d d)))) (* (* w (* D D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))))
1545212267.659 * * * * [misc]progress:  [ 23 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))))>
1545212267.659 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d))))
1545212267.659 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212267.665 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212267.694 * * [misc]simplify:  iters left: 4 (379 enodes)
1545212267.925 * [exit]simplify:  Simplified to (+ (/ (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ h (* (/ d D) (* d c0)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))
1545212267.925 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (/ (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ h (* (/ d D) (* d c0)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))))
1545212267.925 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212267.925 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212267.929 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212267.942 * * [misc]simplify:  iters left: 4 (234 enodes)
1545212268.079 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))
1545212268.079 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))))))
1545212268.080 * * * * [misc]progress:  [ 24 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))))>
1545212268.080 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D)))))
1545212268.080 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212268.090 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212268.125 * * [misc]simplify:  iters left: 4 (380 enodes)
1545212268.485 * [exit]simplify:  Simplified to (+ (* (* (* (/ d D) d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))
1545212268.486 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* (* (/ d D) d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))))
1545212268.486 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212268.486 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212268.490 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212268.507 * * [misc]simplify:  iters left: 4 (234 enodes)
1545212268.635 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))
1545212268.635 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))))))
1545212268.635 * * * * [misc]progress:  [ 25 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))))>
1545212268.635 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d))))
1545212268.636 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212268.642 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212268.682 * * [misc]simplify:  iters left: 4 (375 enodes)
1545212268.940 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (/ d w)) d) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)))
1545212268.940 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* (* (/ c0 h) (/ d w)) d) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))))
1545212268.940 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212268.941 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212268.944 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212268.958 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212269.162 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D))
1545212269.163 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)))))))
1545212269.163 * * * * [misc]progress:  [ 26 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))))>
1545212269.163 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212269.163 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212269.169 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212269.189 * * [misc]simplify:  iters left: 4 (367 enodes)
1545212269.580 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212269.580 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))))
1545212269.580 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212269.580 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212269.585 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212269.607 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212269.799 * [exit]simplify:  Simplified to (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212269.799 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))))
1545212269.799 * * * * [misc]progress:  [ 27 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))))>
1545212269.800 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212269.800 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212269.806 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212269.842 * * [misc]simplify:  iters left: 4 (372 enodes)
1545212270.146 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ w (* (* (/ d D) d) (/ c0 h)))))
1545212270.146 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ w (* (* (/ d D) d) (/ c0 h))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))))
1545212270.146 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212270.146 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212270.150 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212270.163 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212270.330 * [exit]simplify:  Simplified to (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212270.331 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))))
1545212270.331 * * * * [misc]progress:  [ 28 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))))>
1545212270.331 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212270.331 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212270.337 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212270.368 * * [misc]simplify:  iters left: 4 (375 enodes)
1545212270.701 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) 3)) (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))))))
1545212270.701 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* w (sqrt (* (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) 3)) (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) (/ (* (/ d D) (/ d D)) (* (/ w c0) h)))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))))
1545212270.702 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212270.702 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212270.709 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212270.732 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212270.948 * [exit]simplify:  Simplified to (* w (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212270.949 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))))
1545212270.949 * * * * [misc]progress:  [ 29 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))))))))>
1545212270.949 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d))))
1545212270.950 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212270.960 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212270.993 * * [misc]simplify:  iters left: 4 (280 enodes)
1545212271.225 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D (* D w))) (* (* (/ c0 h) (* d d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212271.226 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D (* D w))) (* (* (/ c0 h) (* d d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))))))))
1545212271.227 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D)))
1545212271.227 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212271.234 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212271.251 * * [misc]simplify:  iters left: 4 (148 enodes)
1545212271.333 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D w) D))
1545212271.333 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d d)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D w) D)))))))
1545212271.333 * * * * [misc]progress:  [ 30 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))))>
1545212271.333 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d))))
1545212271.334 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212271.344 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212271.369 * * [misc]simplify:  iters left: 4 (278 enodes)
1545212271.571 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ h (/ (* d c0) (/ D d)))))
1545212271.571 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ h (/ (* d c0) (/ D d))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))))
1545212271.571 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212271.572 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212271.578 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212271.595 * * [misc]simplify:  iters left: 4 (137 enodes)
1545212271.660 * [exit]simplify:  Simplified to (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212271.660 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) d)))) (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212271.660 * * * * [misc]progress:  [ 31 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))))>
1545212271.660 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D)))))
1545212271.660 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212271.666 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212271.688 * * [misc]simplify:  iters left: 4 (279 enodes)
1545212271.867 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ h (/ (* d c0) (/ D d)))))
1545212271.868 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ h (/ (* d c0) (/ D d))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))))
1545212271.868 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212271.868 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212271.873 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212271.884 * * [misc]simplify:  iters left: 4 (137 enodes)
1545212271.966 * [exit]simplify:  Simplified to (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212271.966 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* d (/ d D))))) (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212271.966 * * * * [misc]progress:  [ 32 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))))>
1545212271.967 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d))))
1545212271.967 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212271.978 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212272.011 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212272.227 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ w (* (* d d) (/ c0 h)))))
1545212272.227 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ w (* (* d d) (/ c0 h))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))))
1545212272.227 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D))
1545212272.227 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212272.233 * * [misc]simplify:  iters left: 5 (41 enodes)
1545212272.241 * * [misc]simplify:  iters left: 4 (132 enodes)
1545212272.326 * [exit]simplify:  Simplified to (* (* D D) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212272.326 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d d)))) (* (* D D) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212272.326 * * * * [misc]progress:  [ 33 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))))>
1545212272.327 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212272.327 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212272.337 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212272.370 * * [misc]simplify:  iters left: 4 (266 enodes)
1545212272.544 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ w (* (/ c0 h) (* (/ d D) d)))))
1545212272.544 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ w (* (/ c0 h) (* (/ d D) d))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))))
1545212272.544 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212272.544 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212272.547 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212272.555 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212272.635 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D)
1545212272.635 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D))))))
1545212272.635 * * * * [misc]progress:  [ 34 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))))>
1545212272.635 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212272.635 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212272.640 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212272.661 * * [misc]simplify:  iters left: 4 (271 enodes)
1545212272.892 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ w (/ (* (* d c0) (/ d D)) h))))
1545212272.892 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ w (/ (* (* d c0) (/ d D)) h)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))))
1545212272.892 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212272.892 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212272.898 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212272.906 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212272.973 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D)
1545212272.973 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D))))))
1545212272.973 * * * * [misc]progress:  [ 35 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))))>
1545212272.973 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212272.974 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212272.978 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212272.994 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212273.196 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h)))) (- (* (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (* M M)))) w) (/ (sqrt (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))) (/ h (* (* c0 (/ d D)) (/ d D)))))
1545212273.197 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h)))) (- (* (/ (* (/ d D) (/ d D)) (* (/ w c0) h)) (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (* M M)))) w) (/ (sqrt (* (- M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))) (+ M (/ (* (/ d D) (/ d D)) (* (/ w c0) h))))) (/ h (* (* c0 (/ d D)) (/ d D))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))))
1545212273.197 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w)
1545212273.197 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212273.200 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212273.208 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212273.272 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) w)
1545212273.272 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) w))))))
1545212273.272 * * * * [misc]progress:  [ 36 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w (* D D))))))))>
1545212273.273 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d d))))
1545212273.273 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212273.279 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212273.305 * * [misc]simplify:  iters left: 4 (289 enodes)
1545212273.541 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) (* (* D w) D)) (* (* (/ c0 h) (* d d)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))
1545212273.541 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) (* (* D w) D)) (* (* (/ c0 h) (* d d)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w (* D D))))))))
1545212273.542 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w (* D D)))
1545212273.542 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212273.550 * * [misc]simplify:  iters left: 5 (50 enodes)
1545212273.571 * * [misc]simplify:  iters left: 4 (171 enodes)
1545212273.685 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))) (* w (* D D)))
1545212273.685 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w (* D D))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))) (* w (* D D))))))))
1545212273.685 * * * * [misc]progress:  [ 37 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))))>
1545212273.686 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) d))))
1545212273.686 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212273.698 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212273.735 * * [misc]simplify:  iters left: 4 (287 enodes)
1545212273.922 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (/ (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))) (/ h (* (* d c0) (/ d D)))))
1545212273.922 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (/ (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))) (/ h (* (* d c0) (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))))
1545212273.923 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212273.923 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212273.930 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212273.941 * * [misc]simplify:  iters left: 4 (162 enodes)
1545212274.012 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D))
1545212274.012 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D)))))))
1545212274.012 * * * * [misc]progress:  [ 38 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))))>
1545212274.012 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d (/ d D)))))
1545212274.012 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212274.018 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212274.041 * * [misc]simplify:  iters left: 4 (288 enodes)
1545212274.304 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* d (* (/ d D) (/ c0 h))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))
1545212274.304 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* d (* (/ d D) (/ c0 h))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))))
1545212274.305 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212274.305 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212274.312 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212274.333 * * [misc]simplify:  iters left: 4 (162 enodes)
1545212274.804 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D))
1545212274.804 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D)))))))
1545212274.804 * * * * [misc]progress:  [ 39 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))))>
1545212274.804 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d d))))
1545212274.804 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212274.810 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212274.829 * * [misc]simplify:  iters left: 4 (283 enodes)
1545212275.002 * [exit]simplify:  Simplified to (+ (* (* D D) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* (* d d) (/ (/ c0 w) h)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))
1545212275.003 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* D D) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* (* d d) (/ (/ c0 w) h)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))))
1545212275.003 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212275.003 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212275.010 * * [misc]simplify:  iters left: 5 (46 enodes)
1545212275.031 * * [misc]simplify:  iters left: 4 (157 enodes)
1545212275.119 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) (* D D))
1545212275.119 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) (* D D)))))))
1545212275.119 * * * * [misc]progress:  [ 40 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))))>
1545212275.119 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212275.120 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212275.131 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212275.163 * * [misc]simplify:  iters left: 4 (275 enodes)
1545212275.374 * [exit]simplify:  Simplified to (+ (/ (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ w (* (/ c0 h) (/ d (/ D d))))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) D))
1545212275.374 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (/ (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ w (* (/ c0 h) (/ d (/ D d))))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))))
1545212275.374 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212275.374 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212275.381 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212275.400 * * [misc]simplify:  iters left: 4 (152 enodes)
1545212275.482 * [exit]simplify:  Simplified to (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212275.482 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))))
1545212275.482 * * * * [misc]progress:  [ 41 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))))>
1545212275.482 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212275.482 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212275.488 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212275.513 * * [misc]simplify:  iters left: 4 (280 enodes)
1545212275.739 * [exit]simplify:  Simplified to (+ (* (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (* d (/ d D)))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))) D))
1545212275.739 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (* d (/ d D)))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))))
1545212275.739 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212275.739 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212275.746 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212275.765 * * [misc]simplify:  iters left: 4 (152 enodes)
1545212275.893 * [exit]simplify:  Simplified to (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212275.893 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))))
1545212275.893 * * * * [misc]progress:  [ 42 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))))>
1545212275.893 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212275.894 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212275.904 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212275.936 * * [misc]simplify:  iters left: 4 (285 enodes)
1545212276.139 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (/ (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ h (* c0 (* (/ d D) (/ d D))))))
1545212276.139 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* w (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (/ (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ h (* c0 (* (/ d D) (/ d D)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))))
1545212276.139 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212276.139 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212276.146 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212276.168 * * [misc]simplify:  iters left: 4 (152 enodes)
1545212276.263 * [exit]simplify:  Simplified to (* w (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212276.263 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))))
1545212276.263 * * * * [misc]progress:  [ 43 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w (* D D))))))))>
1545212276.264 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d d))))
1545212276.264 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212276.277 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212276.293 * * [misc]simplify:  iters left: 4 (201 enodes)
1545212276.396 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* w (* D D))) (* (* (/ c0 h) (* d d)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))
1545212276.396 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* w (* D D))) (* (* (/ c0 h) (* d d)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w (* D D))))))))
1545212276.397 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w (* D D)))
1545212276.397 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212276.402 * * [misc]simplify:  iters left: 5 (34 enodes)
1545212276.413 * * [misc]simplify:  iters left: 4 (87 enodes)
1545212276.430 * * [misc]simplify:  iters left: 3 (212 enodes)
1545212276.502 * [exit]simplify:  Simplified to (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) (* w (* D D)))
1545212276.502 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w (* D D))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d d)))) (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) (* w (* D D))))))))
1545212276.502 * * * * [misc]progress:  [ 44 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))))>
1545212276.502 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) d))))
1545212276.502 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212276.507 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212276.519 * * [misc]simplify:  iters left: 4 (201 enodes)
1545212276.652 * [exit]simplify:  Simplified to (+ (* (/ c0 (/ (/ h d) (/ d D))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))
1545212276.652 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (/ c0 (/ (/ h d) (/ d D))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))))
1545212276.652 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D))
1545212276.652 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212276.654 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212276.663 * * [misc]simplify:  iters left: 4 (76 enodes)
1545212276.679 * * [misc]simplify:  iters left: 3 (193 enodes)
1545212276.736 * [exit]simplify:  Simplified to (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))
1545212276.736 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) d)))) (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))))))
1545212276.736 * * * * [misc]progress:  [ 45 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))))>
1545212276.736 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d (/ d D)))))
1545212276.736 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212276.741 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212276.759 * * [misc]simplify:  iters left: 4 (202 enodes)
1545212276.890 * [exit]simplify:  Simplified to (+ (* (/ (* (* d c0) (/ d D)) h) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))
1545212276.890 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (/ (* (* d c0) (/ d D)) h) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))))
1545212276.890 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D))
1545212276.891 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212276.893 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212276.899 * * [misc]simplify:  iters left: 4 (76 enodes)
1545212276.914 * * [misc]simplify:  iters left: 3 (193 enodes)
1545212276.992 * [exit]simplify:  Simplified to (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))
1545212276.992 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* d (/ d D))))) (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))))))
1545212276.992 * * * * [misc]progress:  [ 46 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* D D)))))))>
1545212276.993 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d d))))
1545212276.993 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212276.999 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212277.011 * * [misc]simplify:  iters left: 4 (195 enodes)
1545212277.118 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (/ (* d d) w)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)))
1545212277.118 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* (/ c0 h) (/ (* d d) w)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* D D)))))))
1545212277.118 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* D D))
1545212277.121 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212277.126 * * [misc]simplify:  iters left: 5 (30 enodes)
1545212277.137 * * [misc]simplify:  iters left: 4 (71 enodes)
1545212277.167 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212277.234 * [exit]simplify:  Simplified to (* (* D D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D))))))
1545212277.234 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d d)))) (* (* D D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))))
1545212277.235 * * * * [misc]progress:  [ 47 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))))>
1545212277.235 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212277.235 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212277.239 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212277.256 * * [misc]simplify:  iters left: 4 (189 enodes)
1545212277.395 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (/ (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (/ w (* (* (/ d D) (/ c0 h)) d))))
1545212277.395 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* D (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (/ (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (/ w (* (* (/ d D) (/ c0 h)) d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))))
1545212277.395 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D)
1545212277.395 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212277.397 * * [misc]simplify:  iters left: 5 (27 enodes)
1545212277.402 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212277.416 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212277.525 * [exit]simplify:  Simplified to (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D)
1545212277.525 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D))))))
1545212277.525 * * * * [misc]progress:  [ 48 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))))>
1545212277.525 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212277.526 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212277.535 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212277.553 * * [misc]simplify:  iters left: 4 (194 enodes)
1545212277.686 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ w (* (* (/ d D) (/ c0 h)) d))))
1545212277.686 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ w (* (* (/ d D) (/ c0 h)) d)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))))
1545212277.686 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D)
1545212277.687 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212277.691 * * [misc]simplify:  iters left: 5 (27 enodes)
1545212277.697 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212277.726 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212277.837 * [exit]simplify:  Simplified to (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D)
1545212277.837 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D))))))
1545212277.837 * * * * [misc]progress:  [ 49 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) w))))))>
1545212277.837 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212277.838 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212277.846 * * [misc]simplify:  iters left: 5 (52 enodes)
1545212277.870 * * [misc]simplify:  iters left: 4 (195 enodes)
1545212277.971 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) w) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212277.971 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) w) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) w))))))
1545212277.971 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) w)
1545212277.972 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212277.976 * * [misc]simplify:  iters left: 5 (27 enodes)
1545212277.986 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212278.012 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212278.069 * [exit]simplify:  Simplified to (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) w)
1545212278.069 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) w))))))
1545212278.070 * * * * [misc]progress:  [ 50 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d d)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w (* D D))))))))>
1545212278.070 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d d))))
1545212278.070 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212278.076 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212278.104 * * [misc]simplify:  iters left: 4 (307 enodes)
1545212278.359 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* (* D D) w)) (* (* (* d d) (/ c0 h)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))
1545212278.359 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* (* D D) w)) (* (* (* d d) (/ c0 h)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w (* D D))))))))
1545212278.360 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w (* D D)))
1545212278.360 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212278.364 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212278.375 * * [misc]simplify:  iters left: 4 (197 enodes)
1545212278.484 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* (* D w) D))
1545212278.484 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d d)))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* (* D w) D)))))))
1545212278.485 * * * * [misc]progress:  [ 51 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))))>
1545212278.485 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) d))))
1545212278.485 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212278.501 * * [misc]simplify:  iters left: 5 (79 enodes)
1545212278.524 * * [misc]simplify:  iters left: 4 (303 enodes)
1545212278.784 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* (* d (/ d D)) (/ c0 h)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212278.784 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* (* d (/ d D)) (/ c0 h)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))))
1545212278.785 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212278.785 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212278.792 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212278.815 * * [misc]simplify:  iters left: 4 (186 enodes)
1545212278.972 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w))
1545212278.972 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w)))))))
1545212278.972 * * * * [misc]progress:  [ 52 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))))>
1545212278.972 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d (/ d D)))))
1545212278.973 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212278.978 * * [misc]simplify:  iters left: 5 (79 enodes)
1545212279.000 * * [misc]simplify:  iters left: 4 (304 enodes)
1545212279.296 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ h (* (/ d D) (* d c0)))))
1545212279.296 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ h (* (/ d D) (* d c0))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))))
1545212279.296 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212279.296 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212279.303 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212279.330 * * [misc]simplify:  iters left: 4 (186 enodes)
1545212279.444 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w))
1545212279.444 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w)))))))
1545212279.444 * * * * [misc]progress:  [ 53 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))))>
1545212279.444 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d d))))
1545212279.445 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212279.453 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212279.490 * * [misc]simplify:  iters left: 4 (301 enodes)
1545212279.748 * [exit]simplify:  Simplified to (+ (* (* D D) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ w (* (* d d) (/ c0 h)))))
1545212279.748 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* D D) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ w (* (* d d) (/ c0 h))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))))
1545212279.748 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212279.749 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212279.755 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212279.777 * * [misc]simplify:  iters left: 4 (181 enodes)
1545212279.892 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* D D))
1545212279.892 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* D D)))))))
1545212279.892 * * * * [misc]progress:  [ 54 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))))>
1545212279.893 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212279.893 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212279.904 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212279.938 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212280.207 * [exit]simplify:  Simplified to (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (/ (* (* c0 d) (/ d D)) (* w h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D))
1545212280.208 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (/ (* (* c0 d) (/ d D)) (* w h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))))
1545212280.208 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212280.208 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212280.215 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212280.236 * * [misc]simplify:  iters left: 4 (176 enodes)
1545212280.346 * [exit]simplify:  Simplified to (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))
1545212280.346 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212280.346 * * * * [misc]progress:  [ 55 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))))>
1545212280.347 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212280.347 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212280.355 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212280.375 * * [misc]simplify:  iters left: 4 (296 enodes)
1545212280.622 * [exit]simplify:  Simplified to (+ (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) (/ w (/ (* (/ d D) (* d c0)) h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D))
1545212280.622 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) (/ w (/ (* (/ d D) (* d c0)) h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))))
1545212280.622 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212280.622 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212280.625 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212280.636 * * [misc]simplify:  iters left: 4 (176 enodes)
1545212280.758 * [exit]simplify:  Simplified to (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))
1545212280.758 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212280.758 * * * * [misc]progress:  [ 56 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))))>
1545212280.758 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212280.759 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212280.769 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212280.806 * * [misc]simplify:  iters left: 4 (301 enodes)
1545212281.044 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ h (* c0 (* (/ d D) (/ d D))))))
1545212281.044 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* w (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ h (* c0 (* (/ d D) (/ d D)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))))
1545212281.045 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212281.045 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212281.048 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212281.058 * * [misc]simplify:  iters left: 4 (176 enodes)
1545212281.206 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) w)
1545212281.206 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) w))))))
1545212281.206 * * * * [misc]progress:  [ 57 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d d)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w (* D D))))))))>
1545212281.206 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d d))))
1545212281.207 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212281.214 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212281.239 * * [misc]simplify:  iters left: 4 (233 enodes)
1545212281.386 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (* (* (/ c0 h) (* d d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212281.387 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (* (* (/ c0 h) (* d d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w (* D D))))))))
1545212281.387 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w (* D D)))
1545212281.387 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212281.393 * * [misc]simplify:  iters left: 5 (35 enodes)
1545212281.401 * * [misc]simplify:  iters left: 4 (103 enodes)
1545212281.427 * * [misc]simplify:  iters left: 3 (292 enodes)
1545212281.599 * [exit]simplify:  Simplified to (* (sqrt (- M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d))))) (* w (* D D)))
1545212281.599 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w (* D D))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d d)))) (* (sqrt (- M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d))))) (* w (* D D))))))))
1545212281.599 * * * * [misc]progress:  [ 58 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) d)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))))>
1545212281.599 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) d))))
1545212281.599 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212281.605 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212281.621 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212281.769 * [exit]simplify:  Simplified to (+ (* (* d (* (/ c0 h) (/ d D))) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))
1545212281.769 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (* d (* (/ c0 h) (/ d D))) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))))
1545212281.769 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D))
1545212281.769 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212281.775 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212281.787 * * [misc]simplify:  iters left: 4 (90 enodes)
1545212281.810 * * [misc]simplify:  iters left: 3 (270 enodes)
1545212281.950 * [exit]simplify:  Simplified to (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))
1545212281.950 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) d)))) (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212281.950 * * * * [misc]progress:  [ 59 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))))>
1545212281.951 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d (/ d D)))))
1545212281.951 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212281.960 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212281.985 * * [misc]simplify:  iters left: 4 (230 enodes)
1545212282.161 * [exit]simplify:  Simplified to (+ (* (/ (* (* d d) c0) (* h D)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)))
1545212282.161 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (/ (* (* d d) c0) (* h D)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))))
1545212282.161 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D))
1545212282.161 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212282.167 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212282.182 * * [misc]simplify:  iters left: 4 (90 enodes)
1545212282.205 * * [misc]simplify:  iters left: 3 (270 enodes)
1545212282.324 * [exit]simplify:  Simplified to (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))
1545212282.324 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* d (/ d D))))) (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212282.324 * * * * [misc]progress:  [ 60 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d d)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* D D)))))))>
1545212282.324 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d d))))
1545212282.325 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212282.329 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212282.345 * * [misc]simplify:  iters left: 4 (223 enodes)
1545212282.497 * [exit]simplify:  Simplified to (+ (* (/ (* (* d d) (/ c0 h)) w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)))
1545212282.497 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (/ (* (* d d) (/ c0 h)) w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* D D)))))))
1545212282.497 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* D D))
1545212282.497 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212282.500 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212282.506 * * [misc]simplify:  iters left: 4 (85 enodes)
1545212282.533 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212282.680 * [exit]simplify:  Simplified to (* (* D D) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))
1545212282.680 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d d)))) (* (* D D) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))))))
1545212282.681 * * * * [misc]progress:  [ 61 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))))>
1545212282.681 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* (/ d D) d))))
1545212282.681 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212282.685 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212282.697 * * [misc]simplify:  iters left: 4 (217 enodes)
1545212282.832 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ w (* (* d (/ c0 h)) (/ d D)))))
1545212282.833 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ w (* (* d (/ c0 h)) (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))))
1545212282.833 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D)
1545212282.833 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212282.837 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212282.845 * * [misc]simplify:  iters left: 4 (82 enodes)
1545212282.863 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212283.009 * [exit]simplify:  Simplified to (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D)
1545212283.009 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* (/ d D) d)))) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D))))))
1545212283.009 * * * * [misc]progress:  [ 62 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))))>
1545212283.009 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d (/ d D)))))
1545212283.010 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212283.019 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212283.043 * * [misc]simplify:  iters left: 4 (222 enodes)
1545212283.221 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (/ (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (/ w (* (* d (/ c0 h)) (/ d D)))))
1545212283.221 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (/ (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (/ w (* (* d (/ c0 h)) (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))))
1545212283.221 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D)
1545212283.222 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212283.224 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212283.229 * * [misc]simplify:  iters left: 4 (82 enodes)
1545212283.253 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212283.417 * [exit]simplify:  Simplified to (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D)
1545212283.418 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ (/ c0 h) w) (* d (/ d D))))) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D))))))
1545212283.418 * * * * [misc]progress:  [ 63 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) w))))))>
1545212283.418 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212283.418 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212283.422 * * [misc]simplify:  iters left: 5 (56 enodes)
1545212283.447 * * [misc]simplify:  iters left: 4 (223 enodes)
1545212283.613 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w))) (* (- (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)) M) (- M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)))))) w) (* (sqrt (- M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212283.613 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (+ M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w))) (* (- (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)) M) (- M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)))))) w) (* (sqrt (- M (* (* (/ c0 h) (/ d D)) (/ (/ d D) w)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) w))))))
1545212283.613 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) w)
1545212283.613 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212283.618 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212283.627 * * [misc]simplify:  iters left: 4 (82 enodes)
1545212283.645 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212283.775 * [exit]simplify:  Simplified to (* w (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))
1545212283.775 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212283.775 * * * * [misc]progress:  [ 64 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (+ (pow (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))>
1545212283.775 * * * * [misc]progress:  [ 65 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (* 1 (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))>
1545212283.775 * * * * [misc]progress:  [ 66 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (/ (- (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))>
1545212283.776 * * * * [misc]progress:  [ 67 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))))>
1545212283.776 * * * * [misc]progress:  [ 68 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1))))))>
1545212283.776 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212283.776 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212283.778 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212283.784 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212283.810 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212283.915 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212283.915 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1))))))
1545212283.915 * * * * [misc]progress:  [ 69 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1))))))>
1545212283.915 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212283.916 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212283.917 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212283.921 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212283.935 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212284.003 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212284.003 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1))))))
1545212284.003 * * * * [misc]progress:  [ 70 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1))))))>
1545212284.003 * * * * [misc]progress:  [ 71 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))))))))>
1545212284.003 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))
1545212284.003 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212284.005 * * [misc]simplify:  iters left: 5 (23 enodes)
1545212284.009 * * [misc]simplify:  iters left: 4 (49 enodes)
1545212284.018 * * [misc]simplify:  iters left: 3 (125 enodes)
1545212284.087 * * [misc]simplify:  iters left: 2 (471 enodes)
1545212284.512 * [exit]simplify:  Simplified to (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))
1545212284.512 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))))))))
1545212284.512 * * * * [misc]progress:  [ 72 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))))))))>
1545212284.513 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))
1545212284.513 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212284.515 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212284.518 * * [misc]simplify:  iters left: 4 (53 enodes)
1545212284.527 * * [misc]simplify:  iters left: 3 (114 enodes)
1545212284.554 * * [misc]simplify:  iters left: 2 (347 enodes)
1545212284.809 * [exit]simplify:  Simplified to (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))
1545212284.809 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))))))))
1545212284.809 * * * * [misc]progress:  [ 73 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (exp (log (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212284.810 * * * * [misc]progress:  [ 74 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (log (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212284.810 * * * * [misc]progress:  [ 75 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))))))))>
1545212284.810 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))
1545212284.810 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212284.816 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212284.834 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212284.977 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212284.977 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))))))))
1545212284.977 * * * * [misc]progress:  [ 76 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))))))))>
1545212284.978 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))
1545212284.978 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212284.984 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212285.003 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212285.111 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212285.111 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))))))))
1545212285.111 * * * * [misc]progress:  [ 77 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212285.111 * * * * [misc]progress:  [ 78 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (cbrt (* (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212285.111 * * * * [misc]progress:  [ 79 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))>
1545212285.111 * * * * [misc]progress:  [ 80 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* d d)) (* w (* D D))))))))>
1545212285.111 * [enter]simplify:  Simplifying (* (/ c0 h) (* d d))
1545212285.111 * * [misc]simplify:  iters left: 4 (6 enodes)
1545212285.112 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212285.114 * * [misc]simplify:  iters left: 2 (20 enodes)
1545212285.117 * * [misc]simplify:  iters left: 1 (28 enodes)
1545212285.120 * [exit]simplify:  Simplified to (/ (* d d) (/ h c0))
1545212285.120 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (/ (* d d) (/ h c0)) (* w (* D D))))))))
1545212285.121 * [enter]simplify:  Simplifying (* w (* D D))
1545212285.121 * * [misc]simplify:  iters left: 4 (4 enodes)
1545212285.121 * * [misc]simplify:  iters left: 3 (7 enodes)
1545212285.122 * * [misc]simplify:  iters left: 2 (9 enodes)
1545212285.124 * [exit]simplify:  Simplified to (* w (* D D))
1545212285.124 * [misc]simplify:  Simplified (2 2 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* d d)) (* w (* D D))))))))
1545212285.124 * * * * [misc]progress:  [ 81 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* (/ d D) d)) (* w D)))))))>
1545212285.124 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) d))
1545212285.124 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212285.125 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212285.129 * * [misc]simplify:  iters left: 4 (40 enodes)
1545212285.145 * * [misc]simplify:  iters left: 3 (79 enodes)
1545212285.169 * * [misc]simplify:  iters left: 2 (132 enodes)
1545212285.215 * * [misc]simplify:  iters left: 1 (191 enodes)
1545212285.288 * [exit]simplify:  Simplified to (* (* d (/ d h)) (/ c0 D))
1545212285.288 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (* d (/ d h)) (/ c0 D)) (* w D)))))))
1545212285.288 * [enter]simplify:  Simplifying (* w D)
1545212285.288 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212285.288 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212285.289 * [exit]simplify:  Simplified to (* w D)
1545212285.289 * [misc]simplify:  Simplified (2 2 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* (/ d D) d)) (* w D)))))))
1545212285.289 * * * * [misc]progress:  [ 82 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* d (/ d D))) (* w D)))))))>
1545212285.289 * [enter]simplify:  Simplifying (* (/ c0 h) (* d (/ d D)))
1545212285.289 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212285.291 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212285.293 * * [misc]simplify:  iters left: 4 (41 enodes)
1545212285.301 * * [misc]simplify:  iters left: 3 (75 enodes)
1545212285.312 * * [misc]simplify:  iters left: 2 (125 enodes)
1545212285.342 * * [misc]simplify:  iters left: 1 (181 enodes)
1545212285.395 * [exit]simplify:  Simplified to (* (/ d D) (* c0 (/ d h)))
1545212285.395 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ d D) (* c0 (/ d h))) (* w D)))))))
1545212285.396 * [enter]simplify:  Simplifying (* w D)
1545212285.396 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212285.397 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212285.399 * [exit]simplify:  Simplified to (* w D)
1545212285.399 * [misc]simplify:  Simplified (2 2 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* d (/ d D))) (* w D)))))))
1545212285.399 * * * * [misc]progress:  [ 83 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))>
1545212285.399 * * * * [misc]progress:  [ 84 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212285.400 * [enter]simplify:  Simplifying (/ d D)
1545212285.400 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212285.401 * [exit]simplify:  Simplified to (/ d D)
1545212285.401 * [misc]simplify:  Simplified (2 2 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))
1545212285.401 * * * * [misc]progress:  [ 85 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))))))))>
1545212285.401 * [enter]simplify:  Simplifying (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212285.401 * * [misc]simplify:  iters left: 6 (7 enodes)
1545212285.403 * * [misc]simplify:  iters left: 5 (9 enodes)
1545212285.406 * * [misc]simplify:  iters left: 4 (12 enodes)
1545212285.409 * [exit]simplify:  Simplified to (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212285.409 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))))))))
1545212285.410 * * * * [misc]progress:  [ 86 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))))))))>
1545212285.410 * [enter]simplify:  Simplifying (sqrt (/ (/ c0 h) w))
1545212285.410 * * [misc]simplify:  iters left: 5 (6 enodes)
1545212285.412 * * [misc]simplify:  iters left: 4 (8 enodes)
1545212285.414 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212285.417 * [exit]simplify:  Simplified to (sqrt (/ (/ c0 h) w))
1545212285.417 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))))))))
1545212285.417 * * * * [misc]progress:  [ 87 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))>
1545212285.417 * * * * [misc]progress:  [ 88 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))))))))>
1545212285.417 * [enter]simplify:  Simplifying (/ c0 h)
1545212285.417 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212285.418 * [exit]simplify:  Simplified to (/ c0 h)
1545212285.418 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))))))))
1545212285.418 * * * * [misc]progress:  [ 89 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d d)) (* D D)))))))>
1545212285.419 * [enter]simplify:  Simplifying (* D D)
1545212285.419 * * [misc]simplify:  iters left: 2 (2 enodes)
1545212285.419 * [exit]simplify:  Simplified to (* D D)
1545212285.420 * [misc]simplify:  Simplified (2 2 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d d)) (* D D)))))))
1545212285.420 * * * * [misc]progress:  [ 90 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))>
1545212285.420 * * * * [misc]progress:  [ 91 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))))>
1545212285.420 * * * * [misc]progress:  [ 92 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ c0 h) (* (/ d D) (/ d D))) w))))))>
1545212285.420 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) (/ d D)))
1545212285.420 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212285.423 * * [misc]simplify:  iters left: 5 (17 enodes)
1545212285.429 * * [misc]simplify:  iters left: 4 (46 enodes)
1545212285.446 * * [misc]simplify:  iters left: 3 (102 enodes)
1545212285.485 * * [misc]simplify:  iters left: 2 (213 enodes)
1545212285.577 * * [misc]simplify:  iters left: 1 (420 enodes)
1545212285.864 * [exit]simplify:  Simplified to (* (* (/ c0 h) (/ d D)) (/ d D))
1545212285.864 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (* (/ c0 h) (/ d D)) (/ d D)) w))))))
1545212285.864 * * * * [misc]progress:  [ 93 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))>
1545212285.864 * * * * [misc]progress:  [ 94 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212285.864 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212285.864 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212285.867 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212285.873 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212285.886 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212285.941 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212285.941 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212285.941 * * * * [misc]progress:  [ 95 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212285.941 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212285.941 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212285.943 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212285.950 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212285.976 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212286.051 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212286.051 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212286.051 * * * * [misc]progress:  [ 96 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212286.052 * * * * [misc]progress:  [ 97 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212286.052 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))
1545212286.052 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212286.056 * * [misc]simplify:  iters left: 5 (23 enodes)
1545212286.063 * * [misc]simplify:  iters left: 4 (49 enodes)
1545212286.081 * * [misc]simplify:  iters left: 3 (125 enodes)
1545212286.133 * * [misc]simplify:  iters left: 2 (471 enodes)
1545212286.664 * [exit]simplify:  Simplified to (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))
1545212286.664 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212286.665 * * * * [misc]progress:  [ 98 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212286.665 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))
1545212286.665 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212286.669 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212286.677 * * [misc]simplify:  iters left: 4 (53 enodes)
1545212286.695 * * [misc]simplify:  iters left: 3 (114 enodes)
1545212286.744 * * [misc]simplify:  iters left: 2 (347 enodes)
1545212286.972 * [exit]simplify:  Simplified to (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))
1545212286.972 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212286.972 * * * * [misc]progress:  [ 99 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (log (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212286.973 * * * * [misc]progress:  [ 100 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (log (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212286.973 * * * * [misc]progress:  [ 101 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212286.973 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))
1545212286.973 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212286.976 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212286.985 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212287.071 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212287.071 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.071 * * * * [misc]progress:  [ 102 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.072 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))
1545212287.072 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212287.074 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212287.084 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212287.173 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212287.173 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.173 * * * * [misc]progress:  [ 103 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.173 * * * * [misc]progress:  [ 104 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.173 * * * * [misc]progress:  [ 105 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.173 * * * * [misc]progress:  [ 106 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d d)) (* w (* D D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.173 * [enter]simplify:  Simplifying (* (/ c0 h) (* d d))
1545212287.173 * * [misc]simplify:  iters left: 4 (6 enodes)
1545212287.174 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212287.177 * * [misc]simplify:  iters left: 2 (20 enodes)
1545212287.187 * * [misc]simplify:  iters left: 1 (28 enodes)
1545212287.194 * [exit]simplify:  Simplified to (/ (* d d) (/ h c0))
1545212287.195 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (/ (* d d) (/ h c0)) (* w (* D D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.195 * [enter]simplify:  Simplifying (* w (* D D))
1545212287.195 * * [misc]simplify:  iters left: 4 (4 enodes)
1545212287.196 * * [misc]simplify:  iters left: 3 (7 enodes)
1545212287.199 * * [misc]simplify:  iters left: 2 (9 enodes)
1545212287.201 * [exit]simplify:  Simplified to (* w (* D D))
1545212287.201 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d d)) (* w (* D D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.201 * * * * [misc]progress:  [ 107 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) d)) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.202 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) d))
1545212287.202 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212287.204 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212287.210 * * [misc]simplify:  iters left: 4 (40 enodes)
1545212287.218 * * [misc]simplify:  iters left: 3 (79 enodes)
1545212287.230 * * [misc]simplify:  iters left: 2 (132 enodes)
1545212287.260 * * [misc]simplify:  iters left: 1 (191 enodes)
1545212287.347 * [exit]simplify:  Simplified to (* (* d (/ d h)) (/ c0 D))
1545212287.348 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (* d (/ d h)) (/ c0 D)) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.348 * [enter]simplify:  Simplifying (* w D)
1545212287.348 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212287.349 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212287.350 * [exit]simplify:  Simplified to (* w D)
1545212287.350 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) d)) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.350 * * * * [misc]progress:  [ 108 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d (/ d D))) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.351 * [enter]simplify:  Simplifying (* (/ c0 h) (* d (/ d D)))
1545212287.351 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212287.354 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212287.359 * * [misc]simplify:  iters left: 4 (41 enodes)
1545212287.374 * * [misc]simplify:  iters left: 3 (75 enodes)
1545212287.397 * * [misc]simplify:  iters left: 2 (125 enodes)
1545212287.437 * * [misc]simplify:  iters left: 1 (181 enodes)
1545212287.485 * [exit]simplify:  Simplified to (* (/ d D) (* c0 (/ d h)))
1545212287.486 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ d D) (* c0 (/ d h))) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.486 * [enter]simplify:  Simplifying (* w D)
1545212287.486 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212287.486 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212287.487 * [exit]simplify:  Simplified to (* w D)
1545212287.487 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d (/ d D))) (* w D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.487 * * * * [misc]progress:  [ 109 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.487 * * * * [misc]progress:  [ 110 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.487 * [enter]simplify:  Simplifying (/ d D)
1545212287.487 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212287.488 * [exit]simplify:  Simplified to (/ d D)
1545212287.488 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.488 * * * * [misc]progress:  [ 111 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.488 * [enter]simplify:  Simplifying (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212287.488 * * [misc]simplify:  iters left: 6 (7 enodes)
1545212287.489 * * [misc]simplify:  iters left: 5 (9 enodes)
1545212287.491 * * [misc]simplify:  iters left: 4 (12 enodes)
1545212287.492 * [exit]simplify:  Simplified to (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212287.492 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.492 * * * * [misc]progress:  [ 112 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.493 * [enter]simplify:  Simplifying (sqrt (/ (/ c0 h) w))
1545212287.493 * * [misc]simplify:  iters left: 5 (6 enodes)
1545212287.494 * * [misc]simplify:  iters left: 4 (8 enodes)
1545212287.495 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212287.497 * [exit]simplify:  Simplified to (sqrt (/ (/ c0 h) w))
1545212287.497 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.497 * * * * [misc]progress:  [ 113 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.497 * * * * [misc]progress:  [ 114 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.497 * [enter]simplify:  Simplifying (/ c0 h)
1545212287.498 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212287.498 * [exit]simplify:  Simplified to (/ c0 h)
1545212287.498 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.498 * * * * [misc]progress:  [ 115 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d d)) (* D D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.498 * [enter]simplify:  Simplifying (* D D)
1545212287.498 * * [misc]simplify:  iters left: 2 (2 enodes)
1545212287.499 * [exit]simplify:  Simplified to (* D D)
1545212287.499 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d d)) (* D D)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.499 * * * * [misc]progress:  [ 116 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.499 * * * * [misc]progress:  [ 117 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d (/ d D))) D) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.499 * * * * [misc]progress:  [ 118 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) (/ d D))) w) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.499 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) (/ d D)))
1545212287.499 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212287.500 * * [misc]simplify:  iters left: 5 (17 enodes)
1545212287.504 * * [misc]simplify:  iters left: 4 (46 enodes)
1545212287.520 * * [misc]simplify:  iters left: 3 (102 enodes)
1545212287.559 * * [misc]simplify:  iters left: 2 (213 enodes)
1545212287.646 * * [misc]simplify:  iters left: 1 (420 enodes)
1545212287.866 * [exit]simplify:  Simplified to (* (* (/ c0 h) (/ d D)) (/ d D))
1545212287.866 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (* (/ c0 h) (/ d D)) (/ d D)) w) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.866 * * * * [misc]progress:  [ 119 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.866 * * * * [misc]progress:  [ 120 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.866 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212287.866 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212287.868 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212287.872 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212287.885 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212287.955 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212287.955 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212287.955 * * * * [misc]progress:  [ 121 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212287.955 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212287.955 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212287.957 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212287.961 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212287.981 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212288.079 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212288.080 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212288.080 * * * * [misc]progress:  [ 122 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212288.080 * * * * [misc]progress:  [ 123 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (exp (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212288.080 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))
1545212288.080 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212288.082 * * [misc]simplify:  iters left: 5 (23 enodes)
1545212288.086 * * [misc]simplify:  iters left: 4 (49 enodes)
1545212288.095 * * [misc]simplify:  iters left: 3 (125 enodes)
1545212288.158 * * [misc]simplify:  iters left: 2 (471 enodes)
1545212288.597 * [exit]simplify:  Simplified to (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))
1545212288.598 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (exp (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212288.598 * * * * [misc]progress:  [ 124 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (exp (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212288.598 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))
1545212288.598 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212288.601 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212288.608 * * [misc]simplify:  iters left: 4 (53 enodes)
1545212288.625 * * [misc]simplify:  iters left: 3 (114 enodes)
1545212288.675 * * [misc]simplify:  iters left: 2 (347 enodes)
1545212288.947 * [exit]simplify:  Simplified to (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))
1545212288.947 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (exp (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212288.947 * * * * [misc]progress:  [ 125 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (exp (log (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212288.947 * * * * [misc]progress:  [ 126 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (log (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212288.947 * * * * [misc]progress:  [ 127 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212288.947 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))
1545212288.948 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212288.950 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212288.959 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212289.047 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212289.048 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.048 * * * * [misc]progress:  [ 128 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.048 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))
1545212289.048 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212289.051 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212289.062 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212289.201 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212289.201 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.201 * * * * [misc]progress:  [ 129 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (* (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.202 * * * * [misc]progress:  [ 130 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (cbrt (* (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.202 * * * * [misc]progress:  [ 131 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.202 * * * * [misc]progress:  [ 132 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d d)) (* w (* D D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.202 * [enter]simplify:  Simplifying (* (/ c0 h) (* d d))
1545212289.202 * * [misc]simplify:  iters left: 4 (6 enodes)
1545212289.203 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212289.205 * * [misc]simplify:  iters left: 2 (20 enodes)
1545212289.208 * * [misc]simplify:  iters left: 1 (28 enodes)
1545212289.211 * [exit]simplify:  Simplified to (/ (* d d) (/ h c0))
1545212289.211 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (/ (* d d) (/ h c0)) (* w (* D D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.212 * [enter]simplify:  Simplifying (* w (* D D))
1545212289.212 * * [misc]simplify:  iters left: 4 (4 enodes)
1545212289.212 * * [misc]simplify:  iters left: 3 (7 enodes)
1545212289.213 * * [misc]simplify:  iters left: 2 (9 enodes)
1545212289.215 * [exit]simplify:  Simplified to (* w (* D D))
1545212289.215 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d d)) (* w (* D D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.215 * * * * [misc]progress:  [ 133 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ c0 h) (* (/ d D) d)) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.215 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) d))
1545212289.215 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212289.219 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212289.222 * * [misc]simplify:  iters left: 4 (40 enodes)
1545212289.231 * * [misc]simplify:  iters left: 3 (79 enodes)
1545212289.246 * * [misc]simplify:  iters left: 2 (132 enodes)
1545212289.269 * * [misc]simplify:  iters left: 1 (191 enodes)
1545212289.346 * [exit]simplify:  Simplified to (* (* d (/ d h)) (/ c0 D))
1545212289.346 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (* d (/ d h)) (/ c0 D)) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.346 * [enter]simplify:  Simplifying (* w D)
1545212289.346 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212289.347 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212289.349 * [exit]simplify:  Simplified to (* w D)
1545212289.349 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ c0 h) (* (/ d D) d)) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.349 * * * * [misc]progress:  [ 134 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d (/ d D))) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.349 * [enter]simplify:  Simplifying (* (/ c0 h) (* d (/ d D)))
1545212289.349 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212289.351 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212289.354 * * [misc]simplify:  iters left: 4 (41 enodes)
1545212289.362 * * [misc]simplify:  iters left: 3 (75 enodes)
1545212289.373 * * [misc]simplify:  iters left: 2 (125 enodes)
1545212289.398 * * [misc]simplify:  iters left: 1 (181 enodes)
1545212289.441 * [exit]simplify:  Simplified to (* (/ d D) (* c0 (/ d h)))
1545212289.441 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ d D) (* c0 (/ d h))) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.442 * [enter]simplify:  Simplifying (* w D)
1545212289.442 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212289.443 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212289.444 * [exit]simplify:  Simplified to (* w D)
1545212289.444 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d (/ d D))) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.444 * * * * [misc]progress:  [ 135 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.444 * * * * [misc]progress:  [ 136 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.444 * [enter]simplify:  Simplifying (/ d D)
1545212289.444 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212289.445 * [exit]simplify:  Simplified to (/ d D)
1545212289.445 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.445 * * * * [misc]progress:  [ 137 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.445 * [enter]simplify:  Simplifying (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212289.446 * * [misc]simplify:  iters left: 6 (7 enodes)
1545212289.448 * * [misc]simplify:  iters left: 5 (9 enodes)
1545212289.450 * * [misc]simplify:  iters left: 4 (12 enodes)
1545212289.454 * [exit]simplify:  Simplified to (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212289.454 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.454 * * * * [misc]progress:  [ 138 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.454 * [enter]simplify:  Simplifying (sqrt (/ (/ c0 h) w))
1545212289.454 * * [misc]simplify:  iters left: 5 (6 enodes)
1545212289.456 * * [misc]simplify:  iters left: 4 (8 enodes)
1545212289.458 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212289.461 * [exit]simplify:  Simplified to (sqrt (/ (/ c0 h) w))
1545212289.461 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.461 * * * * [misc]progress:  [ 139 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.461 * * * * [misc]progress:  [ 140 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.462 * [enter]simplify:  Simplifying (/ c0 h)
1545212289.462 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212289.463 * [exit]simplify:  Simplified to (/ c0 h)
1545212289.463 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.463 * * * * [misc]progress:  [ 141 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d d)) (* D D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.463 * [enter]simplify:  Simplifying (* D D)
1545212289.463 * * [misc]simplify:  iters left: 2 (2 enodes)
1545212289.464 * [exit]simplify:  Simplified to (* D D)
1545212289.464 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d d)) (* D D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.464 * * * * [misc]progress:  [ 142 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.464 * * * * [misc]progress:  [ 143 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.464 * * * * [misc]progress:  [ 144 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (/ c0 h) (* (/ d D) (/ d D))) w)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.465 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) (/ d D)))
1545212289.465 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212289.468 * * [misc]simplify:  iters left: 5 (17 enodes)
1545212289.474 * * [misc]simplify:  iters left: 4 (46 enodes)
1545212289.493 * * [misc]simplify:  iters left: 3 (102 enodes)
1545212289.529 * * [misc]simplify:  iters left: 2 (213 enodes)
1545212289.603 * * [misc]simplify:  iters left: 1 (420 enodes)
1545212289.902 * [exit]simplify:  Simplified to (* (* (/ c0 h) (/ d D)) (/ d D))
1545212289.902 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* (* (/ c0 h) (/ d D)) (/ d D)) w)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212289.902 * * * * [misc]progress:  [ 145 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212289.902 * * * * [misc]progress:  [ 146 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))))>
1545212289.902 * [enter]simplify:  Simplifying (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212289.903 * * [misc]simplify:  iters left: 6 (13 enodes)
1545212289.905 * * [misc]simplify:  iters left: 5 (30 enodes)
1545212289.911 * * [misc]simplify:  iters left: 4 (134 enodes)
1545212290.025 * [exit]simplify:  Simplified to (* (/ (* 2 c0) (* w h)) (* (/ d D) (/ d D)))
1545212290.026 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (* (/ (* 2 c0) (* w h)) (* (/ d D) (/ d D)))))))
1545212290.026 * * * * [misc]progress:  [ 147 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (* (sqrt -1) M)))))>
1545212290.026 * [enter]simplify:  Simplifying (* (sqrt -1) M)
1545212290.026 * * [misc]simplify:  iters left: 3 (4 enodes)
1545212290.028 * * [misc]simplify:  iters left: 2 (5 enodes)
1545212290.029 * [exit]simplify:  Simplified to (* M (sqrt -1))
1545212290.029 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (* M (sqrt -1))))))
1545212290.029 * * * * [misc]progress:  [ 148 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (* -1 (* (sqrt -1) M))))))>
1545212290.029 * [enter]simplify:  Simplifying (* -1 (* (sqrt -1) M))
1545212290.029 * * [misc]simplify:  iters left: 5 (5 enodes)
1545212290.030 * * [misc]simplify:  iters left: 4 (10 enodes)
1545212290.033 * * [misc]simplify:  iters left: 3 (21 enodes)
1545212290.036 * * [misc]simplify:  iters left: 2 (22 enodes)
1545212290.039 * [exit]simplify:  Simplified to (* (- M) (sqrt -1))
1545212290.039 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (* (- M) (sqrt -1))))))
1545212290.039 * * * * [misc]progress:  [ 149 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))))>
1545212290.039 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212290.039 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212290.041 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212290.046 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212290.082 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212290.490 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212290.490 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212290.490 * * * * [misc]progress:  [ 150 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))))>
1545212290.490 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212290.490 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212290.494 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212290.508 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212290.538 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212290.956 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212290.956 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212290.956 * * * * [misc]progress:  [ 151 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))))>
1545212290.957 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212290.957 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212290.961 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212290.971 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212291.032 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212291.385 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212291.385 * [misc]simplify:  Simplified (2 2 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212291.385 * * * * [misc]progress:  [ 152 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212291.385 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212291.385 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212291.387 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212291.393 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212291.431 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212291.820 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212291.820 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212291.820 * * * * [misc]progress:  [ 153 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212291.820 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212291.820 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212291.823 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212291.828 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212291.868 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212292.228 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212292.228 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212292.228 * * * * [misc]progress:  [ 154 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212292.229 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212292.229 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212292.233 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212292.243 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212292.292 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212292.698 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212292.698 * [misc]simplify:  Simplified (2 2 1 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212292.698 * * * * [misc]progress:  [ 155 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212292.698 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212292.698 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212292.700 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212292.705 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212292.764 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212293.204 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212293.204 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212293.204 * * * * [misc]progress:  [ 156 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212293.205 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212293.205 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212293.209 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212293.217 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212293.255 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212293.634 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212293.634 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212293.634 * * * * [misc]progress:  [ 157 / 157 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))>
1545212293.636 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212293.636 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212293.639 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212293.644 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212293.676 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212294.515 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212294.515 * [misc]simplify:  Simplified (2 2 1 1 1 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212294.515 * * * [misc]progress:  adding candidates to table
1545212298.255 * * [misc]progress:  iteration 3 / 4
1545212298.255 * * * [misc]progress:  picking best candidate
1545212298.373 * * * * [misc]pick:  Picked  #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212298.373 * * * [misc]progress:  localizing error
1545212298.399 * * * [misc]progress:  generating rewritten candidates
1545212298.399 * * * * [misc]progress:  [ 1 / 4 ] rewriting at (2 2)
1545212298.489 * * * * [misc]progress:  [ 2 / 4 ] rewriting at (2 2 1 1 2 1)
1545212298.501 * * * * [misc]progress:  [ 3 / 4 ] rewriting at (2 2 1 1 1 2)
1545212298.513 * * * * [misc]progress:  [ 4 / 4 ] rewriting at (2 2 1)
1545212298.566 * * * [misc]progress:  generating series expansions
1545212298.566 * * * * [misc]progress:  [ 1 / 4 ] generating series at (2 2)
1545212298.567 * [misc]backup-simplify:  Simplify (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) into (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212298.568 * [misc]approximate:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in (M c0 h w d D) around 0
1545212298.568 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of M in D
1545212298.568 * [misc]backup-simplify:  Simplify M into M
1545212298.568 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212298.568 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.568 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of d in D
1545212298.568 * [misc]backup-simplify:  Simplify d into d
1545212298.568 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of w in D
1545212298.568 * [misc]backup-simplify:  Simplify w into w
1545212298.568 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.568 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.568 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.568 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.568 * [misc]taylor:  Taking taylor expansion of h in D
1545212298.568 * [misc]backup-simplify:  Simplify h into h
1545212298.568 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.569 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.569 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.569 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212298.569 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212298.569 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212298.569 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in D
1545212298.569 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212298.569 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212298.569 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212298.569 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.569 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212298.569 * [misc]taylor:  Taking taylor expansion of d in D
1545212298.569 * [misc]backup-simplify:  Simplify d into d
1545212298.569 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212298.569 * [misc]taylor:  Taking taylor expansion of w in D
1545212298.569 * [misc]backup-simplify:  Simplify w into w
1545212298.569 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212298.570 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.570 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.570 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.570 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.570 * [misc]taylor:  Taking taylor expansion of h in D
1545212298.570 * [misc]backup-simplify:  Simplify h into h
1545212298.570 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.570 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.570 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.570 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212298.570 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212298.570 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212298.570 * [misc]taylor:  Taking taylor expansion of M in D
1545212298.570 * [misc]backup-simplify:  Simplify M into M
1545212298.571 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w h))) into (/ (* c0 (pow d 2)) (* w h))
1545212298.571 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w h)) 0) into (/ (* c0 (pow d 2)) (* w h))
1545212298.571 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* w h)) (/ (* c0 (pow d 2)) (* w h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))
1545212298.571 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) into (/ (* c0 (pow d 2)) (* w h))
1545212298.572 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.572 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.572 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.572 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212298.572 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212298.573 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212298.573 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.573 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.573 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.573 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.573 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212298.574 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212298.574 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212298.574 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.577 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* w h)) 0) (* 0 (/ (* c0 (pow d 2)) (* w h)))) into 0
1545212298.577 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))))) into 0
1545212298.577 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in D
1545212298.577 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212298.577 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212298.577 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.577 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212298.578 * [misc]taylor:  Taking taylor expansion of d in D
1545212298.578 * [misc]backup-simplify:  Simplify d into d
1545212298.578 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in D
1545212298.578 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.578 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.578 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.578 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.578 * [misc]taylor:  Taking taylor expansion of (* w h) in D
1545212298.578 * [misc]taylor:  Taking taylor expansion of w in D
1545212298.578 * [misc]backup-simplify:  Simplify w into w
1545212298.578 * [misc]taylor:  Taking taylor expansion of h in D
1545212298.578 * [misc]backup-simplify:  Simplify h into h
1545212298.578 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.578 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.578 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.578 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212298.578 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212298.579 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212298.579 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of M in d
1545212298.579 * [misc]backup-simplify:  Simplify M into M
1545212298.579 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212298.579 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.579 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.579 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.579 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.579 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of w in d
1545212298.579 * [misc]backup-simplify:  Simplify w into w
1545212298.579 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.579 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.579 * [misc]backup-simplify:  Simplify D into D
1545212298.579 * [misc]taylor:  Taking taylor expansion of h in d
1545212298.579 * [misc]backup-simplify:  Simplify h into h
1545212298.580 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.580 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212298.580 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.580 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.580 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212298.580 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212298.580 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in d
1545212298.580 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212298.580 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212298.580 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212298.580 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.580 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.580 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.580 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.580 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.580 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212298.581 * [misc]taylor:  Taking taylor expansion of w in d
1545212298.581 * [misc]backup-simplify:  Simplify w into w
1545212298.581 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212298.581 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.581 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.581 * [misc]backup-simplify:  Simplify D into D
1545212298.581 * [misc]taylor:  Taking taylor expansion of h in d
1545212298.581 * [misc]backup-simplify:  Simplify h into h
1545212298.581 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.581 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212298.581 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.581 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.581 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212298.581 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212298.581 * [misc]taylor:  Taking taylor expansion of M in d
1545212298.582 * [misc]backup-simplify:  Simplify M into M
1545212298.582 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212298.582 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212298.582 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212298.582 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212298.582 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212298.582 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.582 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.582 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.583 * [misc]backup-simplify:  Simplify (+ (* M 0) (* 0 (- M))) into 0
1545212298.583 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212298.583 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in d
1545212298.583 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212298.583 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212298.583 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.583 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.583 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.583 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.583 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in d
1545212298.583 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.583 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.583 * [misc]backup-simplify:  Simplify D into D
1545212298.583 * [misc]taylor:  Taking taylor expansion of (* w h) in d
1545212298.583 * [misc]taylor:  Taking taylor expansion of w in d
1545212298.583 * [misc]backup-simplify:  Simplify w into w
1545212298.583 * [misc]taylor:  Taking taylor expansion of h in d
1545212298.583 * [misc]backup-simplify:  Simplify h into h
1545212298.583 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.583 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212298.584 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.584 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212298.584 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.584 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212298.584 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in w
1545212298.584 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in w
1545212298.584 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in w
1545212298.584 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in w
1545212298.584 * [misc]taylor:  Taking taylor expansion of M in w
1545212298.584 * [misc]backup-simplify:  Simplify M into M
1545212298.584 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212298.584 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212298.584 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212298.584 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.584 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.584 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.584 * [misc]backup-simplify:  Simplify d into d
1545212298.584 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212298.584 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.584 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.585 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212298.585 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.585 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.585 * [misc]backup-simplify:  Simplify D into D
1545212298.585 * [misc]taylor:  Taking taylor expansion of h in w
1545212298.585 * [misc]backup-simplify:  Simplify h into h
1545212298.585 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.585 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.585 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.585 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.585 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212298.585 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.585 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212298.586 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212298.586 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212298.586 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in w
1545212298.586 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212298.586 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212298.586 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212298.586 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.586 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.586 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.586 * [misc]backup-simplify:  Simplify d into d
1545212298.586 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212298.586 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.586 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.586 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212298.586 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.586 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.586 * [misc]backup-simplify:  Simplify D into D
1545212298.586 * [misc]taylor:  Taking taylor expansion of h in w
1545212298.586 * [misc]backup-simplify:  Simplify h into h
1545212298.587 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.587 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.587 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.587 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.587 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212298.587 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.587 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212298.587 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212298.588 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212298.588 * [misc]taylor:  Taking taylor expansion of M in w
1545212298.588 * [misc]backup-simplify:  Simplify M into M
1545212298.588 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212298.588 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) h)) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212298.589 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))
1545212298.589 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212298.589 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.589 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.590 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.590 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.590 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212298.591 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212298.591 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212298.591 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212298.591 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.591 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.591 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.592 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.592 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212298.592 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212298.592 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212298.593 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) h)))) into 0
1545212298.594 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))))) into 0
1545212298.594 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in w
1545212298.594 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212298.594 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212298.594 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.594 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.594 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.594 * [misc]backup-simplify:  Simplify d into d
1545212298.594 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in w
1545212298.594 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.594 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.594 * [misc]backup-simplify:  Simplify D into D
1545212298.594 * [misc]taylor:  Taking taylor expansion of (* w h) in w
1545212298.594 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.594 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.594 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.594 * [misc]taylor:  Taking taylor expansion of h in w
1545212298.594 * [misc]backup-simplify:  Simplify h into h
1545212298.594 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.594 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.594 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.594 * [misc]backup-simplify:  Simplify (* 0 h) into 0
1545212298.594 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.595 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 h)) into h
1545212298.595 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.595 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212298.595 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212298.595 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of M in h
1545212298.596 * [misc]backup-simplify:  Simplify M into M
1545212298.596 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212298.596 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.596 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.596 * [misc]backup-simplify:  Simplify d into d
1545212298.596 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.596 * [misc]backup-simplify:  Simplify w into w
1545212298.596 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.596 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.596 * [misc]backup-simplify:  Simplify D into D
1545212298.596 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.596 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.596 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.596 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.596 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.596 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.596 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.597 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212298.597 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.597 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212298.597 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212298.597 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212298.597 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in h
1545212298.598 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212298.598 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212298.598 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212298.598 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.598 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.598 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.598 * [misc]backup-simplify:  Simplify d into d
1545212298.598 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212298.598 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.598 * [misc]backup-simplify:  Simplify w into w
1545212298.598 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212298.598 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.598 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.598 * [misc]backup-simplify:  Simplify D into D
1545212298.598 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.598 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.598 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.598 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.598 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.598 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.598 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.598 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212298.598 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.599 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212298.599 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212298.599 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212298.599 * [misc]taylor:  Taking taylor expansion of M in h
1545212298.599 * [misc]backup-simplify:  Simplify M into M
1545212298.600 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (pow D 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212298.600 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (pow D 2))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212298.600 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (/ (* c0 (pow d 2)) (* (pow D 2) w))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))
1545212298.601 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212298.601 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.601 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.601 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.601 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212298.602 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212298.602 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212298.602 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212298.602 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212298.602 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.603 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.603 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.603 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212298.603 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212298.604 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212298.604 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212298.605 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) w)))) into (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w)))
1545212298.606 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))))) into 0
1545212298.606 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in h
1545212298.606 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212298.606 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212298.606 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.606 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.606 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.606 * [misc]backup-simplify:  Simplify d into d
1545212298.606 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in h
1545212298.606 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.606 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.606 * [misc]backup-simplify:  Simplify D into D
1545212298.606 * [misc]taylor:  Taking taylor expansion of (* w h) in h
1545212298.606 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.606 * [misc]backup-simplify:  Simplify w into w
1545212298.606 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.606 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.606 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.606 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.606 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.606 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.606 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212298.607 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.607 * [misc]backup-simplify:  Simplify (+ (* w 1) (* 0 0)) into w
1545212298.607 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.607 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212298.608 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212298.608 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of M in c0
1545212298.608 * [misc]backup-simplify:  Simplify M into M
1545212298.608 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.608 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.608 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.608 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.608 * [misc]backup-simplify:  Simplify d into d
1545212298.608 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.608 * [misc]backup-simplify:  Simplify w into w
1545212298.608 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.608 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.608 * [misc]backup-simplify:  Simplify D into D
1545212298.608 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.608 * [misc]backup-simplify:  Simplify h into h
1545212298.608 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.609 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212298.609 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.609 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212298.609 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.609 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.609 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212298.609 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212298.609 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in c0
1545212298.610 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212298.610 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212298.610 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.610 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.610 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.610 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.610 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.610 * [misc]backup-simplify:  Simplify d into d
1545212298.610 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212298.610 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.610 * [misc]backup-simplify:  Simplify w into w
1545212298.610 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212298.610 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.610 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.610 * [misc]backup-simplify:  Simplify D into D
1545212298.610 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.610 * [misc]backup-simplify:  Simplify h into h
1545212298.610 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.610 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212298.610 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.611 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212298.611 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.611 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.611 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212298.611 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212298.611 * [misc]taylor:  Taking taylor expansion of M in c0
1545212298.611 * [misc]backup-simplify:  Simplify M into M
1545212298.611 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212298.611 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212298.611 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212298.611 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212298.611 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212298.612 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.612 * [misc]backup-simplify:  Simplify (+ (/ (pow d 2) (* w (* (pow D 2) h))) 0) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212298.612 * [misc]backup-simplify:  Simplify (+ 0 (/ (pow d 2) (* w (* (pow D 2) h)))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212298.613 * [misc]backup-simplify:  Simplify (+ (* M (/ (pow d 2) (* w (* (pow D 2) h)))) (* (/ (pow d 2) (* w (* (pow D 2) h))) (- M))) into 0
1545212298.613 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212298.613 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in c0
1545212298.613 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212298.613 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.613 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.613 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.613 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.613 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.613 * [misc]backup-simplify:  Simplify d into d
1545212298.613 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in c0
1545212298.613 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.613 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.613 * [misc]backup-simplify:  Simplify D into D
1545212298.613 * [misc]taylor:  Taking taylor expansion of (* w h) in c0
1545212298.613 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.613 * [misc]backup-simplify:  Simplify w into w
1545212298.613 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.613 * [misc]backup-simplify:  Simplify h into h
1545212298.614 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.614 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212298.614 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.614 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212298.614 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.614 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212298.614 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.614 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212298.615 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.615 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.615 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.615 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.615 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.615 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.615 * [misc]backup-simplify:  Simplify d into d
1545212298.615 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.615 * [misc]backup-simplify:  Simplify w into w
1545212298.615 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.615 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.616 * [misc]backup-simplify:  Simplify D into D
1545212298.616 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.616 * [misc]backup-simplify:  Simplify h into h
1545212298.616 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.616 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.616 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.616 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.616 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212298.616 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212298.616 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212298.616 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212298.616 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.616 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.616 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.616 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.617 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.617 * [misc]backup-simplify:  Simplify d into d
1545212298.617 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212298.617 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.617 * [misc]backup-simplify:  Simplify w into w
1545212298.617 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212298.617 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.617 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.617 * [misc]backup-simplify:  Simplify D into D
1545212298.617 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.617 * [misc]backup-simplify:  Simplify h into h
1545212298.617 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.617 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.617 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.617 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.617 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212298.617 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212298.618 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.618 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.618 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.618 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212298.618 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.619 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212298.619 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212298.619 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212298.620 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.620 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.620 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.620 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212298.620 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212298.621 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.621 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212298.621 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212298.621 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.621 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.621 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.621 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212298.622 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212298.622 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.622 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212298.623 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212298.624 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212298.624 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in M
1545212298.624 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.624 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.624 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.624 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.624 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.624 * [misc]backup-simplify:  Simplify d into d
1545212298.624 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in M
1545212298.624 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.624 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.624 * [misc]backup-simplify:  Simplify D into D
1545212298.624 * [misc]taylor:  Taking taylor expansion of (* w h) in M
1545212298.624 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.624 * [misc]backup-simplify:  Simplify w into w
1545212298.624 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.624 * [misc]backup-simplify:  Simplify h into h
1545212298.624 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.625 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.625 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.625 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212298.625 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.625 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212298.625 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in M
1545212298.625 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212298.625 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212298.625 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212298.625 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.625 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.625 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.625 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212298.625 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.625 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.625 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.625 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.625 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.625 * [misc]backup-simplify:  Simplify d into d
1545212298.625 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212298.626 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.626 * [misc]backup-simplify:  Simplify w into w
1545212298.626 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212298.626 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.626 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.626 * [misc]backup-simplify:  Simplify D into D
1545212298.626 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.626 * [misc]backup-simplify:  Simplify h into h
1545212298.626 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.626 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.626 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.626 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.626 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212298.626 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212298.626 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212298.626 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212298.626 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.626 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.626 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.626 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.627 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.627 * [misc]backup-simplify:  Simplify d into d
1545212298.627 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212298.627 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.627 * [misc]backup-simplify:  Simplify w into w
1545212298.627 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212298.627 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.627 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.627 * [misc]backup-simplify:  Simplify D into D
1545212298.627 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.627 * [misc]backup-simplify:  Simplify h into h
1545212298.627 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.627 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.627 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.627 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212298.627 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212298.627 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212298.627 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.628 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.628 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.628 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212298.628 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.628 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212298.629 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212298.629 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212298.629 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.629 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.630 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.630 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212298.630 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212298.630 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.631 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212298.631 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212298.631 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.631 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.631 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.631 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212298.631 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212298.632 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.632 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212298.633 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212298.634 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212298.634 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in M
1545212298.634 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.634 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.634 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.634 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.634 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.634 * [misc]backup-simplify:  Simplify d into d
1545212298.634 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in M
1545212298.634 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.634 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.634 * [misc]backup-simplify:  Simplify D into D
1545212298.634 * [misc]taylor:  Taking taylor expansion of (* w h) in M
1545212298.634 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.634 * [misc]backup-simplify:  Simplify w into w
1545212298.634 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.634 * [misc]backup-simplify:  Simplify h into h
1545212298.634 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.634 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.634 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.634 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212298.634 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.635 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212298.635 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212298.635 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in c0
1545212298.635 * [misc]taylor:  Taking taylor expansion of 2 in c0
1545212298.635 * [misc]backup-simplify:  Simplify 2 into 2
1545212298.635 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in c0
1545212298.635 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212298.635 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.636 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.636 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.636 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.636 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.636 * [misc]backup-simplify:  Simplify d into d
1545212298.636 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in c0
1545212298.636 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.636 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.636 * [misc]backup-simplify:  Simplify D into D
1545212298.636 * [misc]taylor:  Taking taylor expansion of (* w h) in c0
1545212298.636 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.636 * [misc]backup-simplify:  Simplify w into w
1545212298.636 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.636 * [misc]backup-simplify:  Simplify h into h
1545212298.636 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.636 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212298.636 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.636 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212298.637 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.637 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212298.637 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.637 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212298.637 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.637 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.637 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212298.637 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.637 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.638 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.638 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.638 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212298.638 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.638 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.638 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.639 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (* w (* (pow D 2) h)))) into (* 2 (/ (pow d 2) (* w (* (pow D 2) h))))
1545212298.639 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (* w (* (pow D 2) h)))) in h
1545212298.639 * [misc]taylor:  Taking taylor expansion of 2 in h
1545212298.639 * [misc]backup-simplify:  Simplify 2 into 2
1545212298.639 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212298.639 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.639 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.639 * [misc]backup-simplify:  Simplify d into d
1545212298.639 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212298.639 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.639 * [misc]backup-simplify:  Simplify w into w
1545212298.639 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212298.639 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.639 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.639 * [misc]backup-simplify:  Simplify D into D
1545212298.639 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.639 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.639 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.639 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.639 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.639 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.639 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212298.639 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.640 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212298.640 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212298.640 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212298.640 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (* w (pow D 2)))) into (* 2 (/ (pow d 2) (* w (pow D 2))))
1545212298.640 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (* w (pow D 2)))) in w
1545212298.640 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212298.640 * [misc]backup-simplify:  Simplify 2 into 2
1545212298.640 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212298.641 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.641 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.641 * [misc]backup-simplify:  Simplify d into d
1545212298.641 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212298.641 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.641 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.641 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.641 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.641 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.641 * [misc]backup-simplify:  Simplify D into D
1545212298.641 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.641 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.641 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212298.641 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.641 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212298.642 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212298.642 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (pow D 2))) into (* 2 (/ (pow d 2) (pow D 2)))
1545212298.642 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (pow D 2))) in d
1545212298.642 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212298.642 * [misc]backup-simplify:  Simplify 2 into 2
1545212298.642 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212298.642 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.642 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.642 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.642 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.642 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.642 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.642 * [misc]backup-simplify:  Simplify D into D
1545212298.642 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.642 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.642 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212298.643 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.643 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.643 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.643 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.644 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212298.644 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.644 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.645 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.645 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.645 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.645 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.646 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.646 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212298.647 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.647 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.647 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))) into (- 1)
1545212298.649 * [misc]backup-simplify:  Simplify (/ (- (- 1) (pow 0 2) (+)) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2))))
1545212298.649 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.649 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.650 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.650 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.650 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.651 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.651 * [misc]backup-simplify:  Simplify (+ (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 0) into (- (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))))
1545212298.651 * [misc]taylor:  Taking taylor expansion of (- (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) in c0
1545212298.651 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in c0
1545212298.651 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212298.652 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212298.652 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212298.652 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212298.652 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.652 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.652 * [misc]backup-simplify:  Simplify D into D
1545212298.652 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212298.652 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.652 * [misc]backup-simplify:  Simplify h into h
1545212298.652 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.652 * [misc]backup-simplify:  Simplify w into w
1545212298.652 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212298.652 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.652 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.652 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.652 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.652 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.652 * [misc]backup-simplify:  Simplify d into d
1545212298.652 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.652 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.652 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.652 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.652 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212298.653 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.653 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212298.653 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.653 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.653 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.653 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.654 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.654 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212298.654 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.655 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212298.655 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.655 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.655 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.655 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.656 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212298.656 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212298.656 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.656 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.657 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.657 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h))))) into 0
1545212298.657 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.657 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.657 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.657 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.658 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.658 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212298.658 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212298.659 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212298.659 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (* w (pow D 2))))) into 0
1545212298.659 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.659 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.659 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.659 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.660 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212298.660 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212298.660 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (pow D 2)))) into 0
1545212298.660 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.660 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.660 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.660 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.661 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.661 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.662 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.662 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212298.662 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212298.663 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.663 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.664 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.664 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.664 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.665 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.665 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212298.665 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212298.666 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.666 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.667 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))) into 0
1545212298.668 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))))))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212298.669 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.669 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.669 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212298.670 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.670 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212298.671 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.671 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.671 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212298.671 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.671 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.671 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.672 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.672 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.672 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.672 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.673 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.673 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212298.674 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212298.674 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.674 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.674 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.674 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.674 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.675 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.675 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.675 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.676 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.676 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.676 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.677 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h)))))) into 0
1545212298.677 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.677 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.677 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.677 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.677 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.677 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.678 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.678 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.678 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212298.679 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212298.679 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212298.680 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2)))))) into 0
1545212298.680 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.680 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.680 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.680 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.680 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.680 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.680 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.680 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.680 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.680 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.680 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.681 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.681 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212298.682 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212298.682 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2))))) into 0
1545212298.682 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.682 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.682 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.682 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.682 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.682 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.683 * [misc]backup-simplify:  Simplify (* 2 (/ 1 (pow D 2))) into (/ 2 (pow D 2))
1545212298.683 * [misc]taylor:  Taking taylor expansion of (/ 2 (pow D 2)) in D
1545212298.683 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212298.683 * [misc]backup-simplify:  Simplify 2 into 2
1545212298.683 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.683 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.683 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.683 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.683 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.683 * [misc]backup-simplify:  Simplify (/ 2 1) into 2
1545212298.683 * [misc]backup-simplify:  Simplify 2 into 2
1545212298.684 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212298.684 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212298.684 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212298.685 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212298.685 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212298.685 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.685 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.686 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.686 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212298.686 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212298.687 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212298.687 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212298.687 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212298.688 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.688 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.688 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))))) into 0
1545212298.689 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 2) (+ (* 2 (* 0 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))))
1545212298.689 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212298.690 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212298.690 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212298.690 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212298.691 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212298.691 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.691 * [misc]backup-simplify:  Simplify (+ (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))) 0) into (- (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))))
1545212298.691 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))))) in c0
1545212298.691 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212298.692 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212298.692 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of (* (pow D 6) (* (pow h 3) (pow w 3))) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of (pow D 6) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.692 * [misc]backup-simplify:  Simplify D into D
1545212298.692 * [misc]taylor:  Taking taylor expansion of (* (pow h 3) (pow w 3)) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of (pow h 3) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.692 * [misc]backup-simplify:  Simplify h into h
1545212298.692 * [misc]taylor:  Taking taylor expansion of (pow w 3) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.692 * [misc]backup-simplify:  Simplify w into w
1545212298.692 * [misc]taylor:  Taking taylor expansion of (* (pow c0 3) (pow d 6)) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of (pow c0 3) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.692 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.692 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.692 * [misc]taylor:  Taking taylor expansion of (pow d 6) in c0
1545212298.692 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.692 * [misc]backup-simplify:  Simplify d into d
1545212298.692 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.692 * [misc]backup-simplify:  Simplify (* D (pow D 2)) into (pow D 3)
1545212298.692 * [misc]backup-simplify:  Simplify (* (pow D 3) (pow D 3)) into (pow D 6)
1545212298.692 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212298.692 * [misc]backup-simplify:  Simplify (* h (pow h 2)) into (pow h 3)
1545212298.692 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212298.692 * [misc]backup-simplify:  Simplify (* w (pow w 2)) into (pow w 3)
1545212298.692 * [misc]backup-simplify:  Simplify (* (pow h 3) (pow w 3)) into (* (pow h 3) (pow w 3))
1545212298.692 * [misc]backup-simplify:  Simplify (* (pow D 6) (* (pow h 3) (pow w 3))) into (* (pow D 6) (* (pow h 3) (pow w 3)))
1545212298.692 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.693 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.693 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.693 * [misc]backup-simplify:  Simplify (* d (pow d 2)) into (pow d 3)
1545212298.693 * [misc]backup-simplify:  Simplify (* (pow d 3) (pow d 3)) into (pow d 6)
1545212298.693 * [misc]backup-simplify:  Simplify (* 1 (pow d 6)) into (pow d 6)
1545212298.693 * [misc]backup-simplify:  Simplify (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) into (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))
1545212298.693 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.693 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.693 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212298.694 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212298.694 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212298.694 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 (pow h 2))) into 0
1545212298.694 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212298.694 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.694 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212298.694 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (pow w 2))) into 0
1545212298.694 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212298.695 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212298.695 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3))))) into 0
1545212298.695 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.695 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 (pow D 2))) into 0
1545212298.695 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (* 0 (pow D 3))) into 0
1545212298.695 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (* 0 (pow w 3)))) into 0
1545212298.696 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.696 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212298.696 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (* 0 (pow D 3)))) into 0
1545212298.696 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (* 0 (pow w 3))) into 0
1545212298.696 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.696 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212298.697 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3))))) into 0
1545212298.697 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3)))))) into 0
1545212298.697 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.697 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.697 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.698 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.698 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 (pow d 2))) into 0
1545212298.698 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.698 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3))))) into 0
1545212298.698 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.698 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.699 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (* 0 (pow d 3)))) into 0
1545212298.699 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212298.699 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212298.699 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (* 0 (pow d 3))) into 0
1545212298.699 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212298.699 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212298.700 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6))))) into 0
1545212298.700 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (* 0 (* (pow h 3) (pow w 3)))) into 0
1545212298.700 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow d 6))) into 0
1545212298.700 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))))) into 0
1545212298.701 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 6)))) into 0
1545212298.701 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))) into 0
1545212298.701 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212298.701 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212298.702 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)))))) into 0
1545212298.702 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.702 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.702 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.702 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.702 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.702 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.702 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.703 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212298.703 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212298.703 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212298.704 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212298.704 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212298.704 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.704 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.704 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.704 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.704 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.705 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212298.705 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212298.705 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212298.705 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.706 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212298.706 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.706 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h))))))) into 0
1545212298.707 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.707 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.707 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.707 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.707 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.707 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.707 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.707 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.707 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.707 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.707 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.707 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212298.708 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212298.708 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212298.708 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212298.709 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2))))))) into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.709 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.710 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.710 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212298.710 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212298.711 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212298.711 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2)))))) into 0
1545212298.711 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.711 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.711 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.711 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.711 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.711 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.711 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.711 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.711 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.711 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.711 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.711 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.711 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.712 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.712 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212298.712 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ 1 (pow D 2)))) into 0
1545212298.712 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.712 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.712 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.712 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* 2 (/ 0 1)))) into 0
1545212298.712 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.712 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.713 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212298.713 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212298.714 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212298.714 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212298.714 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212298.715 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.715 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.715 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.716 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212298.717 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212298.717 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212298.718 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212298.720 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212298.722 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.722 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.723 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))))) into 0
1545212298.724 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))))) (* 2 (* (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212298.725 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212298.725 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212298.726 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212298.726 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212298.727 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))))) into 0
1545212298.728 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.728 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.728 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212298.728 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.729 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.729 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.729 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212298.730 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2)))))) into 0
1545212298.730 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212298.731 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2)))))) into 0
1545212298.731 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3)))))) into 0
1545212298.732 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212298.732 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212298.733 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3)))))) into 0
1545212298.734 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))))) into 0
1545212298.734 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212298.735 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212298.735 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3)))))) into 0
1545212298.735 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212298.736 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212298.736 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6)))))) into 0
1545212298.737 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212298.738 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))))))) into 0
1545212298.738 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.738 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.738 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.738 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.738 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.739 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212298.739 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212298.740 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212298.741 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212298.741 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212298.742 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212298.743 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))))) into 0
1545212298.743 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.743 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.743 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.743 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.743 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.744 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212298.744 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212298.745 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212298.745 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212298.746 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212298.747 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212298.748 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h)))))))) into 0
1545212298.748 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.748 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.748 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.748 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.748 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.748 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.748 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.748 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.748 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.749 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.749 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.749 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.749 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.749 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.749 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.749 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.749 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.749 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.749 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.749 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212298.750 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212298.751 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212298.751 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212298.752 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212298.753 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2)))))))) into 0
1545212298.753 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.753 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.753 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.753 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.753 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.753 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.753 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.753 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.753 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.753 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.754 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.755 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.756 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212298.756 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212298.757 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212298.758 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212298.758 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2))))))) into 0
1545212298.758 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.758 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.758 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.758 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.759 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.759 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.759 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.759 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.759 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.759 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.759 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.759 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.759 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.759 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.759 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.759 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.759 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.759 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.759 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.759 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.760 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.760 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.760 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.760 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.760 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.760 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.760 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.760 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.761 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212298.761 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.761 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212298.762 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2))))) into 0
1545212298.762 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.762 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.763 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.763 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.763 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.763 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.763 * [misc]backup-simplify:  Simplify (* 2 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) (* c0 1)))))) into (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212298.765 * [misc]backup-simplify:  Simplify (+ (sqrt (* (+ (/ 1 M) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) (- (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) (/ 1 M)))) (* (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (/ (/ 1 d) (/ 1 D))) (/ (/ 1 d) (/ 1 D)))) into (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))
1545212298.765 * [misc]approximate:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in (M c0 h w d D) around 0
1545212298.765 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in D
1545212298.765 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212298.765 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212298.765 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.765 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.765 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.765 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.765 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212298.765 * [misc]taylor:  Taking taylor expansion of h in D
1545212298.765 * [misc]backup-simplify:  Simplify h into h
1545212298.765 * [misc]taylor:  Taking taylor expansion of w in D
1545212298.765 * [misc]backup-simplify:  Simplify w into w
1545212298.765 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212298.765 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212298.765 * [misc]taylor:  Taking taylor expansion of d in D
1545212298.765 * [misc]backup-simplify:  Simplify d into d
1545212298.765 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212298.765 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.766 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.766 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.766 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212298.766 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.766 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.766 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212298.766 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in D
1545212298.766 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in D
1545212298.766 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212298.766 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212298.766 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212298.766 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.766 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.766 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.766 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.766 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212298.766 * [misc]taylor:  Taking taylor expansion of h in D
1545212298.766 * [misc]backup-simplify:  Simplify h into h
1545212298.766 * [misc]taylor:  Taking taylor expansion of w in D
1545212298.767 * [misc]backup-simplify:  Simplify w into w
1545212298.767 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212298.767 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212298.767 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.767 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212298.767 * [misc]taylor:  Taking taylor expansion of d in D
1545212298.767 * [misc]backup-simplify:  Simplify d into d
1545212298.767 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.767 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.767 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212298.767 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.767 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.767 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212298.767 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212298.767 * [misc]taylor:  Taking taylor expansion of M in D
1545212298.767 * [misc]backup-simplify:  Simplify M into M
1545212298.767 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.767 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212298.767 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212298.767 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212298.767 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.767 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.767 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.767 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.767 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212298.767 * [misc]taylor:  Taking taylor expansion of h in D
1545212298.768 * [misc]backup-simplify:  Simplify h into h
1545212298.768 * [misc]taylor:  Taking taylor expansion of w in D
1545212298.768 * [misc]backup-simplify:  Simplify w into w
1545212298.768 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212298.768 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212298.768 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.768 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212298.768 * [misc]taylor:  Taking taylor expansion of d in D
1545212298.768 * [misc]backup-simplify:  Simplify d into d
1545212298.768 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.768 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.768 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212298.768 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.768 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.768 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212298.768 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212298.768 * [misc]taylor:  Taking taylor expansion of M in D
1545212298.768 * [misc]backup-simplify:  Simplify M into M
1545212298.768 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.768 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212298.768 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212298.768 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212298.768 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212298.768 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212298.768 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.769 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.769 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.769 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.769 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.769 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) 0) (* 0 (/ 1 M))) into 0
1545212298.769 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212298.769 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in d
1545212298.769 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212298.769 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212298.769 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.769 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.769 * [misc]backup-simplify:  Simplify D into D
1545212298.769 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212298.769 * [misc]taylor:  Taking taylor expansion of h in d
1545212298.769 * [misc]backup-simplify:  Simplify h into h
1545212298.769 * [misc]taylor:  Taking taylor expansion of w in d
1545212298.769 * [misc]backup-simplify:  Simplify w into w
1545212298.769 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212298.769 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.769 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.769 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.769 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.769 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212298.769 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.769 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.769 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.769 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.770 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.770 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212298.770 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212298.770 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.770 * [misc]backup-simplify:  Simplify D into D
1545212298.770 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of h in d
1545212298.770 * [misc]backup-simplify:  Simplify h into h
1545212298.770 * [misc]taylor:  Taking taylor expansion of w in d
1545212298.770 * [misc]backup-simplify:  Simplify w into w
1545212298.770 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212298.770 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.770 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.770 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.770 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.770 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.770 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.770 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.770 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.770 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212298.770 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212298.770 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212298.770 * [misc]taylor:  Taking taylor expansion of M in d
1545212298.770 * [misc]backup-simplify:  Simplify M into M
1545212298.770 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.771 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212298.771 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212298.771 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212298.771 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.771 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.771 * [misc]backup-simplify:  Simplify D into D
1545212298.771 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212298.771 * [misc]taylor:  Taking taylor expansion of h in d
1545212298.771 * [misc]backup-simplify:  Simplify h into h
1545212298.771 * [misc]taylor:  Taking taylor expansion of w in d
1545212298.771 * [misc]backup-simplify:  Simplify w into w
1545212298.771 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212298.771 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212298.771 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.771 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.771 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.771 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.771 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.771 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.771 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.771 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.771 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.771 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212298.771 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212298.771 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212298.771 * [misc]taylor:  Taking taylor expansion of M in d
1545212298.771 * [misc]backup-simplify:  Simplify M into M
1545212298.771 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.771 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212298.772 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212298.772 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) c0) (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212298.772 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212298.772 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.772 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.772 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.772 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.772 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212298.772 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212298.773 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.773 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.773 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.773 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.773 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.773 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212298.773 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212298.773 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.773 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) c0) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212298.774 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212298.774 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in w
1545212298.774 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212298.774 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212298.774 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.774 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.774 * [misc]backup-simplify:  Simplify D into D
1545212298.774 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212298.774 * [misc]taylor:  Taking taylor expansion of h in w
1545212298.774 * [misc]backup-simplify:  Simplify h into h
1545212298.774 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.774 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.774 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.774 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212298.774 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.774 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.774 * [misc]backup-simplify:  Simplify d into d
1545212298.774 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212298.774 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.774 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.774 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212298.774 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.774 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212298.774 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.774 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212298.775 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.775 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.775 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212298.775 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in w
1545212298.775 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in w
1545212298.775 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212298.775 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212298.775 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212298.775 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.775 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.775 * [misc]backup-simplify:  Simplify D into D
1545212298.775 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212298.775 * [misc]taylor:  Taking taylor expansion of h in w
1545212298.775 * [misc]backup-simplify:  Simplify h into h
1545212298.775 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.775 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.775 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.775 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212298.775 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212298.775 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.775 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.775 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.775 * [misc]backup-simplify:  Simplify d into d
1545212298.775 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.775 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212298.775 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.775 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212298.776 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.776 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212298.776 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.776 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.776 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212298.776 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212298.776 * [misc]taylor:  Taking taylor expansion of M in w
1545212298.776 * [misc]backup-simplify:  Simplify M into M
1545212298.776 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.776 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212298.776 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212298.776 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212298.776 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.776 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.776 * [misc]backup-simplify:  Simplify D into D
1545212298.776 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212298.776 * [misc]taylor:  Taking taylor expansion of h in w
1545212298.776 * [misc]backup-simplify:  Simplify h into h
1545212298.776 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.776 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.776 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.776 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212298.776 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212298.776 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.776 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.776 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.776 * [misc]backup-simplify:  Simplify d into d
1545212298.776 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.776 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212298.776 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.777 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212298.777 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.777 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212298.777 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.777 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.777 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212298.777 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212298.777 * [misc]taylor:  Taking taylor expansion of M in w
1545212298.777 * [misc]backup-simplify:  Simplify M into M
1545212298.777 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.777 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212298.777 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212298.777 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212298.777 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212298.777 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212298.777 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.778 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212298.778 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.778 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.778 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212298.778 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (/ (* (pow D 2) h) (* c0 (pow d 2))) (/ 1 M))) into 0
1545212298.778 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212298.778 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in h
1545212298.778 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212298.778 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212298.778 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.778 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.778 * [misc]backup-simplify:  Simplify D into D
1545212298.778 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212298.779 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.779 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.779 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.779 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.779 * [misc]backup-simplify:  Simplify w into w
1545212298.779 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212298.779 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.779 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.779 * [misc]backup-simplify:  Simplify d into d
1545212298.779 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212298.779 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.779 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.779 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212298.779 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.779 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212298.779 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.779 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212298.779 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.779 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.779 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212298.779 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in h
1545212298.779 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in h
1545212298.779 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212298.779 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212298.779 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212298.779 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.779 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.780 * [misc]backup-simplify:  Simplify D into D
1545212298.780 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212298.780 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.780 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.780 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.780 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.780 * [misc]backup-simplify:  Simplify w into w
1545212298.780 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212298.780 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212298.780 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.780 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.780 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.780 * [misc]backup-simplify:  Simplify d into d
1545212298.780 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.780 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212298.780 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.780 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212298.780 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.780 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212298.780 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.780 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.780 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212298.780 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212298.780 * [misc]taylor:  Taking taylor expansion of M in h
1545212298.780 * [misc]backup-simplify:  Simplify M into M
1545212298.780 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.780 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212298.781 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212298.781 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212298.781 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.781 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.781 * [misc]backup-simplify:  Simplify D into D
1545212298.781 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212298.781 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.781 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.781 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.781 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.781 * [misc]backup-simplify:  Simplify w into w
1545212298.781 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212298.781 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212298.781 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.781 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.781 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.781 * [misc]backup-simplify:  Simplify d into d
1545212298.781 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.781 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212298.781 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.781 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212298.781 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.781 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212298.781 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.781 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.781 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212298.781 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212298.781 * [misc]taylor:  Taking taylor expansion of M in h
1545212298.782 * [misc]backup-simplify:  Simplify M into M
1545212298.782 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.782 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212298.782 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212298.782 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212298.782 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212298.782 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212298.782 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.782 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212298.782 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.782 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.782 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212298.783 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (/ (* (pow D 2) w) (* c0 (pow d 2))) (/ 1 M))) into (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M))))
1545212298.783 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M)))) (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212298.783 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in c0
1545212298.783 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212298.783 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212298.783 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.783 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.783 * [misc]backup-simplify:  Simplify D into D
1545212298.783 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212298.783 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.783 * [misc]backup-simplify:  Simplify h into h
1545212298.783 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.783 * [misc]backup-simplify:  Simplify w into w
1545212298.783 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212298.783 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.783 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.783 * [misc]backup-simplify:  Simplify d into d
1545212298.783 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.783 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.783 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.783 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.784 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.784 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.784 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.784 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212298.784 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.784 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212298.784 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.784 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in c0
1545212298.784 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in c0
1545212298.784 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212298.784 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212298.784 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212298.784 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.784 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.784 * [misc]backup-simplify:  Simplify D into D
1545212298.784 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212298.784 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.784 * [misc]backup-simplify:  Simplify h into h
1545212298.784 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.784 * [misc]backup-simplify:  Simplify w into w
1545212298.784 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212298.784 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.784 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.784 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.784 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.784 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.784 * [misc]backup-simplify:  Simplify d into d
1545212298.784 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.784 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.784 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.785 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.785 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212298.785 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.785 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212298.785 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.785 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212298.785 * [misc]taylor:  Taking taylor expansion of M in c0
1545212298.785 * [misc]backup-simplify:  Simplify M into M
1545212298.785 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.785 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212298.785 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212298.785 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212298.785 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.785 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.785 * [misc]backup-simplify:  Simplify D into D
1545212298.785 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212298.785 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.785 * [misc]backup-simplify:  Simplify h into h
1545212298.785 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.785 * [misc]backup-simplify:  Simplify w into w
1545212298.785 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212298.785 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.785 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.785 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.785 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.785 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.785 * [misc]backup-simplify:  Simplify d into d
1545212298.785 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.785 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.785 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.785 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.785 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212298.786 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.786 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212298.786 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.786 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212298.786 * [misc]taylor:  Taking taylor expansion of M in c0
1545212298.786 * [misc]backup-simplify:  Simplify M into M
1545212298.786 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.786 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.786 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.786 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212298.787 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.787 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.787 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.787 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.787 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.787 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212298.787 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.788 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212298.788 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.788 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.788 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.788 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.789 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212298.789 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.789 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212298.789 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212298.790 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 1 M)) (* (- (/ 1 M)) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212298.790 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212298.790 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212298.790 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212298.790 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.790 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.790 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.790 * [misc]backup-simplify:  Simplify D into D
1545212298.790 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.790 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.790 * [misc]backup-simplify:  Simplify h into h
1545212298.790 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.790 * [misc]backup-simplify:  Simplify w into w
1545212298.790 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212298.791 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.791 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.791 * [misc]backup-simplify:  Simplify d into d
1545212298.791 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.791 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.791 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.791 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.791 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.791 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.791 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.791 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.791 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212298.791 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212298.791 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212298.791 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212298.791 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.791 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.791 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.792 * [misc]backup-simplify:  Simplify D into D
1545212298.792 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.792 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.792 * [misc]backup-simplify:  Simplify h into h
1545212298.792 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.792 * [misc]backup-simplify:  Simplify w into w
1545212298.792 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.792 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.792 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.792 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.792 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.792 * [misc]backup-simplify:  Simplify d into d
1545212298.792 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.792 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.792 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.792 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.792 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.792 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.792 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212298.792 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.793 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.793 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.793 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212298.793 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212298.793 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212298.793 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.793 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.793 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.793 * [misc]backup-simplify:  Simplify D into D
1545212298.793 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.793 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.793 * [misc]backup-simplify:  Simplify h into h
1545212298.793 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.793 * [misc]backup-simplify:  Simplify w into w
1545212298.793 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.793 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.793 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.793 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.793 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.793 * [misc]backup-simplify:  Simplify d into d
1545212298.793 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.793 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.794 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.794 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.794 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.794 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.794 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212298.794 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.794 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.794 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.794 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212298.794 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212298.795 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212298.795 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212298.795 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212298.795 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.795 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212298.796 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212298.796 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212298.796 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.796 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212298.797 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212298.798 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212298.798 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212298.798 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212298.798 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.798 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.798 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.798 * [misc]backup-simplify:  Simplify D into D
1545212298.798 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.798 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.798 * [misc]backup-simplify:  Simplify h into h
1545212298.798 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.798 * [misc]backup-simplify:  Simplify w into w
1545212298.798 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212298.798 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.798 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.798 * [misc]backup-simplify:  Simplify d into d
1545212298.798 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.798 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.798 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.799 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.799 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.799 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.799 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.799 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.799 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212298.799 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212298.799 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212298.799 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212298.799 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.799 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.799 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.799 * [misc]backup-simplify:  Simplify D into D
1545212298.799 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.799 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.799 * [misc]backup-simplify:  Simplify h into h
1545212298.799 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.799 * [misc]backup-simplify:  Simplify w into w
1545212298.799 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.799 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.800 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.800 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.800 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.800 * [misc]backup-simplify:  Simplify d into d
1545212298.800 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.800 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.800 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.800 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.800 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.800 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.800 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212298.800 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.800 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.800 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.800 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212298.801 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212298.801 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212298.801 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.801 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.801 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.801 * [misc]backup-simplify:  Simplify D into D
1545212298.801 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.801 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.801 * [misc]backup-simplify:  Simplify h into h
1545212298.801 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.801 * [misc]backup-simplify:  Simplify w into w
1545212298.801 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.801 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.801 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.801 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.801 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.801 * [misc]backup-simplify:  Simplify d into d
1545212298.801 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.801 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.801 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.801 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.801 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.802 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.802 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212298.802 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.802 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.802 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.802 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212298.802 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212298.802 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212298.802 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212298.802 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212298.803 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.803 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212298.803 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212298.803 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212298.803 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.804 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212298.804 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212298.804 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212298.805 * [misc]backup-simplify:  Simplify (+ 0 (sqrt -1)) into (sqrt -1)
1545212298.805 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212298.805 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212298.805 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.805 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.805 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.805 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212298.805 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212298.805 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212298.805 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.805 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.805 * [misc]backup-simplify:  Simplify D into D
1545212298.805 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212298.805 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.805 * [misc]backup-simplify:  Simplify h into h
1545212298.805 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.805 * [misc]backup-simplify:  Simplify w into w
1545212298.805 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212298.805 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.805 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.805 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.805 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.806 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.806 * [misc]backup-simplify:  Simplify d into d
1545212298.806 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.806 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.806 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.806 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.806 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212298.806 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.806 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212298.806 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.806 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212298.806 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212298.806 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.806 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.806 * [misc]backup-simplify:  Simplify D into D
1545212298.806 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212298.806 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.806 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.806 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.806 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.806 * [misc]backup-simplify:  Simplify w into w
1545212298.806 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.806 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.806 * [misc]backup-simplify:  Simplify d into d
1545212298.806 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.806 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212298.806 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.807 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212298.807 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.807 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212298.807 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.807 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212298.807 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212298.807 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212298.807 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.807 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.807 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.807 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212298.807 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212298.807 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.807 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.808 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.808 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212298.808 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212298.808 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.808 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.808 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.808 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.808 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.808 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.808 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.808 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212298.808 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.809 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.810 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.810 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.810 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.810 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.810 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.810 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.811 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212298.812 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212298.812 * [misc]backup-simplify:  Simplify (+ 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))))
1545212298.812 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212298.812 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212298.812 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212298.812 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212298.812 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212298.812 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212298.812 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.812 * [misc]backup-simplify:  Simplify D into D
1545212298.812 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212298.812 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212298.812 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.812 * [misc]backup-simplify:  Simplify h into h
1545212298.812 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212298.812 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.812 * [misc]backup-simplify:  Simplify w into w
1545212298.812 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212298.812 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212298.812 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.812 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.812 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.813 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212298.813 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212298.813 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.813 * [misc]backup-simplify:  Simplify d into d
1545212298.813 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212298.813 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212298.813 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.813 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.813 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.813 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.813 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212298.813 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212298.813 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212298.813 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212298.813 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212298.813 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.813 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.813 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212298.814 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212298.814 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212298.814 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212298.814 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212298.814 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212298.814 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212298.814 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.814 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212298.814 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212298.814 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.815 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212298.815 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212298.815 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.815 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212298.816 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212298.816 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212298.816 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.816 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.816 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.816 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.816 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.816 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.816 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.816 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.816 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.816 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.817 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212298.817 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.817 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.817 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.817 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.817 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.817 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.817 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.817 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212298.817 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212298.817 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.817 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.817 * [misc]backup-simplify:  Simplify D into D
1545212298.817 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.817 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.817 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.817 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.817 * [misc]backup-simplify:  Simplify d into d
1545212298.817 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.817 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.817 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.818 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212298.818 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.818 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212298.818 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.818 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.818 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.818 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.818 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.818 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.819 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.819 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212298.819 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.819 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.819 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.820 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.820 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.820 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.820 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.820 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.820 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.821 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.821 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.821 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.821 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.821 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.822 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.822 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.822 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.822 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.822 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212298.823 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212298.823 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.823 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212298.823 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.823 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.824 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.824 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212298.824 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.824 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212298.824 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212298.825 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212298.825 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.826 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.826 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212298.826 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212298.826 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212298.827 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212298.827 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212298.827 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.827 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.827 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.827 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.827 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.828 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.828 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.828 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.828 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.828 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.829 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.829 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212298.829 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.829 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.829 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.829 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.829 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.829 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212298.830 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.830 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.830 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.830 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.830 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.830 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.830 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.830 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.830 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.830 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.830 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212298.831 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.831 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212298.831 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.831 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.831 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.831 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.831 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.831 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.832 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212298.832 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.832 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.832 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.832 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.832 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.832 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.832 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.832 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.832 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.832 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.832 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212298.832 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.832 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.832 * [misc]backup-simplify:  Simplify D into D
1545212298.832 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.832 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.832 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.832 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.832 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.832 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.833 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212298.833 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.833 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.833 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.833 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.833 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.833 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.833 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212298.833 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.834 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.834 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212298.834 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212298.834 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.834 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.834 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.834 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.834 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.835 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.835 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212298.835 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.835 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212298.836 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.836 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.837 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.837 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212298.838 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.838 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.839 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.839 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.839 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.840 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.840 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.840 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212298.841 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.841 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.842 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.842 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.843 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.843 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.844 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212298.845 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212298.848 * [misc]backup-simplify:  Simplify (+ 0 (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) into (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))))
1545212298.849 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212298.849 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212298.849 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.849 * [misc]backup-simplify:  Simplify D into D
1545212298.849 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.849 * [misc]backup-simplify:  Simplify h into h
1545212298.849 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.849 * [misc]backup-simplify:  Simplify w into w
1545212298.849 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.849 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.849 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.849 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.849 * [misc]backup-simplify:  Simplify d into d
1545212298.849 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212298.849 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212298.849 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.850 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.850 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.850 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.850 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212298.850 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212298.850 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212298.850 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212298.850 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212298.851 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212298.851 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212298.851 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212298.851 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.851 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.851 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.851 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212298.851 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212298.852 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212298.852 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212298.852 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212298.853 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212298.853 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212298.854 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.854 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212298.854 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.854 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212298.855 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212298.855 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212298.855 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212298.855 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.856 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212298.856 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212298.856 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212298.856 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212298.857 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212298.857 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.857 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212298.857 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212298.858 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212298.858 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.858 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212298.858 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212298.859 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212298.859 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.859 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212298.860 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212298.860 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212298.862 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212298.862 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212298.862 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212298.863 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212298.863 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212298.863 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212298.863 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.864 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212298.864 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212298.864 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212298.864 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.865 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.865 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212298.865 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212298.865 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.866 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.866 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212298.867 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212298.867 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.867 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.868 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212298.868 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212298.868 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212298.868 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212298.869 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212298.869 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212298.870 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212298.870 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212298.870 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212298.872 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212298.872 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212298.872 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212298.874 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212298.875 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212298.876 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212298.876 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.876 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.876 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.876 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.877 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.877 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.877 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.877 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.877 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.877 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.877 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.877 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.877 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.877 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.878 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212298.878 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212298.879 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.879 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212298.880 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212298.880 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212298.881 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.881 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212298.881 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212298.882 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212298.882 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212298.884 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212298.885 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212298.885 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.885 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.885 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.885 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.885 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.885 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.885 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.886 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.886 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212298.887 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212298.887 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212298.888 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212298.888 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.888 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.888 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.888 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.888 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.888 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.888 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212298.888 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.888 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.888 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.888 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.888 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.888 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.888 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.888 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.889 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.890 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.890 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212298.890 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212298.891 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.891 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212298.891 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.891 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.893 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.893 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.893 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.893 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212298.893 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.894 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.894 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.894 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.894 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.894 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.894 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212298.894 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.894 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.895 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.895 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.895 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212298.895 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.895 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.895 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.895 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.896 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 M)))))))) into (* (sqrt -1) M)
1545212298.898 * [misc]backup-simplify:  Simplify (+ (sqrt (* (+ (/ 1 (- M)) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) (- (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) (/ 1 (- M))))) (* (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (/ (/ 1 (- d)) (/ 1 (- D)))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212298.898 * [misc]approximate:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in (M c0 h w d D) around 0
1545212298.898 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212298.899 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.899 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of M in D
1545212298.899 * [misc]backup-simplify:  Simplify M into M
1545212298.899 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.899 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.899 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.899 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.899 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of h in D
1545212298.899 * [misc]backup-simplify:  Simplify h into h
1545212298.899 * [misc]taylor:  Taking taylor expansion of w in D
1545212298.899 * [misc]backup-simplify:  Simplify w into w
1545212298.899 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212298.899 * [misc]taylor:  Taking taylor expansion of d in D
1545212298.899 * [misc]backup-simplify:  Simplify d into d
1545212298.899 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212298.899 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.899 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.899 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.900 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212298.900 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.900 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.900 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212298.900 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212298.900 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212298.900 * [misc]taylor:  Taking taylor expansion of M in D
1545212298.900 * [misc]backup-simplify:  Simplify M into M
1545212298.900 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.900 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212298.900 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212298.900 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.900 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.900 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.900 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.900 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212298.900 * [misc]taylor:  Taking taylor expansion of h in D
1545212298.900 * [misc]backup-simplify:  Simplify h into h
1545212298.900 * [misc]taylor:  Taking taylor expansion of w in D
1545212298.900 * [misc]backup-simplify:  Simplify w into w
1545212298.900 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212298.900 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212298.900 * [misc]taylor:  Taking taylor expansion of d in D
1545212298.900 * [misc]backup-simplify:  Simplify d into d
1545212298.900 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212298.900 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.900 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.900 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.900 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212298.900 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.900 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.900 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212298.901 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212298.901 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212298.901 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212298.901 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212298.901 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212298.901 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.901 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.901 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.901 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.901 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) 0) (* 0 (/ 1 M))) into 0
1545212298.901 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212298.902 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212298.902 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212298.902 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212298.902 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.902 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.902 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.902 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.902 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212298.902 * [misc]taylor:  Taking taylor expansion of h in D
1545212298.902 * [misc]backup-simplify:  Simplify h into h
1545212298.902 * [misc]taylor:  Taking taylor expansion of w in D
1545212298.902 * [misc]backup-simplify:  Simplify w into w
1545212298.902 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212298.902 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212298.902 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.902 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212298.902 * [misc]taylor:  Taking taylor expansion of d in D
1545212298.902 * [misc]backup-simplify:  Simplify d into d
1545212298.902 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.902 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.902 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212298.902 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.902 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.902 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212298.902 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in d
1545212298.902 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in d
1545212298.902 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in d
1545212298.902 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212298.902 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.902 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in d
1545212298.902 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212298.902 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212298.902 * [misc]taylor:  Taking taylor expansion of M in d
1545212298.902 * [misc]backup-simplify:  Simplify M into M
1545212298.902 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.902 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212298.902 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212298.902 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.902 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.902 * [misc]backup-simplify:  Simplify D into D
1545212298.902 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of h in d
1545212298.903 * [misc]backup-simplify:  Simplify h into h
1545212298.903 * [misc]taylor:  Taking taylor expansion of w in d
1545212298.903 * [misc]backup-simplify:  Simplify w into w
1545212298.903 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.903 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.903 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.903 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212298.903 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.903 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.903 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.903 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.903 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.903 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212298.903 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212298.903 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of M in d
1545212298.903 * [misc]backup-simplify:  Simplify M into M
1545212298.903 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.903 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.903 * [misc]backup-simplify:  Simplify D into D
1545212298.903 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of h in d
1545212298.903 * [misc]backup-simplify:  Simplify h into h
1545212298.903 * [misc]taylor:  Taking taylor expansion of w in d
1545212298.903 * [misc]backup-simplify:  Simplify w into w
1545212298.903 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.903 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.903 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.903 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.903 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212298.903 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.903 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.904 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.904 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.904 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.904 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212298.904 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212298.904 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) c0)) into (- (/ (* (pow D 2) (* h w)) c0))
1545212298.904 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) c0))) into (- (/ (* (pow D 2) (* h w)) c0))
1545212298.904 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 2) (* h w)) c0)
1545212298.904 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) c0)) (/ (* (pow D 2) (* h w)) c0)) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))
1545212298.905 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212298.905 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212298.905 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.905 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.905 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.905 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.905 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212298.905 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212298.906 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.906 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.906 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.906 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.906 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.906 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212298.906 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212298.906 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.906 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.907 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) c0)) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212298.907 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212298.907 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212298.907 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212298.907 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212298.907 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.907 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.907 * [misc]backup-simplify:  Simplify D into D
1545212298.907 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212298.907 * [misc]taylor:  Taking taylor expansion of h in d
1545212298.907 * [misc]backup-simplify:  Simplify h into h
1545212298.907 * [misc]taylor:  Taking taylor expansion of w in d
1545212298.907 * [misc]backup-simplify:  Simplify w into w
1545212298.907 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212298.907 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212298.907 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.907 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.907 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.907 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.907 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.908 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.908 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.908 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.908 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.908 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212298.908 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212298.908 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212298.908 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.908 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of M in w
1545212298.908 * [misc]backup-simplify:  Simplify M into M
1545212298.908 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.908 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.908 * [misc]backup-simplify:  Simplify D into D
1545212298.908 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of h in w
1545212298.908 * [misc]backup-simplify:  Simplify h into h
1545212298.908 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.908 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.908 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.908 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.908 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.908 * [misc]backup-simplify:  Simplify d into d
1545212298.908 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212298.908 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.908 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.908 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212298.908 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.909 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212298.909 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.909 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212298.909 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.909 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.909 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212298.909 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212298.909 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212298.909 * [misc]taylor:  Taking taylor expansion of M in w
1545212298.909 * [misc]backup-simplify:  Simplify M into M
1545212298.909 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.909 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212298.909 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212298.909 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.909 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.909 * [misc]backup-simplify:  Simplify D into D
1545212298.909 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212298.909 * [misc]taylor:  Taking taylor expansion of h in w
1545212298.909 * [misc]backup-simplify:  Simplify h into h
1545212298.909 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.909 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.909 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.909 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212298.909 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.909 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.909 * [misc]backup-simplify:  Simplify d into d
1545212298.909 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212298.909 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.909 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.909 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212298.910 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.910 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212298.910 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.910 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212298.910 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.910 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.910 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212298.910 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212298.910 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212298.910 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212298.910 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212298.910 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212298.910 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.911 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212298.911 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.911 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212298.911 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) h) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212298.911 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) (/ 1 M))) into 0
1545212298.912 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212298.912 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212298.912 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212298.912 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212298.912 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.912 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.912 * [misc]backup-simplify:  Simplify D into D
1545212298.912 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212298.912 * [misc]taylor:  Taking taylor expansion of h in w
1545212298.912 * [misc]backup-simplify:  Simplify h into h
1545212298.912 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.912 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.912 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.912 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212298.912 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212298.912 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.912 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.912 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.912 * [misc]backup-simplify:  Simplify d into d
1545212298.912 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.912 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212298.912 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.912 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212298.912 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.912 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212298.912 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.913 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.913 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212298.913 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212298.913 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.913 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of M in h
1545212298.913 * [misc]backup-simplify:  Simplify M into M
1545212298.913 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.913 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.913 * [misc]backup-simplify:  Simplify D into D
1545212298.913 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.913 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.913 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.913 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.913 * [misc]backup-simplify:  Simplify w into w
1545212298.913 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.913 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.913 * [misc]backup-simplify:  Simplify d into d
1545212298.913 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212298.913 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.913 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.913 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212298.913 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.913 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212298.913 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.914 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212298.914 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.914 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.914 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212298.914 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212298.914 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212298.914 * [misc]taylor:  Taking taylor expansion of M in h
1545212298.914 * [misc]backup-simplify:  Simplify M into M
1545212298.914 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.914 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212298.914 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212298.914 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.914 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.914 * [misc]backup-simplify:  Simplify D into D
1545212298.914 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212298.914 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.914 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.914 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.914 * [misc]backup-simplify:  Simplify w into w
1545212298.914 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212298.914 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.914 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.914 * [misc]backup-simplify:  Simplify d into d
1545212298.914 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212298.914 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.914 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.914 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212298.914 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.914 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212298.914 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.915 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212298.915 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.915 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.915 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212298.915 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212298.915 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212298.915 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212298.915 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212298.915 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212298.915 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.915 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) w) (* (pow d 2) c0))) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212298.915 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212298.916 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (* (pow d 2) c0))) into (- (/ (* (pow D 2) w) (* c0 (pow d 2))))
1545212298.916 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) w) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) w) (* (pow d 2) c0)))
1545212298.916 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) w) (* (pow d 2) c0))) (/ 1 M))) into 0
1545212298.916 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212298.916 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212298.916 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212298.916 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212298.917 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.917 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.917 * [misc]backup-simplify:  Simplify D into D
1545212298.917 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212298.917 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.917 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.917 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.917 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.917 * [misc]backup-simplify:  Simplify w into w
1545212298.917 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212298.917 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212298.917 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.917 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.917 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.917 * [misc]backup-simplify:  Simplify d into d
1545212298.917 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.917 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212298.917 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.917 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212298.917 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.917 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212298.917 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.917 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.917 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212298.917 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in c0
1545212298.917 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in c0
1545212298.917 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212298.918 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.918 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of M in c0
1545212298.918 * [misc]backup-simplify:  Simplify M into M
1545212298.918 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.918 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.918 * [misc]backup-simplify:  Simplify D into D
1545212298.918 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.918 * [misc]backup-simplify:  Simplify h into h
1545212298.918 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.918 * [misc]backup-simplify:  Simplify w into w
1545212298.918 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.918 * [misc]backup-simplify:  Simplify d into d
1545212298.918 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.918 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.918 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.918 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.918 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.918 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.918 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.918 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212298.918 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.918 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212298.918 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.918 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212298.918 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212298.919 * [misc]taylor:  Taking taylor expansion of M in c0
1545212298.919 * [misc]backup-simplify:  Simplify M into M
1545212298.919 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212298.919 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212298.919 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212298.919 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.919 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.919 * [misc]backup-simplify:  Simplify D into D
1545212298.919 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212298.919 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.919 * [misc]backup-simplify:  Simplify h into h
1545212298.919 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.919 * [misc]backup-simplify:  Simplify w into w
1545212298.919 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212298.919 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.919 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.919 * [misc]backup-simplify:  Simplify d into d
1545212298.919 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.919 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.919 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.919 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.919 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.919 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.919 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.919 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212298.919 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.919 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212298.920 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.920 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212298.920 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (pow d 2)))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212298.920 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.921 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212298.921 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212298.922 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.922 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.922 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.922 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.922 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.923 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212298.923 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.923 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212298.923 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.923 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.923 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.924 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.924 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212298.924 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.924 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.924 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212298.925 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ 1 M)) (* (/ 1 M) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212298.926 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212298.926 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212298.926 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212298.926 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212298.926 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.926 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.926 * [misc]backup-simplify:  Simplify D into D
1545212298.926 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212298.926 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.926 * [misc]backup-simplify:  Simplify h into h
1545212298.926 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.926 * [misc]backup-simplify:  Simplify w into w
1545212298.926 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212298.926 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.926 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.926 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.926 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.926 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.926 * [misc]backup-simplify:  Simplify d into d
1545212298.927 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.927 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.927 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.927 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.927 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212298.927 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.927 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212298.927 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.927 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in M
1545212298.927 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212298.928 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.928 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.928 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.928 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.928 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212298.928 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.928 * [misc]backup-simplify:  Simplify D into D
1545212298.928 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.928 * [misc]backup-simplify:  Simplify h into h
1545212298.928 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.928 * [misc]backup-simplify:  Simplify w into w
1545212298.928 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.928 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.928 * [misc]backup-simplify:  Simplify d into d
1545212298.928 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.928 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.928 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.929 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.929 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.929 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.929 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.929 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.929 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212298.929 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212298.929 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.929 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.929 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.929 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212298.929 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212298.929 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.929 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.929 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.930 * [misc]backup-simplify:  Simplify D into D
1545212298.930 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.930 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.930 * [misc]backup-simplify:  Simplify h into h
1545212298.930 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.930 * [misc]backup-simplify:  Simplify w into w
1545212298.930 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212298.930 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.930 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.930 * [misc]backup-simplify:  Simplify d into d
1545212298.930 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.930 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.930 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.930 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.930 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.930 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.930 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.930 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.931 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212298.931 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212298.931 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.931 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212298.932 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.932 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212298.932 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212298.933 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212298.933 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212298.933 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212298.934 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212298.934 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212298.935 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.935 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212298.935 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.935 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.935 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.935 * [misc]backup-simplify:  Simplify D into D
1545212298.935 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.935 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.935 * [misc]backup-simplify:  Simplify h into h
1545212298.935 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.935 * [misc]backup-simplify:  Simplify w into w
1545212298.935 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.935 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.935 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.935 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.935 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.935 * [misc]backup-simplify:  Simplify d into d
1545212298.935 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.935 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.935 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.935 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.935 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.936 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.936 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212298.936 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.936 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.936 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.936 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.936 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212298.936 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.936 * [misc]backup-simplify:  Simplify D into D
1545212298.936 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.936 * [misc]backup-simplify:  Simplify h into h
1545212298.936 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.936 * [misc]backup-simplify:  Simplify w into w
1545212298.936 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.936 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.937 * [misc]backup-simplify:  Simplify d into d
1545212298.937 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.937 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.937 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.937 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.937 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.937 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.937 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.937 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.937 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212298.937 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212298.937 * [misc]taylor:  Taking taylor expansion of M in M
1545212298.937 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.937 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.938 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212298.938 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212298.938 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.938 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.938 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.938 * [misc]backup-simplify:  Simplify D into D
1545212298.938 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.938 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.938 * [misc]backup-simplify:  Simplify h into h
1545212298.938 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.938 * [misc]backup-simplify:  Simplify w into w
1545212298.938 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212298.938 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.938 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.938 * [misc]backup-simplify:  Simplify d into d
1545212298.938 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.938 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.938 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.938 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.938 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.938 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.938 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212298.939 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.939 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212298.939 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212298.939 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.939 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212298.939 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.940 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212298.940 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212298.940 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212298.941 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212298.941 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212298.942 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212298.942 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212298.942 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.942 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212298.942 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212298.942 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212298.942 * [misc]taylor:  Taking taylor expansion of D in M
1545212298.942 * [misc]backup-simplify:  Simplify D into D
1545212298.942 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212298.942 * [misc]taylor:  Taking taylor expansion of h in M
1545212298.942 * [misc]backup-simplify:  Simplify h into h
1545212298.942 * [misc]taylor:  Taking taylor expansion of w in M
1545212298.942 * [misc]backup-simplify:  Simplify w into w
1545212298.942 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212298.943 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212298.943 * [misc]backup-simplify:  Simplify c0 into c0
1545212298.943 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212298.943 * [misc]taylor:  Taking taylor expansion of d in M
1545212298.943 * [misc]backup-simplify:  Simplify d into d
1545212298.943 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.943 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.943 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.943 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.943 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212298.943 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212298.944 * [misc]backup-simplify:  Simplify (+ (sqrt -1) 0) into (sqrt -1)
1545212298.944 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212298.944 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212298.944 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.944 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.944 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.944 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212298.945 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212298.945 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212298.945 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212298.945 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212298.945 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212298.945 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.945 * [misc]backup-simplify:  Simplify D into D
1545212298.945 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212298.945 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.945 * [misc]backup-simplify:  Simplify h into h
1545212298.945 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.945 * [misc]backup-simplify:  Simplify w into w
1545212298.945 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212298.945 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212298.945 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.945 * [misc]backup-simplify:  Simplify d into d
1545212298.945 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.945 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.945 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.945 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.946 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212298.946 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212298.946 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.946 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212298.946 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.946 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212298.946 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212298.947 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212298.947 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212298.947 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212298.947 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212298.947 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212298.947 * [misc]taylor:  Taking taylor expansion of D in h
1545212298.947 * [misc]backup-simplify:  Simplify D into D
1545212298.947 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212298.947 * [misc]taylor:  Taking taylor expansion of h in h
1545212298.947 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.947 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.947 * [misc]taylor:  Taking taylor expansion of w in h
1545212298.947 * [misc]backup-simplify:  Simplify w into w
1545212298.947 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212298.947 * [misc]taylor:  Taking taylor expansion of d in h
1545212298.947 * [misc]backup-simplify:  Simplify d into d
1545212298.947 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.947 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212298.947 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.948 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212298.948 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.948 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212298.948 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.948 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212298.948 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212298.948 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212298.948 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.948 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.949 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.949 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212298.949 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212298.949 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.949 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.949 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.949 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212298.949 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212298.949 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.949 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.950 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.950 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.950 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.950 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.950 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.950 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.951 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212298.951 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.951 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.952 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.952 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.952 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.952 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.952 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.952 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212298.953 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.953 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.953 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.954 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))
1545212298.955 * [misc]backup-simplify:  Simplify (+ (* -1 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212298.956 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212298.956 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.957 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.957 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.957 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.957 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212298.957 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.958 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.959 * [misc]backup-simplify:  Simplify (+ (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 0) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))))
1545212298.959 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212298.959 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212298.959 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212298.959 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212298.959 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212298.959 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212298.959 * [misc]taylor:  Taking taylor expansion of D in c0
1545212298.959 * [misc]backup-simplify:  Simplify D into D
1545212298.959 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212298.959 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212298.959 * [misc]taylor:  Taking taylor expansion of h in c0
1545212298.959 * [misc]backup-simplify:  Simplify h into h
1545212298.959 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212298.959 * [misc]taylor:  Taking taylor expansion of w in c0
1545212298.959 * [misc]backup-simplify:  Simplify w into w
1545212298.959 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212298.959 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212298.959 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212298.959 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.960 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.960 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212298.960 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212298.960 * [misc]taylor:  Taking taylor expansion of d in c0
1545212298.960 * [misc]backup-simplify:  Simplify d into d
1545212298.960 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212298.960 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212298.960 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.960 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.960 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.960 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.960 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212298.960 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212298.960 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212298.961 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212298.961 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212298.961 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.961 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.961 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212298.961 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212298.962 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212298.962 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212298.962 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212298.962 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212298.962 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212298.962 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.963 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212298.963 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212298.963 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.963 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212298.963 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212298.964 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212298.964 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212298.965 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212298.965 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212298.966 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.966 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.966 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.966 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.966 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.966 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.966 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212298.966 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.966 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212298.966 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.967 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212298.967 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.967 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.967 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.967 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.967 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.967 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.967 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.967 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.967 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.967 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.967 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.967 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.967 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.967 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.968 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (pow d 2))) into (- (/ (* (pow D 2) w) (pow d 2)))
1545212298.968 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) w) (pow d 2))) in w
1545212298.968 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212298.968 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212298.968 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212298.968 * [misc]taylor:  Taking taylor expansion of D in w
1545212298.968 * [misc]backup-simplify:  Simplify D into D
1545212298.968 * [misc]taylor:  Taking taylor expansion of w in w
1545212298.968 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.968 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.968 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212298.968 * [misc]taylor:  Taking taylor expansion of d in w
1545212298.968 * [misc]backup-simplify:  Simplify d into d
1545212298.968 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.968 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212298.968 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212298.969 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212298.969 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212298.969 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212298.969 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.969 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.969 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.969 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.969 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.969 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.970 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.970 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.970 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.970 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.971 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.971 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212298.972 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.972 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.972 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.972 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.973 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.973 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.973 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.973 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212298.974 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.974 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.974 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.975 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212298.976 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1)))) into 0
1545212298.977 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212298.977 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.978 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.978 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.978 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.978 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.979 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212298.979 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.979 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212298.979 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212298.979 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.980 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.980 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212298.980 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212298.980 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.981 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212298.981 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212298.983 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212298.983 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212298.983 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212298.983 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212298.984 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212298.984 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212298.985 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212298.986 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212298.986 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.986 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.986 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.986 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.986 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.986 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.987 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212298.987 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.988 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212298.988 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212298.988 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212298.989 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212298.989 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.989 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.989 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.989 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.989 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.989 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.989 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212298.991 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212298.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.991 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.991 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212298.992 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212298.992 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212298.992 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212298.992 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212298.992 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212298.992 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.993 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.993 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.993 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.994 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212298.994 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212298.994 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.994 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.994 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.994 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.994 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.994 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.994 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.994 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.994 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.995 * [misc]backup-simplify:  Simplify (- (/ (pow D 2) (pow d 2))) into (- (/ (pow D 2) (pow d 2)))
1545212298.995 * [misc]taylor:  Taking taylor expansion of (- (/ (pow D 2) (pow d 2))) in d
1545212298.995 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212298.995 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212298.995 * [misc]taylor:  Taking taylor expansion of D in d
1545212298.995 * [misc]backup-simplify:  Simplify D into D
1545212298.995 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212298.995 * [misc]taylor:  Taking taylor expansion of d in d
1545212298.995 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.995 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.995 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212298.995 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212298.995 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212298.995 * [misc]backup-simplify:  Simplify (- (pow D 2)) into (- (pow D 2))
1545212298.995 * [misc]taylor:  Taking taylor expansion of (- (pow D 2)) in D
1545212298.995 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212298.995 * [misc]taylor:  Taking taylor expansion of D in D
1545212298.996 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.996 * [misc]backup-simplify:  Simplify 1 into 1
1545212298.996 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.996 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.997 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212298.997 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212298.997 * [misc]backup-simplify:  Simplify 0 into 0
1545212298.997 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212298.997 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212298.997 * [misc]backup-simplify:  Simplify -1 into -1
1545212298.997 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.998 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212298.998 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212298.999 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212298.999 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212298.999 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.000 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.000 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.002 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212299.003 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.003 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.003 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.004 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.004 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.005 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.005 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.005 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212299.006 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.006 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.006 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.007 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212299.008 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))))) into 0
1545212299.010 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212299.010 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.011 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.011 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.012 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.012 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.013 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.013 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.014 * [misc]backup-simplify:  Simplify (+ (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) 0) into (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))))
1545212299.014 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) in c0
1545212299.014 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212299.014 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212299.014 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212299.014 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212299.014 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212299.014 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212299.014 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.014 * [misc]backup-simplify:  Simplify D into D
1545212299.014 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212299.014 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212299.014 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.014 * [misc]backup-simplify:  Simplify h into h
1545212299.014 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212299.014 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.014 * [misc]backup-simplify:  Simplify w into w
1545212299.015 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212299.015 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212299.015 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.015 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.015 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.015 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212299.015 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212299.015 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.015 * [misc]backup-simplify:  Simplify d into d
1545212299.015 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212299.015 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212299.015 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.015 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.015 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.015 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.015 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.015 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212299.016 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212299.016 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212299.016 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212299.016 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212299.016 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212299.016 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212299.016 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212299.016 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.017 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.017 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.017 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212299.017 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212299.017 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212299.017 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212299.018 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212299.018 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212299.018 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212299.019 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.019 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212299.019 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.020 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212299.020 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212299.020 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212299.020 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212299.020 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.021 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212299.021 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212299.021 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.022 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212299.022 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212299.022 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.022 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212299.022 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212299.023 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212299.023 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.023 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212299.024 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212299.024 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212299.024 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.025 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.025 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212299.025 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212299.027 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.027 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.027 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212299.028 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212299.028 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212299.028 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212299.029 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.029 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212299.029 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212299.029 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212299.029 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.030 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.030 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212299.030 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212299.031 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.031 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.031 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212299.032 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212299.032 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.032 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.033 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212299.033 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.033 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.033 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212299.034 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.034 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.035 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.035 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212299.035 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212299.036 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.037 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212299.037 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212299.039 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.040 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.041 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212299.042 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.042 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.042 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.042 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.042 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.042 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.042 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.042 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.042 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.042 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.042 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.042 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.042 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.043 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.043 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.043 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212299.044 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.044 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.045 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212299.045 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.045 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.046 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.046 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212299.046 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.047 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212299.049 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212299.049 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212299.050 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.050 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.050 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.050 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.050 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.051 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.051 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.052 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.052 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.052 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.053 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.053 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.053 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.053 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.053 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.053 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.053 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.053 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.053 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.053 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.054 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.054 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.054 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.054 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.054 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.054 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.054 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.054 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.054 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.055 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.055 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.055 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212299.056 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.056 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.056 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.056 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.056 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.056 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.056 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.057 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.058 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.058 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.058 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.058 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.058 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.058 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.058 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.058 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.058 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.059 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.059 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.059 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.059 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.059 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.059 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.059 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.059 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.059 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.060 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.060 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.060 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212299.061 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.061 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.061 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.062 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 (- M))))))))) into (* -1 (* (sqrt -1) M))
1545212299.062 * * * * [misc]progress:  [ 2 / 4 ] generating series at (2 2 1 1 2 1)
1545212299.062 * [misc]backup-simplify:  Simplify (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* h w)))
1545212299.062 * [misc]approximate:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in (c0 h w d D) around 0
1545212299.062 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in D
1545212299.062 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212299.062 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.062 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.062 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.062 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.062 * [misc]backup-simplify:  Simplify d into d
1545212299.062 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.062 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.062 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.062 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.062 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.063 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.063 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.063 * [misc]backup-simplify:  Simplify h into h
1545212299.063 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.063 * [misc]backup-simplify:  Simplify w into w
1545212299.063 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.063 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.063 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.063 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.063 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.063 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212299.063 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in d
1545212299.063 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212299.063 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.063 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.063 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.063 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.063 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.063 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.064 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.064 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.064 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.064 * [misc]backup-simplify:  Simplify D into D
1545212299.064 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.064 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.064 * [misc]backup-simplify:  Simplify h into h
1545212299.064 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.064 * [misc]backup-simplify:  Simplify w into w
1545212299.064 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.064 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212299.064 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.064 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.064 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.064 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212299.064 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in w
1545212299.064 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212299.064 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.065 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.065 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.065 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.065 * [misc]backup-simplify:  Simplify d into d
1545212299.065 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.065 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.065 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.065 * [misc]backup-simplify:  Simplify D into D
1545212299.065 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.065 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.065 * [misc]backup-simplify:  Simplify h into h
1545212299.065 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.065 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.065 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.065 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.065 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.065 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.065 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.065 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.065 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.066 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.066 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.066 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212299.066 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in h
1545212299.066 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212299.066 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.066 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.066 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.066 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.066 * [misc]backup-simplify:  Simplify d into d
1545212299.066 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.066 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.066 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.066 * [misc]backup-simplify:  Simplify D into D
1545212299.066 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.066 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.066 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.066 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.066 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.067 * [misc]backup-simplify:  Simplify w into w
1545212299.067 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.067 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.067 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.067 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.067 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.067 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.067 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.067 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.068 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212299.068 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212299.068 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.068 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.068 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.068 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.068 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.068 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.068 * [misc]backup-simplify:  Simplify d into d
1545212299.068 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.068 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.068 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.068 * [misc]backup-simplify:  Simplify D into D
1545212299.068 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.068 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.068 * [misc]backup-simplify:  Simplify h into h
1545212299.068 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.068 * [misc]backup-simplify:  Simplify w into w
1545212299.068 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.068 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.068 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.069 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.069 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.069 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.069 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.069 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212299.069 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212299.069 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.069 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.069 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.069 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.069 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.069 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.069 * [misc]backup-simplify:  Simplify d into d
1545212299.069 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.069 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.069 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.069 * [misc]backup-simplify:  Simplify D into D
1545212299.069 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.069 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.069 * [misc]backup-simplify:  Simplify h into h
1545212299.070 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.070 * [misc]backup-simplify:  Simplify w into w
1545212299.070 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.070 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.070 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.070 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.070 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.070 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.070 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.070 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212299.071 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212299.071 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.071 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.071 * [misc]backup-simplify:  Simplify d into d
1545212299.071 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212299.071 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.071 * [misc]backup-simplify:  Simplify w into w
1545212299.071 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212299.071 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.071 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.071 * [misc]backup-simplify:  Simplify D into D
1545212299.071 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.071 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.071 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.071 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.071 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.071 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.071 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212299.071 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.072 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212299.072 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212299.072 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212299.072 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212299.072 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.072 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.072 * [misc]backup-simplify:  Simplify d into d
1545212299.072 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212299.072 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.072 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.072 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.072 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.072 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.072 * [misc]backup-simplify:  Simplify D into D
1545212299.072 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.072 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.073 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212299.073 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.073 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212299.073 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212299.073 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212299.073 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.073 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.073 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.073 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.073 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.073 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.073 * [misc]backup-simplify:  Simplify D into D
1545212299.073 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.073 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.074 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212299.074 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212299.074 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.074 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.074 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.074 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.074 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.074 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.074 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.074 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.075 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212299.075 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.075 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.075 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.076 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.076 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.076 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.076 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.076 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.076 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.077 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212299.077 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212299.077 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.077 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.077 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.077 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.078 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212299.078 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212299.078 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.078 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.078 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.078 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.079 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.079 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.079 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212299.079 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.079 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.079 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.079 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.079 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.080 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.080 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.081 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.081 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.081 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.082 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.082 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.082 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.082 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.082 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.082 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.082 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.083 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.083 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212299.084 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212299.084 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.084 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.084 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.084 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.084 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.084 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.084 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.085 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.085 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.086 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.086 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.086 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.086 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.086 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.086 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.086 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.086 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.086 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.087 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.087 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.087 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.087 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.087 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.087 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.088 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.089 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212299.089 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.089 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.090 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.090 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.090 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.090 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.090 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.090 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.091 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.091 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.091 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.091 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.092 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.092 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212299.092 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212299.092 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.092 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.092 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.092 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.092 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.092 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.092 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.092 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.092 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.092 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.093 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.093 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.093 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.093 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.093 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.093 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.093 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212299.094 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.094 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.094 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.094 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.094 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.094 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.094 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.094 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.094 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.094 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.094 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.094 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.094 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.095 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.095 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.095 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.095 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.095 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.095 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.095 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.095 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.096 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212299.096 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212299.097 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212299.097 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.097 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212299.098 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.098 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.098 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.098 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.098 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.098 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.098 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.098 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.098 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.098 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.099 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212299.099 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212299.099 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212299.100 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.100 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.101 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.101 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212299.101 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212299.102 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.102 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.102 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.102 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.102 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.102 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.102 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.102 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.102 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.102 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.102 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.102 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212299.103 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.103 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.103 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.103 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.103 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.103 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) c0))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.103 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.103 * [misc]approximate:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in (c0 h w d D) around 0
1545212299.104 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212299.104 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.104 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.104 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.104 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.104 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.104 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.104 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.104 * [misc]backup-simplify:  Simplify h into h
1545212299.104 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.104 * [misc]backup-simplify:  Simplify w into w
1545212299.104 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212299.104 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.104 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.104 * [misc]backup-simplify:  Simplify d into d
1545212299.104 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.104 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.104 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.104 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.104 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.104 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.104 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.104 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212299.104 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212299.104 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.104 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.104 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.104 * [misc]backup-simplify:  Simplify D into D
1545212299.104 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.104 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.104 * [misc]backup-simplify:  Simplify h into h
1545212299.104 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.104 * [misc]backup-simplify:  Simplify w into w
1545212299.104 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212299.104 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.104 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.104 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.104 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.104 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.104 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.104 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.104 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.105 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.105 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.105 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212299.105 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.105 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212299.105 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.105 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.105 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.105 * [misc]backup-simplify:  Simplify D into D
1545212299.105 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.105 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.105 * [misc]backup-simplify:  Simplify h into h
1545212299.105 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.105 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.105 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.105 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212299.105 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.105 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.105 * [misc]backup-simplify:  Simplify d into d
1545212299.105 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.105 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.105 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.105 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.105 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.105 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.105 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.106 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.106 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.106 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.106 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.106 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212299.106 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.106 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.106 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.106 * [misc]backup-simplify:  Simplify D into D
1545212299.106 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.106 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.106 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.106 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.106 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.106 * [misc]backup-simplify:  Simplify w into w
1545212299.106 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212299.106 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.106 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.106 * [misc]backup-simplify:  Simplify d into d
1545212299.106 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.106 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.106 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.106 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.106 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.106 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.106 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.106 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.107 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.107 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.107 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212299.107 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.107 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.107 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.107 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.107 * [misc]backup-simplify:  Simplify D into D
1545212299.107 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.107 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.107 * [misc]backup-simplify:  Simplify h into h
1545212299.107 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.107 * [misc]backup-simplify:  Simplify w into w
1545212299.107 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.107 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.107 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.107 * [misc]backup-simplify:  Simplify d into d
1545212299.107 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.107 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.107 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.107 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.107 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.107 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.107 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.107 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.107 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.107 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.108 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.108 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.108 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.108 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.108 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.108 * [misc]backup-simplify:  Simplify D into D
1545212299.108 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.108 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.108 * [misc]backup-simplify:  Simplify h into h
1545212299.108 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.108 * [misc]backup-simplify:  Simplify w into w
1545212299.108 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.108 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.108 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.108 * [misc]backup-simplify:  Simplify d into d
1545212299.108 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.108 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.108 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.108 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.108 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.108 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.108 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.108 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.108 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.108 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.108 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.108 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212299.108 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.108 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.108 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.108 * [misc]backup-simplify:  Simplify D into D
1545212299.109 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.109 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.109 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.109 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.109 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.109 * [misc]backup-simplify:  Simplify w into w
1545212299.109 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.109 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.109 * [misc]backup-simplify:  Simplify d into d
1545212299.109 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.109 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.109 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.109 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.109 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.109 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.109 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.109 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212299.109 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212299.109 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212299.109 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.109 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.109 * [misc]backup-simplify:  Simplify D into D
1545212299.109 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.109 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.109 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.109 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.109 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.109 * [misc]backup-simplify:  Simplify d into d
1545212299.109 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.110 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.110 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.110 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212299.110 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.110 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212299.110 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212299.110 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.110 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.110 * [misc]backup-simplify:  Simplify D into D
1545212299.110 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.110 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.110 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.110 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.110 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.110 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.110 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212299.110 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.110 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.110 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.110 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.110 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.110 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.110 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.111 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.111 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.111 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.111 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.111 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.111 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.111 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.111 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.111 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.111 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.111 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.112 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212299.112 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.112 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212299.112 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.112 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.112 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.112 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.112 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.112 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.112 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.112 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.113 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.113 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.113 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.113 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.113 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.113 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.113 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212299.113 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.113 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.113 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.113 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.113 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.114 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.114 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.114 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.114 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.114 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.115 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.115 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.115 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.115 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.115 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.115 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.115 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.115 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.116 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212299.116 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.116 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.116 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.116 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.116 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.116 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.116 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.116 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.116 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.116 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.116 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.117 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.117 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.117 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.117 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.117 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.117 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.117 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.118 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.118 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.118 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.118 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.118 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.118 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.118 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.118 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.118 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.119 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.119 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.119 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.120 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.120 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.120 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.120 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.120 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.120 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.120 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.120 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.120 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.120 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.120 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.120 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.120 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.120 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.120 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.121 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212299.121 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.122 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212299.122 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.123 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.123 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.123 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.123 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.123 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.123 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.123 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.123 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.123 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.123 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.123 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.123 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.123 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.123 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.123 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.124 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.124 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.125 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.125 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.125 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.125 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.125 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.125 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.125 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.126 * [misc]backup-simplify:  Simplify (* 1 (* (pow (/ 1 D) 2) (* (pow (/ 1 d) -2) (* (/ 1 w) (* (/ 1 h) (/ 1 (/ 1 c0))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.126 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212299.126 * [misc]approximate:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (c0 h w d D) around 0
1545212299.126 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212299.126 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212299.126 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.126 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212299.126 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.126 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.126 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.126 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.126 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.127 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.127 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.127 * [misc]backup-simplify:  Simplify h into h
1545212299.127 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.127 * [misc]backup-simplify:  Simplify w into w
1545212299.127 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212299.127 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.127 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.127 * [misc]backup-simplify:  Simplify d into d
1545212299.127 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.127 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.127 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.127 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.127 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.127 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.127 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.127 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212299.127 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212299.127 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212299.128 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.128 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212299.128 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.128 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.128 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.128 * [misc]backup-simplify:  Simplify D into D
1545212299.128 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.128 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.128 * [misc]backup-simplify:  Simplify h into h
1545212299.128 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.128 * [misc]backup-simplify:  Simplify w into w
1545212299.128 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212299.128 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.128 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.128 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.128 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.128 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.128 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.128 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.128 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.128 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.128 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.128 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212299.129 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.129 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212299.129 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212299.129 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.129 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212299.129 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.129 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.129 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.129 * [misc]backup-simplify:  Simplify D into D
1545212299.129 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.129 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.129 * [misc]backup-simplify:  Simplify h into h
1545212299.129 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.129 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.129 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.129 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212299.129 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.129 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.129 * [misc]backup-simplify:  Simplify d into d
1545212299.129 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.129 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.129 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.129 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.129 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.130 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.130 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.130 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.130 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.130 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.130 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.130 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212299.130 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212299.130 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.130 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212299.130 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.130 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.131 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.131 * [misc]backup-simplify:  Simplify D into D
1545212299.131 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.131 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.131 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.131 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.131 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.131 * [misc]backup-simplify:  Simplify w into w
1545212299.131 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212299.131 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.131 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.131 * [misc]backup-simplify:  Simplify d into d
1545212299.131 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.131 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.131 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.131 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.131 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.131 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.131 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.132 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.132 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.132 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.132 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212299.132 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212299.132 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.132 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.132 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.132 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.132 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.132 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.132 * [misc]backup-simplify:  Simplify D into D
1545212299.132 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.132 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.132 * [misc]backup-simplify:  Simplify h into h
1545212299.132 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.132 * [misc]backup-simplify:  Simplify w into w
1545212299.132 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.132 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.132 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.132 * [misc]backup-simplify:  Simplify d into d
1545212299.133 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.133 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.133 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.133 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.133 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.133 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.133 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.133 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.133 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.133 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.133 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.134 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212299.134 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.134 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.134 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.134 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.134 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.134 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.134 * [misc]backup-simplify:  Simplify D into D
1545212299.134 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.134 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.134 * [misc]backup-simplify:  Simplify h into h
1545212299.134 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.134 * [misc]backup-simplify:  Simplify w into w
1545212299.134 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.134 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.134 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.134 * [misc]backup-simplify:  Simplify d into d
1545212299.134 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.134 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.134 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.134 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.134 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.134 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.134 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.134 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.134 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.135 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.135 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.135 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212299.135 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212299.135 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212299.135 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.135 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212299.135 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.135 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.135 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.135 * [misc]backup-simplify:  Simplify D into D
1545212299.136 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.136 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.136 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.136 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.136 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.136 * [misc]backup-simplify:  Simplify w into w
1545212299.136 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.136 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.136 * [misc]backup-simplify:  Simplify d into d
1545212299.136 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.136 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.136 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.136 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.136 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.137 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.137 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.137 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212299.137 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) w) (pow d 2))) into (* -1 (/ (* (pow D 2) w) (pow d 2)))
1545212299.137 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) w) (pow d 2))) in w
1545212299.137 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212299.137 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.137 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212299.137 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212299.137 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.137 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.137 * [misc]backup-simplify:  Simplify D into D
1545212299.137 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.137 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.137 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.137 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.137 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.137 * [misc]backup-simplify:  Simplify d into d
1545212299.137 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.137 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.138 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.138 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212299.138 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.138 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212299.138 * [misc]backup-simplify:  Simplify (* -1 (/ (pow D 2) (pow d 2))) into (* -1 (/ (pow D 2) (pow d 2)))
1545212299.138 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (pow D 2) (pow d 2))) in d
1545212299.138 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212299.138 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.138 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212299.138 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.138 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.138 * [misc]backup-simplify:  Simplify D into D
1545212299.138 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.138 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.138 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.138 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.139 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.139 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.139 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212299.139 * [misc]backup-simplify:  Simplify (* -1 (pow D 2)) into (* -1 (pow D 2))
1545212299.139 * [misc]taylor:  Taking taylor expansion of (* -1 (pow D 2)) in D
1545212299.139 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212299.139 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.139 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.139 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.139 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.139 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.139 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.139 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212299.139 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.140 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.140 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.140 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.140 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.140 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.141 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.141 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212299.141 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.141 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.141 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.142 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212299.142 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.142 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212299.142 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.143 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.143 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))) into 0
1545212299.143 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.143 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.143 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.143 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.143 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.143 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.143 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.144 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.144 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (pow D 2) (pow d 2)))) into 0
1545212299.144 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.144 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.144 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.144 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.144 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212299.144 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (pow D 2))) into 0
1545212299.144 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.144 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.145 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.145 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.145 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212299.145 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.145 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.145 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.146 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.147 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.147 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.147 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.148 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212299.148 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.148 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.148 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.148 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.148 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.148 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.148 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.148 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.148 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.148 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.148 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.148 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.149 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212299.149 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.149 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.149 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2))))) into 0
1545212299.149 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.149 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.149 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.149 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.149 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.149 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.149 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.149 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.150 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.150 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.150 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.150 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.150 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2))))) into 0
1545212299.150 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.150 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.151 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.151 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.151 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.151 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212299.151 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.151 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.151 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.151 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.152 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.152 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.152 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.152 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.152 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.153 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.153 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.153 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.153 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.154 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212299.154 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.154 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.154 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.154 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.154 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.154 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.154 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.154 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.154 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212299.155 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.155 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212299.155 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.156 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.156 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))))) into 0
1545212299.156 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.156 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.156 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.156 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.156 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.156 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.156 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.156 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.156 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.156 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.156 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.156 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.156 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.156 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.156 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.157 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.157 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.157 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.158 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2)))))) into 0
1545212299.158 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.158 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.158 * [misc]backup-simplify:  Simplify (* -1 (* (pow (/ 1 (- D)) 2) (* (pow (/ 1 (- d)) -2) (* (/ 1 (- w)) (* (/ 1 (- h)) (/ 1 (/ 1 (- c0)))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.158 * * * * [misc]progress:  [ 3 / 4 ] generating series at (2 2 1 1 1 2)
1545212299.158 * [misc]backup-simplify:  Simplify (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* h w)))
1545212299.158 * [misc]approximate:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in (c0 h w d D) around 0
1545212299.158 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in D
1545212299.158 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212299.158 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.158 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.158 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.158 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.158 * [misc]backup-simplify:  Simplify d into d
1545212299.158 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.158 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.158 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.158 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.158 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.158 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.158 * [misc]backup-simplify:  Simplify h into h
1545212299.158 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.159 * [misc]backup-simplify:  Simplify w into w
1545212299.159 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.159 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.159 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.159 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.159 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.159 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212299.159 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in d
1545212299.159 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212299.159 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.159 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.159 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.159 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.159 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.159 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.159 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.159 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.159 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.159 * [misc]backup-simplify:  Simplify D into D
1545212299.159 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.159 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.159 * [misc]backup-simplify:  Simplify h into h
1545212299.159 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.159 * [misc]backup-simplify:  Simplify w into w
1545212299.159 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.159 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212299.159 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.160 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.160 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.160 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212299.160 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in w
1545212299.160 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212299.160 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.160 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.160 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.160 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.160 * [misc]backup-simplify:  Simplify d into d
1545212299.160 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.160 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.160 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.160 * [misc]backup-simplify:  Simplify D into D
1545212299.160 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.160 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.160 * [misc]backup-simplify:  Simplify h into h
1545212299.160 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.160 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.160 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.160 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.160 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.160 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.161 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.161 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.161 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.161 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.161 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.161 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212299.161 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in h
1545212299.162 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212299.162 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.162 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.162 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.162 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.162 * [misc]backup-simplify:  Simplify d into d
1545212299.162 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.162 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.162 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.162 * [misc]backup-simplify:  Simplify D into D
1545212299.162 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.162 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.162 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.162 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.162 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.162 * [misc]backup-simplify:  Simplify w into w
1545212299.162 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.162 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.162 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.162 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.162 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.163 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.163 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.163 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.163 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212299.163 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212299.163 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.163 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.163 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.163 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.163 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.163 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.163 * [misc]backup-simplify:  Simplify d into d
1545212299.163 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.163 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.163 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.163 * [misc]backup-simplify:  Simplify D into D
1545212299.163 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.164 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.164 * [misc]backup-simplify:  Simplify h into h
1545212299.164 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.164 * [misc]backup-simplify:  Simplify w into w
1545212299.164 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.164 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.164 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.164 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.164 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.164 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.164 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.165 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212299.165 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212299.165 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.165 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.165 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.165 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.165 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.165 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.165 * [misc]backup-simplify:  Simplify d into d
1545212299.165 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.165 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.165 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.165 * [misc]backup-simplify:  Simplify D into D
1545212299.165 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.165 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.165 * [misc]backup-simplify:  Simplify h into h
1545212299.165 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.165 * [misc]backup-simplify:  Simplify w into w
1545212299.165 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.165 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.165 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.166 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.166 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.166 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.166 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.166 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212299.166 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212299.166 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.166 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.166 * [misc]backup-simplify:  Simplify d into d
1545212299.166 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212299.166 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.166 * [misc]backup-simplify:  Simplify w into w
1545212299.166 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212299.166 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.166 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.166 * [misc]backup-simplify:  Simplify D into D
1545212299.166 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.166 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.166 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.167 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.167 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.167 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.167 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212299.167 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.167 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212299.167 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212299.168 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212299.168 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212299.168 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.168 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.168 * [misc]backup-simplify:  Simplify d into d
1545212299.168 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212299.168 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.168 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.168 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.168 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.168 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.168 * [misc]backup-simplify:  Simplify D into D
1545212299.168 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.168 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.168 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212299.168 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.169 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212299.169 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212299.169 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212299.169 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.169 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.169 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.169 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.169 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.169 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.169 * [misc]backup-simplify:  Simplify D into D
1545212299.169 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.169 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.169 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212299.169 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212299.169 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.169 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.169 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.169 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.170 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.170 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.170 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.170 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.171 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212299.171 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.171 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.171 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.171 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.172 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.172 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.172 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.172 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.172 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.173 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212299.173 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212299.173 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.173 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.173 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.173 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.174 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212299.174 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212299.174 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.174 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.174 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.174 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.174 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.175 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.175 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212299.175 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.175 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.175 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.175 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.175 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.176 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.176 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.177 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.177 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.177 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.178 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.178 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.178 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.178 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.178 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.178 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.178 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.179 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.179 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212299.180 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212299.180 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.180 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.180 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.180 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.180 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.180 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.180 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.181 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.181 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.181 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.181 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.181 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.181 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.182 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.182 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.182 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.182 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.182 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.182 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.182 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.183 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.183 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.183 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.183 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.184 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.184 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212299.185 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.185 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.185 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.186 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.186 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.186 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.186 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.187 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.187 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.187 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.188 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212299.188 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212299.188 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.188 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.188 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.188 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.188 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.188 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.188 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.188 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.189 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.189 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.189 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212299.190 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.190 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.190 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.190 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.190 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.190 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.190 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.190 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.190 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.190 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.190 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.190 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.190 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.190 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.190 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.190 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.191 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.191 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.191 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.191 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.191 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.191 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212299.192 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212299.192 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212299.193 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.193 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212299.193 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.193 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.193 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.193 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.193 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.193 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.193 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.194 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.194 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.194 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.194 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212299.195 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212299.195 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212299.195 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212299.195 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.195 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.195 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.195 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.195 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.196 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.196 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.197 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212299.197 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212299.197 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.197 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.197 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.197 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.197 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.197 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.198 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.198 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.198 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.198 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.198 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.198 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.198 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.198 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212299.198 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.199 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.199 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.199 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.199 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.199 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) c0))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.199 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.199 * [misc]approximate:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in (c0 h w d D) around 0
1545212299.199 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212299.199 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.199 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.199 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.199 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.199 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.199 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.199 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.199 * [misc]backup-simplify:  Simplify h into h
1545212299.199 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.199 * [misc]backup-simplify:  Simplify w into w
1545212299.199 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212299.199 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.199 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.199 * [misc]backup-simplify:  Simplify d into d
1545212299.199 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.199 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.200 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.200 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.200 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.200 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.200 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.200 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212299.200 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212299.200 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.200 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.200 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.200 * [misc]backup-simplify:  Simplify D into D
1545212299.200 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.200 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.200 * [misc]backup-simplify:  Simplify h into h
1545212299.200 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.200 * [misc]backup-simplify:  Simplify w into w
1545212299.200 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212299.200 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.200 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.200 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.200 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.200 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.200 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.200 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.200 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.201 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.201 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212299.201 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.201 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212299.201 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.201 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.201 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.201 * [misc]backup-simplify:  Simplify D into D
1545212299.201 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.201 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.201 * [misc]backup-simplify:  Simplify h into h
1545212299.201 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.201 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.201 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.201 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212299.201 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.201 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.201 * [misc]backup-simplify:  Simplify d into d
1545212299.201 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.201 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.201 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.201 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.201 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.201 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.201 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.202 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.202 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.202 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.202 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.202 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212299.202 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.202 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.202 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.202 * [misc]backup-simplify:  Simplify D into D
1545212299.202 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.202 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.202 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.202 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.202 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.202 * [misc]backup-simplify:  Simplify w into w
1545212299.202 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212299.202 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.202 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.202 * [misc]backup-simplify:  Simplify d into d
1545212299.202 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.202 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.202 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.202 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.202 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.202 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.202 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.203 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.203 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.203 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.203 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212299.203 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.203 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.203 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.203 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.203 * [misc]backup-simplify:  Simplify D into D
1545212299.203 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.203 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.203 * [misc]backup-simplify:  Simplify h into h
1545212299.203 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.203 * [misc]backup-simplify:  Simplify w into w
1545212299.203 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.203 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.203 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.203 * [misc]backup-simplify:  Simplify d into d
1545212299.203 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.203 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.203 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.203 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.203 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.203 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.203 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.203 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.203 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.203 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.204 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.204 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.204 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.204 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.204 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.204 * [misc]backup-simplify:  Simplify D into D
1545212299.204 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.204 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.204 * [misc]backup-simplify:  Simplify h into h
1545212299.204 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.204 * [misc]backup-simplify:  Simplify w into w
1545212299.204 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.204 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.204 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.204 * [misc]backup-simplify:  Simplify d into d
1545212299.204 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.204 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.204 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.204 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.204 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.204 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.204 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.204 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.204 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.204 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.204 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.204 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212299.204 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.204 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.204 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.205 * [misc]backup-simplify:  Simplify D into D
1545212299.205 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.205 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.205 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.205 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.205 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.205 * [misc]backup-simplify:  Simplify w into w
1545212299.205 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.205 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.205 * [misc]backup-simplify:  Simplify d into d
1545212299.205 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.205 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.205 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.205 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.205 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.205 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.205 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.205 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212299.205 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212299.205 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212299.205 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.205 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.205 * [misc]backup-simplify:  Simplify D into D
1545212299.205 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.205 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.205 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.205 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.205 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.205 * [misc]backup-simplify:  Simplify d into d
1545212299.205 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.206 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.206 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.206 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212299.206 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.206 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212299.206 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212299.206 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.206 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.206 * [misc]backup-simplify:  Simplify D into D
1545212299.206 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.206 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.206 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.206 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.206 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.206 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.206 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212299.206 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.206 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.206 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.206 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.206 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.206 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.207 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.207 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.207 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.207 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.207 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.207 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.207 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.207 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.207 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.208 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212299.208 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.208 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212299.208 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.208 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.208 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.208 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.208 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.208 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.208 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.209 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.209 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.209 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.209 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.209 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.209 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.209 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.209 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212299.209 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.209 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.209 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.210 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.210 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.210 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.210 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.210 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.210 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.211 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.211 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.211 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.211 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.211 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.211 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.211 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.211 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.211 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.211 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.211 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.211 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.211 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.212 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.212 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212299.212 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.212 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.212 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.212 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.212 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.212 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.212 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.212 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.212 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.212 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.213 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.213 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.213 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.213 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.213 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.213 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.214 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.214 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.214 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.214 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.214 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.214 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.214 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.214 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.214 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.215 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.215 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.215 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.215 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.216 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.216 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.216 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.216 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.216 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.216 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.216 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.216 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.216 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212299.217 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.217 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212299.217 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.217 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.217 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.217 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.217 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.218 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.218 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.218 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.218 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.218 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.218 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.218 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.218 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.218 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.218 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.218 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.218 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.218 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.219 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.219 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.219 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.219 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.219 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.219 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.219 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.219 * [misc]backup-simplify:  Simplify (* 1 (* (pow (/ 1 D) 2) (* (pow (/ 1 d) -2) (* (/ 1 w) (* (/ 1 h) (/ 1 (/ 1 c0))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.219 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212299.219 * [misc]approximate:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (c0 h w d D) around 0
1545212299.219 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212299.219 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212299.219 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.219 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212299.220 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.220 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.220 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.220 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.220 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.220 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.220 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.220 * [misc]backup-simplify:  Simplify h into h
1545212299.220 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.220 * [misc]backup-simplify:  Simplify w into w
1545212299.220 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212299.220 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.220 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.220 * [misc]backup-simplify:  Simplify d into d
1545212299.220 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.220 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.220 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.220 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.220 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.220 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.220 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.220 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212299.220 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212299.220 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212299.220 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.220 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212299.220 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.220 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.220 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.220 * [misc]backup-simplify:  Simplify D into D
1545212299.220 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.220 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.220 * [misc]backup-simplify:  Simplify h into h
1545212299.220 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.220 * [misc]backup-simplify:  Simplify w into w
1545212299.220 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212299.220 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.220 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.220 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.220 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.220 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.220 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.220 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.221 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.221 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.221 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.221 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212299.221 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.221 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212299.221 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212299.221 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.221 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212299.221 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.221 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.221 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.221 * [misc]backup-simplify:  Simplify D into D
1545212299.221 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.221 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.221 * [misc]backup-simplify:  Simplify h into h
1545212299.221 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.221 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.221 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.221 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212299.221 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.221 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.221 * [misc]backup-simplify:  Simplify d into d
1545212299.221 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.221 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.221 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.221 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.221 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.221 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.221 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.222 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.222 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.222 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.222 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.222 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212299.222 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212299.222 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.222 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212299.222 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.222 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.222 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.222 * [misc]backup-simplify:  Simplify D into D
1545212299.222 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.222 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.222 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.222 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.222 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.222 * [misc]backup-simplify:  Simplify w into w
1545212299.222 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212299.222 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.222 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.222 * [misc]backup-simplify:  Simplify d into d
1545212299.222 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.222 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.222 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.222 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.222 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.222 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.222 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.223 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.223 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.223 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.223 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212299.223 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212299.223 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.223 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.223 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.223 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.223 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.223 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.223 * [misc]backup-simplify:  Simplify D into D
1545212299.223 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.223 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.223 * [misc]backup-simplify:  Simplify h into h
1545212299.223 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.223 * [misc]backup-simplify:  Simplify w into w
1545212299.223 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.223 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.223 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.223 * [misc]backup-simplify:  Simplify d into d
1545212299.223 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.223 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.223 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.223 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.223 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.223 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.224 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.224 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.224 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.224 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.224 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.224 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212299.224 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.224 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.224 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.224 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.224 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.224 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.224 * [misc]backup-simplify:  Simplify D into D
1545212299.224 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.224 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.224 * [misc]backup-simplify:  Simplify h into h
1545212299.224 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.224 * [misc]backup-simplify:  Simplify w into w
1545212299.225 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.225 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.225 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.225 * [misc]backup-simplify:  Simplify d into d
1545212299.225 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.225 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.225 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.225 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.225 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.225 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.225 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.225 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.225 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.225 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.226 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.226 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212299.226 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212299.226 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212299.226 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.226 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212299.226 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.226 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.226 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.226 * [misc]backup-simplify:  Simplify D into D
1545212299.226 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.226 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.226 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.226 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.226 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.226 * [misc]backup-simplify:  Simplify w into w
1545212299.226 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.226 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.226 * [misc]backup-simplify:  Simplify d into d
1545212299.226 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.226 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.227 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.227 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.227 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.227 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.227 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.227 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212299.227 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) w) (pow d 2))) into (* -1 (/ (* (pow D 2) w) (pow d 2)))
1545212299.228 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) w) (pow d 2))) in w
1545212299.228 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212299.228 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.228 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212299.228 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212299.228 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.228 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.228 * [misc]backup-simplify:  Simplify D into D
1545212299.228 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.228 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.228 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.228 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.228 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.228 * [misc]backup-simplify:  Simplify d into d
1545212299.228 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.228 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.228 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.228 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212299.228 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.229 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212299.229 * [misc]backup-simplify:  Simplify (* -1 (/ (pow D 2) (pow d 2))) into (* -1 (/ (pow D 2) (pow d 2)))
1545212299.229 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (pow D 2) (pow d 2))) in d
1545212299.229 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212299.229 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.229 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212299.229 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.229 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.229 * [misc]backup-simplify:  Simplify D into D
1545212299.229 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.229 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.229 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.229 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.229 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.229 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.229 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212299.229 * [misc]backup-simplify:  Simplify (* -1 (pow D 2)) into (* -1 (pow D 2))
1545212299.229 * [misc]taylor:  Taking taylor expansion of (* -1 (pow D 2)) in D
1545212299.229 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212299.230 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.230 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.230 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.230 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.230 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.230 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.230 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212299.230 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.230 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.230 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.230 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.231 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.231 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.231 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.231 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212299.231 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.232 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.232 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.232 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.232 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212299.232 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.232 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212299.232 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.232 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.233 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))) into 0
1545212299.233 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.233 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.233 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.233 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.233 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.233 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.233 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.233 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.233 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (pow D 2) (pow d 2)))) into 0
1545212299.233 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.233 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.233 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.234 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.234 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212299.234 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (pow D 2))) into 0
1545212299.234 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.234 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.234 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.234 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.234 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212299.234 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.235 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.235 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.235 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.235 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.235 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.236 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.236 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212299.236 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.236 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.236 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.236 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.236 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.236 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.236 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.236 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.236 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.236 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.236 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.237 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.237 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212299.237 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.237 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.237 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2))))) into 0
1545212299.238 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.238 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.238 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.238 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.238 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.238 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.238 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.238 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.238 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.238 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.238 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.238 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.239 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2))))) into 0
1545212299.239 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.239 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.239 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.239 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.239 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.240 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212299.240 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.240 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.240 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.240 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.240 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.240 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.240 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.240 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.241 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.241 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.241 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.241 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.242 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.242 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212299.242 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.242 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.242 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.242 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.242 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.242 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.242 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.243 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212299.243 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.243 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212299.244 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.244 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.244 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))))) into 0
1545212299.244 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.244 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.244 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.244 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.244 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.244 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.244 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.244 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.244 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.244 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.244 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.244 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.244 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.244 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.245 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.245 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.245 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.246 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.246 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2)))))) into 0
1545212299.246 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.246 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.246 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.246 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.246 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.246 * [misc]backup-simplify:  Simplify (* -1 (* (pow (/ 1 (- D)) 2) (* (pow (/ 1 (- d)) -2) (* (/ 1 (- w)) (* (/ 1 (- h)) (/ 1 (/ 1 (- c0)))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.246 * * * * [misc]progress:  [ 4 / 4 ] generating series at (2 2 1)
1545212299.247 * [misc]backup-simplify:  Simplify (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) into (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))
1545212299.247 * [misc]approximate:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in (M c0 h w d D) around 0
1545212299.247 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in D
1545212299.247 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in D
1545212299.247 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in D
1545212299.247 * [misc]taylor:  Taking taylor expansion of M in D
1545212299.247 * [misc]backup-simplify:  Simplify M into M
1545212299.247 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212299.247 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212299.247 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.247 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.247 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.247 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.247 * [misc]backup-simplify:  Simplify d into d
1545212299.247 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212299.247 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.247 * [misc]backup-simplify:  Simplify w into w
1545212299.247 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212299.247 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.247 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.247 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.247 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.247 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.247 * [misc]backup-simplify:  Simplify h into h
1545212299.247 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.247 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.247 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.247 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212299.247 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212299.248 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212299.248 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in D
1545212299.248 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212299.248 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212299.248 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.248 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.248 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.248 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.248 * [misc]backup-simplify:  Simplify d into d
1545212299.248 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212299.248 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.248 * [misc]backup-simplify:  Simplify w into w
1545212299.248 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212299.248 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.248 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.248 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.248 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.248 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.248 * [misc]backup-simplify:  Simplify h into h
1545212299.248 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.248 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.248 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.248 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212299.248 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212299.248 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212299.248 * [misc]taylor:  Taking taylor expansion of M in D
1545212299.248 * [misc]backup-simplify:  Simplify M into M
1545212299.248 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w h))) into (/ (* c0 (pow d 2)) (* w h))
1545212299.249 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w h)) 0) into (/ (* c0 (pow d 2)) (* w h))
1545212299.249 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* w h)) (/ (* c0 (pow d 2)) (* w h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))
1545212299.249 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) into (/ (* c0 (pow d 2)) (* w h))
1545212299.249 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.249 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.249 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.249 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212299.249 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212299.249 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212299.250 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.250 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.250 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.250 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.250 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212299.250 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212299.250 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212299.250 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.251 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* w h)) 0) (* 0 (/ (* c0 (pow d 2)) (* w h)))) into 0
1545212299.251 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))))) into 0
1545212299.251 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in d
1545212299.251 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in d
1545212299.251 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in d
1545212299.251 * [misc]taylor:  Taking taylor expansion of M in d
1545212299.251 * [misc]backup-simplify:  Simplify M into M
1545212299.251 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212299.251 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212299.251 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.251 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.251 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.251 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.251 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.251 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.251 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212299.251 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.251 * [misc]backup-simplify:  Simplify w into w
1545212299.251 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212299.251 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.251 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.251 * [misc]backup-simplify:  Simplify D into D
1545212299.251 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.251 * [misc]backup-simplify:  Simplify h into h
1545212299.251 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.251 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212299.252 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.252 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.252 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212299.252 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212299.252 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in d
1545212299.252 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212299.252 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212299.252 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.252 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.252 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.252 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.252 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.252 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.252 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212299.252 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.252 * [misc]backup-simplify:  Simplify w into w
1545212299.252 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212299.252 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.252 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.252 * [misc]backup-simplify:  Simplify D into D
1545212299.252 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.252 * [misc]backup-simplify:  Simplify h into h
1545212299.252 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.252 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212299.252 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.252 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.252 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212299.252 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212299.252 * [misc]taylor:  Taking taylor expansion of M in d
1545212299.252 * [misc]backup-simplify:  Simplify M into M
1545212299.252 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212299.253 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212299.253 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212299.253 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212299.253 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212299.253 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.253 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.253 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.253 * [misc]backup-simplify:  Simplify (+ (* M 0) (* 0 (- M))) into 0
1545212299.253 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212299.253 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in w
1545212299.253 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in w
1545212299.253 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in w
1545212299.253 * [misc]taylor:  Taking taylor expansion of M in w
1545212299.253 * [misc]backup-simplify:  Simplify M into M
1545212299.253 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212299.253 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212299.253 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.253 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.253 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.253 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.253 * [misc]backup-simplify:  Simplify d into d
1545212299.253 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212299.253 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.253 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.253 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.253 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212299.253 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.253 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.253 * [misc]backup-simplify:  Simplify D into D
1545212299.253 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.253 * [misc]backup-simplify:  Simplify h into h
1545212299.254 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.254 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.254 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.254 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.254 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212299.254 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.254 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212299.254 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212299.254 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212299.254 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in w
1545212299.254 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212299.254 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212299.254 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.254 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.254 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.254 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.254 * [misc]backup-simplify:  Simplify d into d
1545212299.254 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212299.254 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.254 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.254 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.254 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212299.254 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.254 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.254 * [misc]backup-simplify:  Simplify D into D
1545212299.254 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.254 * [misc]backup-simplify:  Simplify h into h
1545212299.254 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.255 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.255 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.255 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.255 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212299.255 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.255 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212299.255 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212299.255 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212299.255 * [misc]taylor:  Taking taylor expansion of M in w
1545212299.255 * [misc]backup-simplify:  Simplify M into M
1545212299.255 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212299.255 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) h)) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212299.256 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))
1545212299.256 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212299.256 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.256 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.256 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.256 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.256 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212299.257 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212299.257 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212299.257 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212299.257 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.257 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.257 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.257 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.257 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212299.258 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212299.258 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212299.258 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) h)))) into 0
1545212299.258 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))))) into 0
1545212299.258 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in h
1545212299.258 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in h
1545212299.258 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in h
1545212299.258 * [misc]taylor:  Taking taylor expansion of M in h
1545212299.258 * [misc]backup-simplify:  Simplify M into M
1545212299.258 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212299.258 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212299.258 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.258 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.258 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.258 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.258 * [misc]backup-simplify:  Simplify d into d
1545212299.258 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212299.259 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.259 * [misc]backup-simplify:  Simplify w into w
1545212299.259 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212299.259 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.259 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.259 * [misc]backup-simplify:  Simplify D into D
1545212299.259 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.259 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.259 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.259 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.259 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.259 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.259 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.259 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212299.259 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.259 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212299.259 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212299.259 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212299.259 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in h
1545212299.259 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212299.259 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212299.259 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.259 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.259 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.259 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.259 * [misc]backup-simplify:  Simplify d into d
1545212299.260 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212299.260 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.260 * [misc]backup-simplify:  Simplify w into w
1545212299.260 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212299.260 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.260 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.260 * [misc]backup-simplify:  Simplify D into D
1545212299.260 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.260 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.260 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.260 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.260 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.260 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.260 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.260 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212299.260 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.260 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212299.260 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212299.260 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212299.260 * [misc]taylor:  Taking taylor expansion of M in h
1545212299.260 * [misc]backup-simplify:  Simplify M into M
1545212299.261 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (pow D 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212299.261 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (pow D 2))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212299.262 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (/ (* c0 (pow d 2)) (* (pow D 2) w))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))
1545212299.262 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212299.262 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.262 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.262 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.262 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.263 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212299.263 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212299.263 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212299.263 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212299.263 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.263 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.263 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.263 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.264 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212299.264 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212299.264 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212299.265 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) w)))) into (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w)))
1545212299.266 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))))) into 0
1545212299.266 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in c0
1545212299.266 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in c0
1545212299.266 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in c0
1545212299.266 * [misc]taylor:  Taking taylor expansion of M in c0
1545212299.266 * [misc]backup-simplify:  Simplify M into M
1545212299.266 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212299.266 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.266 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.266 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.266 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.266 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.266 * [misc]backup-simplify:  Simplify d into d
1545212299.266 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212299.266 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.266 * [misc]backup-simplify:  Simplify w into w
1545212299.266 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212299.266 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.266 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.266 * [misc]backup-simplify:  Simplify D into D
1545212299.266 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.266 * [misc]backup-simplify:  Simplify h into h
1545212299.266 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.266 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.266 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.267 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.267 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.267 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.267 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212299.267 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212299.267 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in c0
1545212299.267 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212299.267 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.267 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.267 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.267 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.267 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.267 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.268 * [misc]backup-simplify:  Simplify d into d
1545212299.268 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212299.268 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.268 * [misc]backup-simplify:  Simplify w into w
1545212299.268 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212299.268 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.268 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.268 * [misc]backup-simplify:  Simplify D into D
1545212299.268 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.268 * [misc]backup-simplify:  Simplify h into h
1545212299.268 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.268 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.268 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.268 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.268 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.268 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.269 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212299.269 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212299.269 * [misc]taylor:  Taking taylor expansion of M in c0
1545212299.269 * [misc]backup-simplify:  Simplify M into M
1545212299.269 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212299.269 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212299.269 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212299.269 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212299.269 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212299.269 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.270 * [misc]backup-simplify:  Simplify (+ (/ (pow d 2) (* w (* (pow D 2) h))) 0) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212299.270 * [misc]backup-simplify:  Simplify (+ 0 (/ (pow d 2) (* w (* (pow D 2) h)))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212299.270 * [misc]backup-simplify:  Simplify (+ (* M (/ (pow d 2) (* w (* (pow D 2) h)))) (* (/ (pow d 2) (* w (* (pow D 2) h))) (- M))) into 0
1545212299.271 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212299.271 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212299.271 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212299.271 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212299.271 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.271 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.271 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.271 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212299.271 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212299.271 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.271 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.271 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.271 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.271 * [misc]backup-simplify:  Simplify d into d
1545212299.271 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212299.271 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.271 * [misc]backup-simplify:  Simplify w into w
1545212299.271 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212299.271 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.271 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.271 * [misc]backup-simplify:  Simplify D into D
1545212299.271 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.271 * [misc]backup-simplify:  Simplify h into h
1545212299.271 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.271 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.272 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.272 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.272 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212299.272 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212299.272 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212299.272 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212299.272 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212299.272 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.272 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.272 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.272 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.272 * [misc]backup-simplify:  Simplify d into d
1545212299.272 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212299.272 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.272 * [misc]backup-simplify:  Simplify w into w
1545212299.272 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212299.272 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.272 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.272 * [misc]backup-simplify:  Simplify D into D
1545212299.272 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.272 * [misc]backup-simplify:  Simplify h into h
1545212299.273 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.273 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.273 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.273 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.273 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212299.273 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212299.273 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.273 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.273 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.273 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.274 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.274 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.274 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212299.275 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.275 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.275 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.275 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.275 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212299.275 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212299.276 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.276 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212299.276 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212299.276 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.276 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.276 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.276 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212299.276 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212299.277 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.277 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212299.277 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212299.278 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212299.278 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.278 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.278 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.278 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.278 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.278 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.278 * [misc]backup-simplify:  Simplify d into d
1545212299.278 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.278 * [misc]backup-simplify:  Simplify w into w
1545212299.278 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.278 * [misc]backup-simplify:  Simplify D into D
1545212299.278 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.278 * [misc]backup-simplify:  Simplify h into h
1545212299.278 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.278 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.278 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.278 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.278 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212299.278 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212299.278 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.278 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.278 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.278 * [misc]backup-simplify:  Simplify d into d
1545212299.278 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.278 * [misc]backup-simplify:  Simplify w into w
1545212299.278 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.278 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.279 * [misc]backup-simplify:  Simplify D into D
1545212299.279 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.279 * [misc]backup-simplify:  Simplify h into h
1545212299.279 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.279 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.279 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.279 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.279 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212299.279 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212299.279 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.279 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.279 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.279 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.279 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.279 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.280 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212299.280 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.280 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.280 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.280 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.280 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212299.280 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212299.280 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.281 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212299.281 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212299.281 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.281 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.281 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.281 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212299.281 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212299.281 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.281 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212299.282 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212299.282 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212299.282 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in c0
1545212299.282 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.282 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.283 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.283 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.283 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.283 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.283 * [misc]backup-simplify:  Simplify d into d
1545212299.283 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in c0
1545212299.283 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.283 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.283 * [misc]backup-simplify:  Simplify D into D
1545212299.283 * [misc]taylor:  Taking taylor expansion of (* w h) in c0
1545212299.283 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.283 * [misc]backup-simplify:  Simplify w into w
1545212299.283 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.283 * [misc]backup-simplify:  Simplify h into h
1545212299.283 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.283 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.283 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.283 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.283 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.283 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212299.283 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.283 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212299.283 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212299.283 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.283 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.283 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.283 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212299.283 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.283 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.283 * [misc]backup-simplify:  Simplify d into d
1545212299.283 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212299.283 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.283 * [misc]backup-simplify:  Simplify w into w
1545212299.284 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212299.284 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.284 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.284 * [misc]backup-simplify:  Simplify D into D
1545212299.284 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.284 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.284 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.284 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.284 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.284 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.284 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212299.284 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.284 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212299.284 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212299.284 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212299.284 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212299.284 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.284 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.284 * [misc]backup-simplify:  Simplify d into d
1545212299.284 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212299.284 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.284 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.284 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.284 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.284 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.284 * [misc]backup-simplify:  Simplify D into D
1545212299.284 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.285 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.285 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212299.285 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.285 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212299.285 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212299.285 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212299.285 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.285 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.285 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.285 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.285 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.285 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.285 * [misc]backup-simplify:  Simplify D into D
1545212299.285 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.285 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.285 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212299.285 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.286 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.286 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.286 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.286 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212299.286 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.287 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.287 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.287 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.287 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.287 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.287 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.287 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212299.288 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.288 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.288 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))) into (- 1)
1545212299.289 * [misc]backup-simplify:  Simplify (/ (- (- 1) (pow 0 2) (+)) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2))))
1545212299.289 * [misc]taylor:  Taking taylor expansion of (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) in c0
1545212299.289 * [misc]taylor:  Taking taylor expansion of -1/2 in c0
1545212299.289 * [misc]backup-simplify:  Simplify -1/2 into -1/2
1545212299.289 * [misc]taylor:  Taking taylor expansion of (/ (* w (* (pow D 2) h)) (* c0 (pow d 2))) in c0
1545212299.289 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212299.289 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.289 * [misc]backup-simplify:  Simplify w into w
1545212299.289 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212299.289 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.289 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.289 * [misc]backup-simplify:  Simplify D into D
1545212299.289 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.289 * [misc]backup-simplify:  Simplify h into h
1545212299.289 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.289 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.289 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.289 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.289 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.290 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.290 * [misc]backup-simplify:  Simplify d into d
1545212299.290 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.290 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212299.290 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212299.290 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.290 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.290 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.290 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.290 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.290 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.290 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212299.290 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212299.290 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.291 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212299.291 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.291 * [misc]backup-simplify:  Simplify (+ (* -1/2 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212299.291 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.291 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.291 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.291 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.291 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.292 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212299.292 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212299.292 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.292 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.292 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.292 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.292 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.292 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.292 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.293 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.293 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212299.293 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212299.293 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.293 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.293 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.293 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.293 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212299.294 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212299.294 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.294 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.294 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.294 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.294 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.294 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.294 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.295 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.295 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212299.295 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.296 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.296 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.296 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.296 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.296 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.297 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.297 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212299.297 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.297 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.298 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))) into 0
1545212299.298 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))))))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212299.298 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212299.298 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.298 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.298 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.298 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.299 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.299 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212299.299 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.299 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.300 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.300 * [misc]backup-simplify:  Simplify (+ (* -1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212299.300 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.300 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.300 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.300 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.300 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.301 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.301 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.301 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.301 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.302 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.302 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.302 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.302 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.302 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.302 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.302 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.302 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.302 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.302 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.302 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.302 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.302 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.303 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212299.303 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212299.303 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212299.303 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.303 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.303 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.303 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.303 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.303 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.303 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.303 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.303 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.303 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.304 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.304 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.304 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.304 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.304 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.304 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.304 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.304 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.305 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.305 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.305 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212299.305 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.305 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.305 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.305 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.305 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.305 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.305 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.305 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.306 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212299.306 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.306 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212299.307 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212299.307 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.307 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.307 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.308 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.308 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212299.308 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.309 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212299.309 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212299.310 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.310 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.310 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))))) into 0
1545212299.311 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 2) (+ (* 2 (* 0 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))))
1545212299.311 * [misc]taylor:  Taking taylor expansion of (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of -1/8 in c0
1545212299.311 * [misc]backup-simplify:  Simplify -1/8 into -1/8
1545212299.311 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of (* (pow D 6) (* (pow h 3) (pow w 3))) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of (pow D 6) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.311 * [misc]backup-simplify:  Simplify D into D
1545212299.311 * [misc]taylor:  Taking taylor expansion of (* (pow h 3) (pow w 3)) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of (pow h 3) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.311 * [misc]backup-simplify:  Simplify h into h
1545212299.311 * [misc]taylor:  Taking taylor expansion of (pow w 3) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.311 * [misc]backup-simplify:  Simplify w into w
1545212299.311 * [misc]taylor:  Taking taylor expansion of (* (pow c0 3) (pow d 6)) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of (pow c0 3) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.311 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.311 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.311 * [misc]taylor:  Taking taylor expansion of (pow d 6) in c0
1545212299.311 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.311 * [misc]backup-simplify:  Simplify d into d
1545212299.311 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.311 * [misc]backup-simplify:  Simplify (* D (pow D 2)) into (pow D 3)
1545212299.312 * [misc]backup-simplify:  Simplify (* (pow D 3) (pow D 3)) into (pow D 6)
1545212299.312 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212299.312 * [misc]backup-simplify:  Simplify (* h (pow h 2)) into (pow h 3)
1545212299.312 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212299.312 * [misc]backup-simplify:  Simplify (* w (pow w 2)) into (pow w 3)
1545212299.312 * [misc]backup-simplify:  Simplify (* (pow h 3) (pow w 3)) into (* (pow h 3) (pow w 3))
1545212299.312 * [misc]backup-simplify:  Simplify (* (pow D 6) (* (pow h 3) (pow w 3))) into (* (pow D 6) (* (pow h 3) (pow w 3)))
1545212299.312 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.312 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.312 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.312 * [misc]backup-simplify:  Simplify (* d (pow d 2)) into (pow d 3)
1545212299.312 * [misc]backup-simplify:  Simplify (* (pow d 3) (pow d 3)) into (pow d 6)
1545212299.312 * [misc]backup-simplify:  Simplify (* 1 (pow d 6)) into (pow d 6)
1545212299.312 * [misc]backup-simplify:  Simplify (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) into (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))
1545212299.313 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.313 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.313 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212299.313 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212299.313 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212299.313 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 (pow h 2))) into 0
1545212299.313 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212299.314 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.314 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212299.314 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (pow w 2))) into 0
1545212299.314 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.314 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212299.315 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3))))) into 0
1545212299.315 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.315 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 (pow D 2))) into 0
1545212299.315 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (* 0 (pow D 3))) into 0
1545212299.315 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (* 0 (pow w 3)))) into 0
1545212299.315 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.315 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212299.316 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (* 0 (pow D 3)))) into 0
1545212299.316 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (* 0 (pow w 3))) into 0
1545212299.316 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.316 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.316 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3))))) into 0
1545212299.317 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3)))))) into 0
1545212299.317 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.317 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.317 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.317 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.318 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 (pow d 2))) into 0
1545212299.318 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.318 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3))))) into 0
1545212299.318 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.318 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.318 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (* 0 (pow d 3)))) into 0
1545212299.319 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.319 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.319 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (* 0 (pow d 3))) into 0
1545212299.319 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.319 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.320 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6))))) into 0
1545212299.320 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (* 0 (* (pow h 3) (pow w 3)))) into 0
1545212299.320 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow d 6))) into 0
1545212299.320 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))))) into 0
1545212299.320 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 6)))) into 0
1545212299.320 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))) into 0
1545212299.321 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212299.321 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212299.322 * [misc]backup-simplify:  Simplify (+ (* -1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)))))) into 0
1545212299.322 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.322 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.322 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.322 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.322 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.322 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.322 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212299.323 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.323 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212299.323 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.324 * [misc]backup-simplify:  Simplify (+ (* -1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212299.324 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.324 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.324 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.324 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.324 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.325 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212299.325 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.325 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.325 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.326 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.326 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.326 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.326 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.326 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.326 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.326 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.326 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.326 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.326 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.326 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.326 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.327 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.327 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212299.327 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212299.328 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212299.328 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.328 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.328 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.328 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.328 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.328 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.328 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.328 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.328 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.328 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.329 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.330 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.330 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.331 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212299.331 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.331 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.331 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.331 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.331 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.332 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.332 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.332 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.332 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.332 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.332 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.332 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.332 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.332 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.333 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.333 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212299.333 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.333 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.333 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.334 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.334 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.334 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.335 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212299.335 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212299.336 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212299.337 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212299.337 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212299.338 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.339 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.339 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.339 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212299.340 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212299.341 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212299.341 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212299.342 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212299.343 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.343 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.344 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))))) into 0
1545212299.345 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))))) (* 2 (* (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212299.346 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212299.346 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.346 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.346 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.346 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212299.347 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2)))))) into 0
1545212299.347 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212299.348 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2)))))) into 0
1545212299.349 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3)))))) into 0
1545212299.349 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.350 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212299.351 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3)))))) into 0
1545212299.351 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))))) into 0
1545212299.352 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.352 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212299.352 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3)))))) into 0
1545212299.352 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212299.353 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212299.353 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6)))))) into 0
1545212299.353 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212299.354 * [misc]backup-simplify:  Simplify (+ (* -1/8 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))))))) into 0
1545212299.354 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.354 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.354 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.354 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.355 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.355 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212299.355 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212299.356 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212299.356 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212299.356 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212299.357 * [misc]backup-simplify:  Simplify (+ (* -1/2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))))) into 0
1545212299.357 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.357 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.357 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.357 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.357 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212299.358 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212299.358 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212299.358 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212299.359 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212299.359 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212299.359 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.359 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.359 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.359 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.359 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.359 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.359 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.359 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.359 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.360 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.361 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212299.361 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212299.361 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212299.362 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.362 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.363 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.363 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.364 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212299.364 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212299.365 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212299.365 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.365 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.365 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.366 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.366 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.366 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.366 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.366 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.366 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.366 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.366 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.366 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.366 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.366 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.367 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212299.367 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.367 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) (* c0 1)))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212299.368 * [misc]backup-simplify:  Simplify (sqrt (* (+ (/ 1 M) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) (- (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) (/ 1 M)))) into (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))
1545212299.368 * [misc]approximate:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in (M c0 h w d D) around 0
1545212299.368 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in D
1545212299.368 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in D
1545212299.368 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212299.368 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212299.368 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.368 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.368 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.368 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.368 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.368 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.368 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.368 * [misc]backup-simplify:  Simplify h into h
1545212299.368 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.368 * [misc]backup-simplify:  Simplify w into w
1545212299.368 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212299.368 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.368 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.368 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.368 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.368 * [misc]backup-simplify:  Simplify d into d
1545212299.369 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.369 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.369 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.369 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.369 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.369 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212299.369 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212299.369 * [misc]taylor:  Taking taylor expansion of M in D
1545212299.369 * [misc]backup-simplify:  Simplify M into M
1545212299.369 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.369 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212299.369 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212299.369 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.369 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.369 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.369 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.369 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.369 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.369 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.369 * [misc]backup-simplify:  Simplify h into h
1545212299.369 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.369 * [misc]backup-simplify:  Simplify w into w
1545212299.369 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212299.369 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.369 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.369 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.369 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.369 * [misc]backup-simplify:  Simplify d into d
1545212299.369 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.369 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.369 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.369 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.369 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.370 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212299.370 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212299.370 * [misc]taylor:  Taking taylor expansion of M in D
1545212299.370 * [misc]backup-simplify:  Simplify M into M
1545212299.370 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.370 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212299.370 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212299.370 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212299.370 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212299.371 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212299.371 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.371 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.371 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.371 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.371 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.371 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) 0) (* 0 (/ 1 M))) into 0
1545212299.371 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212299.371 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in d
1545212299.371 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in d
1545212299.371 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212299.371 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212299.371 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.371 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.371 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.371 * [misc]backup-simplify:  Simplify D into D
1545212299.371 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.371 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.372 * [misc]backup-simplify:  Simplify h into h
1545212299.372 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.372 * [misc]backup-simplify:  Simplify w into w
1545212299.372 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.372 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.372 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.372 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.372 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.372 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.372 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.372 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.372 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.372 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212299.372 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.372 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of M in d
1545212299.372 * [misc]backup-simplify:  Simplify M into M
1545212299.372 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.372 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.372 * [misc]backup-simplify:  Simplify D into D
1545212299.372 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.372 * [misc]backup-simplify:  Simplify h into h
1545212299.372 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.372 * [misc]backup-simplify:  Simplify w into w
1545212299.372 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.372 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.372 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.372 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.372 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.372 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.372 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.372 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.373 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.373 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.373 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212299.373 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.373 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212299.373 * [misc]taylor:  Taking taylor expansion of M in d
1545212299.373 * [misc]backup-simplify:  Simplify M into M
1545212299.373 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.373 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.373 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.373 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) c0) (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212299.373 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212299.374 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.374 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.374 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.374 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.374 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212299.374 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212299.374 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.374 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.374 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.374 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.375 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.375 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212299.375 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212299.375 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.375 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) c0) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212299.375 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212299.375 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in w
1545212299.375 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in w
1545212299.375 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212299.375 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212299.375 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.375 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.375 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.375 * [misc]backup-simplify:  Simplify D into D
1545212299.376 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.376 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.376 * [misc]backup-simplify:  Simplify h into h
1545212299.376 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.376 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.376 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.376 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212299.376 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.376 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.376 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.376 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.376 * [misc]backup-simplify:  Simplify d into d
1545212299.376 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.376 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.376 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.376 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.376 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.376 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.376 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.376 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.376 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.376 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212299.376 * [misc]taylor:  Taking taylor expansion of M in w
1545212299.376 * [misc]backup-simplify:  Simplify M into M
1545212299.376 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.376 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212299.376 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212299.377 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.377 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.377 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.377 * [misc]backup-simplify:  Simplify D into D
1545212299.377 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.377 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.377 * [misc]backup-simplify:  Simplify h into h
1545212299.377 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.377 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.377 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.377 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212299.377 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.377 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.377 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.377 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.377 * [misc]backup-simplify:  Simplify d into d
1545212299.377 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.377 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.377 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.377 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.377 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.377 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.377 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.377 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.377 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.377 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212299.377 * [misc]taylor:  Taking taylor expansion of M in w
1545212299.377 * [misc]backup-simplify:  Simplify M into M
1545212299.378 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.378 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212299.378 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212299.378 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212299.378 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212299.378 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212299.378 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.378 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.378 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.378 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.378 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.379 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (/ (* (pow D 2) h) (* c0 (pow d 2))) (/ 1 M))) into 0
1545212299.379 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212299.379 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in h
1545212299.379 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in h
1545212299.379 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212299.379 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212299.379 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.379 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.379 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.379 * [misc]backup-simplify:  Simplify D into D
1545212299.379 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.379 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.379 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.379 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.379 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.379 * [misc]backup-simplify:  Simplify w into w
1545212299.379 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212299.379 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.379 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.379 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.379 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.379 * [misc]backup-simplify:  Simplify d into d
1545212299.379 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.379 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.379 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.379 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.379 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.380 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.380 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.380 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.380 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212299.380 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212299.380 * [misc]taylor:  Taking taylor expansion of M in h
1545212299.380 * [misc]backup-simplify:  Simplify M into M
1545212299.380 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.380 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212299.380 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212299.380 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.380 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.380 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.380 * [misc]backup-simplify:  Simplify D into D
1545212299.380 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.380 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.380 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.380 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.380 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.380 * [misc]backup-simplify:  Simplify w into w
1545212299.380 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212299.380 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.380 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.380 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.380 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.380 * [misc]backup-simplify:  Simplify d into d
1545212299.380 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.380 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.380 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.380 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.380 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.381 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.381 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.381 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.381 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212299.381 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212299.381 * [misc]taylor:  Taking taylor expansion of M in h
1545212299.381 * [misc]backup-simplify:  Simplify M into M
1545212299.381 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.381 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212299.381 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212299.381 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212299.381 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212299.381 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212299.381 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.381 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212299.382 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.382 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.382 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212299.382 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (/ (* (pow D 2) w) (* c0 (pow d 2))) (/ 1 M))) into (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M))))
1545212299.382 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M)))) (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212299.383 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.383 * [misc]backup-simplify:  Simplify D into D
1545212299.383 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.383 * [misc]backup-simplify:  Simplify h into h
1545212299.383 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.383 * [misc]backup-simplify:  Simplify w into w
1545212299.383 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.383 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.383 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.383 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.383 * [misc]backup-simplify:  Simplify d into d
1545212299.383 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.383 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.383 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.383 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.383 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.383 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.383 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.383 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.383 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212299.383 * [misc]taylor:  Taking taylor expansion of M in c0
1545212299.383 * [misc]backup-simplify:  Simplify M into M
1545212299.383 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.384 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212299.384 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212299.384 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.384 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.384 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.384 * [misc]backup-simplify:  Simplify D into D
1545212299.384 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.384 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.384 * [misc]backup-simplify:  Simplify h into h
1545212299.384 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.384 * [misc]backup-simplify:  Simplify w into w
1545212299.384 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212299.384 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.384 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.384 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.384 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.384 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.384 * [misc]backup-simplify:  Simplify d into d
1545212299.384 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.384 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.384 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.384 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.384 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212299.384 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.384 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212299.384 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.384 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212299.384 * [misc]taylor:  Taking taylor expansion of M in c0
1545212299.384 * [misc]backup-simplify:  Simplify M into M
1545212299.384 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.385 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.385 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.385 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212299.385 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.385 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.385 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.385 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.385 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.386 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212299.386 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.386 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212299.386 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.386 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.386 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.386 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.387 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212299.387 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.387 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212299.387 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212299.387 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 1 M)) (* (- (/ 1 M)) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212299.387 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212299.387 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.388 * [misc]backup-simplify:  Simplify D into D
1545212299.388 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.388 * [misc]backup-simplify:  Simplify h into h
1545212299.388 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.388 * [misc]backup-simplify:  Simplify w into w
1545212299.388 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.388 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.388 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.388 * [misc]backup-simplify:  Simplify d into d
1545212299.388 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.388 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.388 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.388 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.388 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.388 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.388 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.388 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.388 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.388 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.388 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.388 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.389 * [misc]backup-simplify:  Simplify D into D
1545212299.389 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212299.389 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.389 * [misc]backup-simplify:  Simplify h into h
1545212299.389 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.389 * [misc]backup-simplify:  Simplify w into w
1545212299.389 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212299.389 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.389 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.389 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.389 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.389 * [misc]backup-simplify:  Simplify d into d
1545212299.389 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.389 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.389 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.389 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.389 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.389 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.389 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212299.389 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.389 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.389 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.389 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.389 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212299.389 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212299.389 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212299.390 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212299.390 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.390 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.390 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212299.390 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.390 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.390 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212299.391 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212299.391 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212299.392 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212299.392 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212299.392 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212299.392 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212299.392 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212299.392 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.392 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.392 * [misc]backup-simplify:  Simplify D into D
1545212299.392 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212299.392 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.392 * [misc]backup-simplify:  Simplify h into h
1545212299.392 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.392 * [misc]backup-simplify:  Simplify w into w
1545212299.392 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212299.392 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.392 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.392 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.392 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.392 * [misc]backup-simplify:  Simplify d into d
1545212299.392 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.392 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.392 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.392 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.392 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.393 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.393 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212299.393 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.393 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.393 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.393 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.393 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212299.393 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212299.393 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212299.393 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.393 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.393 * [misc]backup-simplify:  Simplify D into D
1545212299.393 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212299.393 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.393 * [misc]backup-simplify:  Simplify h into h
1545212299.393 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.393 * [misc]backup-simplify:  Simplify w into w
1545212299.393 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212299.393 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.393 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.393 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.393 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.393 * [misc]backup-simplify:  Simplify d into d
1545212299.394 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.394 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.394 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.394 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.394 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212299.394 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.394 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212299.394 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.394 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.394 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.395 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212299.395 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212299.395 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212299.395 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212299.395 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.395 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.396 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212299.396 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.396 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.396 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212299.397 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212299.398 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212299.398 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212299.398 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.398 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.398 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.399 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.399 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212299.399 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.399 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212299.399 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212299.399 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.399 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.399 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.399 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212299.399 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212299.399 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.400 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.400 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.400 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212299.400 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212299.400 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.400 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.400 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.400 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.401 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.401 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.401 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.401 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.401 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.402 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.402 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.402 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.402 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.402 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.402 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.402 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212299.403 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.403 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.403 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.403 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.405 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212299.406 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212299.406 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) in c0
1545212299.406 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212299.406 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212299.406 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))) in c0
1545212299.406 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212299.406 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212299.406 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.406 * [misc]backup-simplify:  Simplify D into D
1545212299.406 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212299.406 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212299.406 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.406 * [misc]backup-simplify:  Simplify h into h
1545212299.406 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212299.406 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.406 * [misc]backup-simplify:  Simplify w into w
1545212299.406 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (* (pow c0 2) (sqrt -1))) in c0
1545212299.406 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212299.406 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.406 * [misc]backup-simplify:  Simplify d into d
1545212299.407 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (sqrt -1)) in c0
1545212299.407 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212299.407 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.407 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.407 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.407 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212299.407 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.407 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.407 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.407 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.407 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.407 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212299.407 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212299.407 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212299.408 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212299.408 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212299.408 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.408 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212299.408 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.408 * [misc]backup-simplify:  Simplify (* 1 (sqrt -1)) into (sqrt -1)
1545212299.409 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212299.409 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212299.409 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212299.409 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212299.409 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212299.409 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.410 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212299.410 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212299.410 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.410 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (sqrt -1))) into 0
1545212299.410 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.410 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212299.411 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212299.411 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212299.412 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.412 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.412 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.413 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.413 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.413 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.413 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.413 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.413 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.413 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.414 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.414 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.414 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.414 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.414 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.415 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.415 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.415 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.415 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.415 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.416 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.416 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.416 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212299.417 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212299.417 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212299.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.417 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.417 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.417 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212299.417 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.418 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212299.418 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212299.419 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.419 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.419 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212299.419 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.420 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.420 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212299.420 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212299.421 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212299.421 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.421 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.421 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.421 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.421 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.421 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.421 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.421 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.421 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.421 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.421 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.421 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.422 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.422 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.422 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.422 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.422 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.422 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.422 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.422 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.422 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.422 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.422 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.423 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.423 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.423 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.423 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.423 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.423 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.423 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.423 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.424 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.424 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.424 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.424 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.424 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.424 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.424 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.424 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.425 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212299.425 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212299.425 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.425 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.425 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.425 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.425 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.426 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.426 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.426 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.426 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.427 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.427 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.427 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.427 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.427 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.428 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.428 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.428 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.429 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.429 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.429 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.429 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.430 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212299.431 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212299.431 * [misc]taylor:  Taking taylor expansion of (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of -1/8 in c0
1545212299.431 * [misc]backup-simplify:  Simplify -1/8 into -1/8
1545212299.431 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.431 * [misc]backup-simplify:  Simplify D into D
1545212299.431 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.431 * [misc]backup-simplify:  Simplify h into h
1545212299.431 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.431 * [misc]backup-simplify:  Simplify w into w
1545212299.431 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.431 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.431 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.431 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.431 * [misc]backup-simplify:  Simplify d into d
1545212299.431 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212299.431 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.431 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.431 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.431 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.431 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.431 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212299.432 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212299.432 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212299.432 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212299.432 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212299.432 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212299.432 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212299.432 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212299.432 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.432 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.432 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.432 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212299.432 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212299.432 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212299.433 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212299.433 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212299.433 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212299.433 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212299.434 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.434 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212299.434 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.434 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212299.434 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212299.434 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212299.434 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212299.434 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.435 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212299.435 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212299.435 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.435 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212299.435 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212299.435 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.436 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212299.436 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212299.436 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212299.436 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.436 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212299.436 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212299.436 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212299.437 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.437 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.437 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212299.437 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212299.438 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.438 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.439 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212299.439 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212299.439 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212299.439 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212299.439 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.439 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212299.439 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212299.440 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212299.440 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.440 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.440 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212299.440 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212299.441 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.441 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.441 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212299.441 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212299.442 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.442 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.442 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212299.442 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.442 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.442 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212299.443 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.443 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.443 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.443 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212299.444 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212299.444 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.445 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212299.445 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212299.446 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.446 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.447 * [misc]backup-simplify:  Simplify (+ (* -1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212299.447 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.447 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.447 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.447 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.447 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.447 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.447 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.448 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.448 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.448 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212299.448 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.448 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.449 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212299.449 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.449 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.449 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212299.450 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.450 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.450 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212299.451 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212299.451 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212299.451 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.452 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.452 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.453 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.454 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.454 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 M)))))))) into (* (sqrt -1) M)
1545212299.455 * [misc]backup-simplify:  Simplify (sqrt (* (+ (/ 1 (- M)) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) (- (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) (/ 1 (- M))))) into (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))
1545212299.455 * [misc]approximate:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in (M c0 h w d D) around 0
1545212299.455 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in D
1545212299.455 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in D
1545212299.455 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212299.455 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.455 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in D
1545212299.455 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212299.455 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212299.455 * [misc]taylor:  Taking taylor expansion of M in D
1545212299.455 * [misc]backup-simplify:  Simplify M into M
1545212299.455 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.455 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212299.455 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.455 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.455 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.455 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.455 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.455 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.456 * [misc]backup-simplify:  Simplify h into h
1545212299.456 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.456 * [misc]backup-simplify:  Simplify w into w
1545212299.456 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.456 * [misc]backup-simplify:  Simplify d into d
1545212299.456 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.456 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.456 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.456 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.456 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.456 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.456 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.456 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212299.456 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of M in D
1545212299.456 * [misc]backup-simplify:  Simplify M into M
1545212299.456 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.456 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of D in D
1545212299.456 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.456 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.456 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of h in D
1545212299.456 * [misc]backup-simplify:  Simplify h into h
1545212299.456 * [misc]taylor:  Taking taylor expansion of w in D
1545212299.456 * [misc]backup-simplify:  Simplify w into w
1545212299.456 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212299.456 * [misc]taylor:  Taking taylor expansion of d in D
1545212299.456 * [misc]backup-simplify:  Simplify d into d
1545212299.456 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212299.456 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.457 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.457 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.457 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212299.457 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.457 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.457 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212299.457 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212299.457 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212299.457 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212299.457 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212299.457 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212299.457 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.457 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.457 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.457 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.458 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) 0) (* 0 (/ 1 M))) into 0
1545212299.458 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212299.458 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212299.458 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212299.458 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.458 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of M in d
1545212299.458 * [misc]backup-simplify:  Simplify M into M
1545212299.458 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.458 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.458 * [misc]backup-simplify:  Simplify D into D
1545212299.458 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.458 * [misc]backup-simplify:  Simplify h into h
1545212299.458 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.458 * [misc]backup-simplify:  Simplify w into w
1545212299.458 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.458 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.458 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.458 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.458 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.458 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.458 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.458 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.458 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.458 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.459 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212299.459 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.459 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212299.459 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212299.459 * [misc]taylor:  Taking taylor expansion of M in d
1545212299.459 * [misc]backup-simplify:  Simplify M into M
1545212299.459 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.459 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212299.459 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212299.459 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212299.459 * [misc]taylor:  Taking taylor expansion of D in d
1545212299.459 * [misc]backup-simplify:  Simplify D into D
1545212299.459 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212299.459 * [misc]taylor:  Taking taylor expansion of h in d
1545212299.459 * [misc]backup-simplify:  Simplify h into h
1545212299.459 * [misc]taylor:  Taking taylor expansion of w in d
1545212299.459 * [misc]backup-simplify:  Simplify w into w
1545212299.459 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212299.459 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212299.459 * [misc]taylor:  Taking taylor expansion of d in d
1545212299.459 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.459 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.459 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212299.459 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.459 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.459 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.459 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.459 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.459 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212299.459 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212299.459 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) c0)) into (- (/ (* (pow D 2) (* h w)) c0))
1545212299.460 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) c0))) into (- (/ (* (pow D 2) (* h w)) c0))
1545212299.460 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 2) (* h w)) c0)
1545212299.460 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) c0)) (/ (* (pow D 2) (* h w)) c0)) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))
1545212299.460 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212299.460 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212299.460 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.460 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.461 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.461 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.461 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212299.461 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212299.461 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.461 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.461 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.461 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.461 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.462 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212299.462 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212299.462 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.462 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.462 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) c0)) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212299.463 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212299.463 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212299.463 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212299.463 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.463 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of M in w
1545212299.463 * [misc]backup-simplify:  Simplify M into M
1545212299.463 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.463 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.463 * [misc]backup-simplify:  Simplify D into D
1545212299.463 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.463 * [misc]backup-simplify:  Simplify h into h
1545212299.463 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.463 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.463 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.463 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.463 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.463 * [misc]backup-simplify:  Simplify d into d
1545212299.463 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.463 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.463 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.463 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.463 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.464 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.464 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.464 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.464 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.464 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.464 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.464 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212299.464 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212299.464 * [misc]taylor:  Taking taylor expansion of M in w
1545212299.464 * [misc]backup-simplify:  Simplify M into M
1545212299.464 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.464 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212299.464 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212299.464 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212299.464 * [misc]taylor:  Taking taylor expansion of D in w
1545212299.464 * [misc]backup-simplify:  Simplify D into D
1545212299.464 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212299.464 * [misc]taylor:  Taking taylor expansion of h in w
1545212299.464 * [misc]backup-simplify:  Simplify h into h
1545212299.464 * [misc]taylor:  Taking taylor expansion of w in w
1545212299.464 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.464 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.464 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212299.464 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212299.464 * [misc]taylor:  Taking taylor expansion of d in w
1545212299.464 * [misc]backup-simplify:  Simplify d into d
1545212299.464 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212299.464 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.464 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.464 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212299.465 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.465 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212299.465 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.465 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212299.465 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.465 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.465 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.465 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212299.465 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212299.465 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212299.465 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212299.465 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212299.465 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.466 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212299.466 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.466 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212299.466 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) h) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212299.466 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) (/ 1 M))) into 0
1545212299.467 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212299.467 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212299.467 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212299.467 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.467 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of M in h
1545212299.467 * [misc]backup-simplify:  Simplify M into M
1545212299.467 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.467 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.467 * [misc]backup-simplify:  Simplify D into D
1545212299.467 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.467 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.467 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.467 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.467 * [misc]backup-simplify:  Simplify w into w
1545212299.467 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.467 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.467 * [misc]backup-simplify:  Simplify d into d
1545212299.467 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.467 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.467 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.467 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.467 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.467 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.468 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.468 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.468 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.468 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.468 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212299.468 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212299.468 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212299.468 * [misc]taylor:  Taking taylor expansion of M in h
1545212299.468 * [misc]backup-simplify:  Simplify M into M
1545212299.468 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.468 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212299.468 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212299.468 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212299.468 * [misc]taylor:  Taking taylor expansion of D in h
1545212299.469 * [misc]backup-simplify:  Simplify D into D
1545212299.469 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212299.469 * [misc]taylor:  Taking taylor expansion of h in h
1545212299.469 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.469 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.469 * [misc]taylor:  Taking taylor expansion of w in h
1545212299.469 * [misc]backup-simplify:  Simplify w into w
1545212299.469 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212299.469 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212299.469 * [misc]taylor:  Taking taylor expansion of d in h
1545212299.469 * [misc]backup-simplify:  Simplify d into d
1545212299.469 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212299.469 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.469 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.469 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212299.469 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212299.469 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212299.469 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.470 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212299.470 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.470 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.470 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212299.470 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212299.470 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212299.470 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212299.470 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212299.471 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212299.471 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.471 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) w) (* (pow d 2) c0))) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212299.471 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212299.471 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (* (pow d 2) c0))) into (- (/ (* (pow D 2) w) (* c0 (pow d 2))))
1545212299.472 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) w) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) w) (* (pow d 2) c0)))
1545212299.472 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) w) (* (pow d 2) c0))) (/ 1 M))) into 0
1545212299.473 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212299.473 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212299.473 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.473 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.473 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of M in c0
1545212299.473 * [misc]backup-simplify:  Simplify M into M
1545212299.473 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.473 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.473 * [misc]backup-simplify:  Simplify D into D
1545212299.473 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.473 * [misc]backup-simplify:  Simplify h into h
1545212299.473 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.473 * [misc]backup-simplify:  Simplify w into w
1545212299.473 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.473 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.474 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.474 * [misc]backup-simplify:  Simplify d into d
1545212299.474 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.474 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.474 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.474 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.474 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.474 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.474 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.474 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.474 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.474 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.475 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.475 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212299.475 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212299.475 * [misc]taylor:  Taking taylor expansion of M in c0
1545212299.475 * [misc]backup-simplify:  Simplify M into M
1545212299.475 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212299.475 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212299.475 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212299.475 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212299.475 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.475 * [misc]backup-simplify:  Simplify D into D
1545212299.475 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212299.475 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.475 * [misc]backup-simplify:  Simplify h into h
1545212299.475 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.475 * [misc]backup-simplify:  Simplify w into w
1545212299.475 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212299.475 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212299.475 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.475 * [misc]backup-simplify:  Simplify d into d
1545212299.475 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.475 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.475 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.475 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.475 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.475 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.476 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.476 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212299.476 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.476 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212299.476 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.476 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212299.477 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (pow d 2)))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212299.477 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.478 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212299.478 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212299.478 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212299.478 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.478 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.479 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.479 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.479 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.480 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.480 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212299.480 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.480 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.480 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.480 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.481 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212299.481 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212299.481 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.481 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212299.482 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ 1 M)) (* (/ 1 M) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212299.484 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212299.484 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212299.484 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212299.484 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212299.484 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212299.484 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.484 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212299.484 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212299.484 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212299.484 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.484 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.484 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.485 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.485 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212299.485 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212299.485 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.485 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.485 * [misc]backup-simplify:  Simplify D into D
1545212299.485 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212299.485 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.485 * [misc]backup-simplify:  Simplify h into h
1545212299.485 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.485 * [misc]backup-simplify:  Simplify w into w
1545212299.485 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212299.485 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.485 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.485 * [misc]backup-simplify:  Simplify d into d
1545212299.485 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.485 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.485 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.485 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.485 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.485 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.485 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.486 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.486 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212299.486 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212299.486 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.486 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.486 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.486 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.486 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212299.486 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212299.486 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.486 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.486 * [misc]backup-simplify:  Simplify D into D
1545212299.486 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212299.486 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.486 * [misc]backup-simplify:  Simplify h into h
1545212299.486 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.486 * [misc]backup-simplify:  Simplify w into w
1545212299.486 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212299.486 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.486 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.487 * [misc]backup-simplify:  Simplify d into d
1545212299.487 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.487 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.487 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.487 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.487 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.487 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.487 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.487 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.487 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212299.488 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212299.488 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.488 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212299.488 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.489 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.489 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212299.489 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.490 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212299.490 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212299.491 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212299.491 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212299.491 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.491 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212299.491 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212299.492 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.492 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.492 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.492 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.492 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.492 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.492 * [misc]backup-simplify:  Simplify D into D
1545212299.492 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.492 * [misc]backup-simplify:  Simplify h into h
1545212299.492 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.492 * [misc]backup-simplify:  Simplify w into w
1545212299.492 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.492 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.492 * [misc]backup-simplify:  Simplify d into d
1545212299.492 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.492 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.492 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.493 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.493 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.493 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.493 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.493 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.493 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212299.493 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212299.493 * [misc]taylor:  Taking taylor expansion of M in M
1545212299.493 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.493 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.493 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212299.493 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212299.493 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212299.493 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212299.493 * [misc]taylor:  Taking taylor expansion of D in M
1545212299.493 * [misc]backup-simplify:  Simplify D into D
1545212299.494 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212299.494 * [misc]taylor:  Taking taylor expansion of h in M
1545212299.494 * [misc]backup-simplify:  Simplify h into h
1545212299.494 * [misc]taylor:  Taking taylor expansion of w in M
1545212299.494 * [misc]backup-simplify:  Simplify w into w
1545212299.494 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212299.494 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212299.494 * [misc]taylor:  Taking taylor expansion of d in M
1545212299.494 * [misc]backup-simplify:  Simplify d into d
1545212299.494 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212299.494 * [misc]backup-simplify:  Simplify c0 into c0
1545212299.494 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.494 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212299.494 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212299.494 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.494 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212299.494 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212299.495 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212299.495 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212299.495 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.495 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212299.495 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.495 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.496 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212299.496 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212299.496 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212299.497 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212299.498 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212299.498 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212299.498 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.498 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212299.498 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.498 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.498 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.499 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.499 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212299.499 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.499 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212299.499 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212299.499 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.499 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.499 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.499 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212299.499 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212299.499 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.500 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.500 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.500 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212299.500 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212299.500 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.500 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.500 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.501 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.501 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.501 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.501 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.501 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.501 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212299.502 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.502 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.502 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.502 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212299.502 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.503 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212299.503 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.503 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212299.503 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.503 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.504 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.505 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))
1545212299.506 * [misc]backup-simplify:  Simplify (+ (* -1 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212299.507 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212299.507 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) in c0
1545212299.507 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212299.507 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212299.507 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))) in c0
1545212299.507 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212299.507 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212299.507 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.507 * [misc]backup-simplify:  Simplify D into D
1545212299.507 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212299.507 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212299.507 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.507 * [misc]backup-simplify:  Simplify h into h
1545212299.507 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212299.508 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.508 * [misc]backup-simplify:  Simplify w into w
1545212299.508 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (* (pow c0 2) (sqrt -1))) in c0
1545212299.508 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212299.508 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.508 * [misc]backup-simplify:  Simplify d into d
1545212299.508 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (sqrt -1)) in c0
1545212299.508 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212299.508 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.508 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.508 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.508 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212299.508 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.508 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.508 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.508 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.508 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.508 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212299.509 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212299.509 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212299.509 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212299.509 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212299.509 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.509 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212299.509 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.510 * [misc]backup-simplify:  Simplify (* 1 (sqrt -1)) into (sqrt -1)
1545212299.510 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212299.510 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212299.510 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212299.510 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212299.511 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212299.511 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.511 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212299.511 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212299.511 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.512 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (sqrt -1))) into 0
1545212299.512 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.512 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212299.512 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212299.513 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212299.514 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212299.514 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.514 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.514 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.514 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.514 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.514 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.514 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.514 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.514 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.514 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.514 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.514 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.515 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.515 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.515 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.515 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.515 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.515 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.515 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.515 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.516 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.516 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.516 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.516 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.517 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212299.517 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.517 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.518 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.518 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.518 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.519 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212299.519 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.519 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212299.520 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.520 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.520 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.521 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212299.522 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1)))) into 0
1545212299.523 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212299.523 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212299.523 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.524 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.524 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.524 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212299.524 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.525 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212299.525 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212299.527 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.527 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.527 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212299.527 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.528 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.528 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212299.529 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212299.530 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212299.530 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.530 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.530 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.530 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.530 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.530 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.530 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.530 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.530 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.530 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.530 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.530 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.532 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.532 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.532 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.532 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.532 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.532 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.532 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.532 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.532 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.532 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.532 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.532 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.532 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.532 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.532 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.533 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.533 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.533 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.533 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.534 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.534 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.534 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.534 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.534 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.534 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.534 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.534 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.534 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.534 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.534 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.534 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.535 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.536 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.536 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.536 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.536 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212299.536 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212299.536 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.536 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.537 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.537 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.537 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.538 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.538 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.539 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.539 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.539 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212299.540 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.540 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.541 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212299.541 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.541 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.542 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212299.542 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.543 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212299.543 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212299.544 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212299.544 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212299.545 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212299.546 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))))) into 0
1545212299.547 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212299.548 * [misc]taylor:  Taking taylor expansion of (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of -1/8 in c0
1545212299.548 * [misc]backup-simplify:  Simplify -1/8 into -1/8
1545212299.548 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of D in c0
1545212299.548 * [misc]backup-simplify:  Simplify D into D
1545212299.548 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of h in c0
1545212299.548 * [misc]backup-simplify:  Simplify h into h
1545212299.548 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of w in c0
1545212299.548 * [misc]backup-simplify:  Simplify w into w
1545212299.548 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212299.548 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.548 * [misc]backup-simplify:  Simplify 1 into 1
1545212299.548 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of d in c0
1545212299.548 * [misc]backup-simplify:  Simplify d into d
1545212299.548 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212299.548 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212299.548 * [misc]backup-simplify:  Simplify -1 into -1
1545212299.549 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212299.549 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212299.549 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212299.549 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212299.549 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212299.549 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212299.549 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212299.549 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212299.549 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212299.549 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212299.550 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212299.550 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.550 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212299.550 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212299.550 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212299.550 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212299.550 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212299.551 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212299.551 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212299.551 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212299.552 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212299.552 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.552 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212299.553 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212299.553 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212299.553 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212299.553 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212299.554 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212299.554 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212299.554 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212299.554 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212299.555 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.555 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212299.556 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212299.556 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212299.556 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212299.556 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212299.556 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212299.557 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212299.557 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212299.557 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212299.557 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212299.558 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.558 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.559 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212299.559 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212299.561 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212299.561 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.561 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212299.562 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212299.562 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212299.562 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212299.562 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212299.562 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212299.563 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212299.563 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212299.563 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212299.564 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212299.564 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212299.564 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212299.565 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.565 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.566 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212299.566 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212299.566 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.566 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212299.567 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212299.567 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.567 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212299.568 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212299.568 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.568 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.569 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.569 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212299.569 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212299.570 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.571 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212299.571 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212299.572 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.574 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212299.575 * [misc]backup-simplify:  Simplify (+ (* -1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212299.575 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.575 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.575 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.575 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.575 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.575 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.575 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.575 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.575 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.575 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.575 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.575 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.575 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212299.576 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212299.576 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212299.577 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212299.577 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212299.577 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212299.578 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.578 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212299.578 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212299.579 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212299.579 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212299.579 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212299.581 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212299.581 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212299.581 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.581 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.582 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.582 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.583 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.584 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.584 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212299.585 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.585 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.585 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.586 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212299.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.586 * [misc]backup-simplify:  Simplify 0 into 0
1545212299.586 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 (- M))))))))) into (* -1 (* (sqrt -1) M))
1545212299.586 * * * [misc]progress:  simplifying candidates
1545212299.586 * * * * [misc]progress:  [ 1 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (* (exp (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212299.586 * [enter]simplify:  Simplifying (* (exp (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))
1545212299.587 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212299.593 * * [misc]simplify:  iters left: 5 (46 enodes)
1545212299.609 * * [misc]simplify:  iters left: 4 (131 enodes)
1545212299.666 * * [misc]simplify:  iters left: 3 (407 enodes)
1545212300.014 * [exit]simplify:  Simplified to (exp (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))
1545212300.014 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))))
1545212300.014 * * * * [misc]progress:  [ 2 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (pow (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) 1)))>
1545212300.015 * * * * [misc]progress:  [ 3 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212300.015 * * * * [misc]progress:  [ 4 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212300.015 * * * * [misc]progress:  [ 5 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (* (cbrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))) (cbrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))) (cbrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212300.015 * * * * [misc]progress:  [ 6 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (cbrt (* (* (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212300.015 * * * * [misc]progress:  [ 7 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (sqrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))) (sqrt (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212300.015 * * * * [misc]progress:  [ 8 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* (* w D) D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212300.015 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* (* w D) D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212300.016 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212300.030 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212300.078 * * [misc]simplify:  iters left: 4 (397 enodes)
1545212300.465 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D (* D w))) (* (* (/ c0 h) (* d d)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))))
1545212300.465 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D (* D w))) (* (* (/ c0 h) (* d d)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212300.466 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212300.466 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212300.480 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212300.511 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212300.843 * [exit]simplify:  Simplified to (* (* (* D D) w) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212300.844 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* (* w D) D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (* D D) w) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212300.844 * * * * [misc]progress:  [ 9 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212300.844 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212300.845 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212300.858 * * [misc]simplify:  iters left: 5 (97 enodes)
1545212300.908 * * [misc]simplify:  iters left: 4 (385 enodes)
1545212301.249 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* d d) (/ c0 (* w h)))) (* (* D D) (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))
1545212301.250 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* d d) (/ c0 (* w h)))) (* (* D D) (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212301.250 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212301.250 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212301.254 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212301.277 * * [misc]simplify:  iters left: 4 (272 enodes)
1545212301.558 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D D))
1545212301.558 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D D)))))
1545212301.559 * * * * [misc]progress:  [ 10 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212301.559 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212301.560 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212301.573 * * [misc]simplify:  iters left: 5 (99 enodes)
1545212301.598 * * [misc]simplify:  iters left: 4 (402 enodes)
1545212301.981 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* d (/ c0 h)) (/ d D))) (* (* D w) (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))
1545212301.981 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* d (/ c0 h)) (/ d D))) (* (* D w) (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212301.982 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212301.982 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212301.986 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212302.005 * * [misc]simplify:  iters left: 4 (277 enodes)
1545212302.217 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w))
1545212302.217 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w)))))
1545212302.217 * * * * [misc]progress:  [ 11 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212302.218 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212302.218 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212302.235 * * [misc]simplify:  iters left: 5 (94 enodes)
1545212302.281 * * [misc]simplify:  iters left: 4 (400 enodes)
1545212302.625 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (/ (/ (* d c0) (* w h)) (/ D d))))
1545212302.625 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (/ (/ (* d c0) (* w h)) (/ D d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212302.625 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212302.625 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212302.630 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212302.655 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212302.910 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D)
1545212302.910 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D))))
1545212302.910 * * * * [misc]progress:  [ 12 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212302.910 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212302.911 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212302.917 * * [misc]simplify:  iters left: 5 (99 enodes)
1545212302.956 * * [misc]simplify:  iters left: 4 (402 enodes)
1545212303.270 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ c0 (* (/ D d) (/ h d)))) (* (* D w) (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))
1545212303.270 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ c0 (* (/ D d) (/ h d)))) (* (* D w) (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212303.270 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212303.270 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212303.279 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212303.311 * * [misc]simplify:  iters left: 4 (277 enodes)
1545212303.639 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w))
1545212303.639 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D w)))))
1545212303.639 * * * * [misc]progress:  [ 13 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212303.640 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212303.640 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212303.653 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212303.700 * * [misc]simplify:  iters left: 4 (403 enodes)
1545212304.100 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (/ (/ c0 h) (* (/ D d) (/ w d)))))
1545212304.100 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (/ (/ c0 h) (* (/ D d) (/ w d))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212304.101 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212304.101 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212304.105 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212304.121 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212304.363 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D)
1545212304.363 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D))))
1545212304.364 * * * * [misc]progress:  [ 14 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212304.364 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212304.364 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212304.374 * * [misc]simplify:  iters left: 5 (96 enodes)
1545212304.422 * * [misc]simplify:  iters left: 4 (410 enodes)
1545212304.802 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ d D) (* (/ c0 h) (/ d D)))))
1545212304.802 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ d D) (* (/ c0 h) (/ d D))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212304.802 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212304.803 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212304.807 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212304.838 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212305.070 * [exit]simplify:  Simplified to (* w (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212305.070 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))))
1545212305.070 * * * * [misc]progress:  [ 15 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* (* w D) D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)))))>
1545212305.070 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* (* w D) D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d)))
1545212305.070 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212305.077 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212305.118 * * [misc]simplify:  iters left: 4 (371 enodes)
1545212305.435 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ (* d c0) (/ h d))))
1545212305.435 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ (* d c0) (/ h d)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)))))
1545212305.435 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D))
1545212305.436 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212305.440 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212305.461 * * [misc]simplify:  iters left: 4 (251 enodes)
1545212305.634 * [exit]simplify:  Simplified to (* (* w (* D D)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))
1545212305.634 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* (* w D) D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d))) (* (* w (* D D)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212305.634 * * * * [misc]progress:  [ 16 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))>
1545212305.635 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d)))
1545212305.635 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212305.641 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212305.666 * * [misc]simplify:  iters left: 4 (357 enodes)
1545212305.957 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (/ (* d d) w)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D)))
1545212305.957 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 h) (/ (* d d) w)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))
1545212305.957 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D))
1545212305.957 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212305.965 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212305.993 * * [misc]simplify:  iters left: 4 (231 enodes)
1545212306.182 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D D))
1545212306.182 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D D)))))
1545212306.182 * * * * [misc]progress:  [ 17 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212306.182 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d)))
1545212306.183 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212306.189 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212306.223 * * [misc]simplify:  iters left: 4 (372 enodes)
1545212306.553 * [exit]simplify:  Simplified to (+ (* (* (* d (/ c0 h)) (/ d D)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))
1545212306.553 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* d (/ c0 h)) (/ d D)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212306.554 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212306.554 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212306.562 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212306.589 * * [misc]simplify:  iters left: 4 (236 enodes)
1545212306.763 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w))
1545212306.763 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)))))
1545212306.764 * * * * [misc]progress:  [ 18 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212306.764 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212306.764 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212306.770 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212306.812 * * [misc]simplify:  iters left: 4 (364 enodes)
1545212307.126 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D) (* (* (/ d D) (/ (/ c0 h) (/ w d))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212307.126 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D) (* (* (/ d D) (/ (/ c0 h) (/ w d))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212307.126 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212307.126 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212307.130 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212307.156 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212307.313 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D)
1545212307.313 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D))))
1545212307.313 * * * * [misc]progress:  [ 19 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212307.313 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D))))
1545212307.314 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212307.330 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212307.364 * * [misc]simplify:  iters left: 4 (372 enodes)
1545212307.653 * [exit]simplify:  Simplified to (+ (* (/ (* (* d c0) d) (* D h)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))
1545212307.653 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (* d c0) d) (* D h)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212307.654 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212307.654 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212307.662 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212307.685 * * [misc]simplify:  iters left: 4 (236 enodes)
1545212307.865 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w))
1545212307.865 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)))))
1545212307.865 * * * * [misc]progress:  [ 20 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212307.865 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212307.865 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212307.875 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212307.918 * * [misc]simplify:  iters left: 4 (368 enodes)
1545212308.234 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212308.234 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212308.234 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212308.234 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212308.241 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212308.255 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212308.416 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D)
1545212308.416 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D))))
1545212308.416 * * * * [misc]progress:  [ 21 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))>
1545212308.416 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212308.417 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212308.423 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212308.462 * * [misc]simplify:  iters left: 4 (375 enodes)
1545212308.783 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (/ (* (/ d D) c0) (/ h (/ d D))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212308.783 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (/ (* (/ d D) c0) (/ h (/ d D))) (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))
1545212308.784 * [enter]simplify:  Simplifying (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w)
1545212308.784 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212308.789 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212308.803 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212309.011 * [exit]simplify:  Simplified to (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212309.012 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212309.012 * * * * [misc]progress:  [ 22 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* (* w D) D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212309.012 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* (* w D) D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212309.012 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212309.018 * * [misc]simplify:  iters left: 5 (96 enodes)
1545212309.048 * * [misc]simplify:  iters left: 4 (386 enodes)
1545212309.433 * [exit]simplify:  Simplified to (+ (* (* (* D D) w) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (* (/ c0 h) (* d d))))
1545212309.433 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (* (/ c0 h) (* d d)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212309.433 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212309.434 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212309.442 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212309.471 * * [misc]simplify:  iters left: 4 (249 enodes)
1545212309.647 * [exit]simplify:  Simplified to (* (* (* D D) w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212309.647 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* (* w D) D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (* D D) w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212309.648 * * * * [misc]progress:  [ 23 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212309.648 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212309.648 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212309.654 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212309.685 * * [misc]simplify:  iters left: 4 (372 enodes)
1545212310.061 * [exit]simplify:  Simplified to (+ (* (/ (* d (/ c0 h)) (/ w d)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)))
1545212310.062 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* d (/ c0 h)) (/ w d)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212310.062 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212310.062 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212310.066 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212310.096 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212310.308 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D))
1545212310.308 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)))))
1545212310.308 * * * * [misc]progress:  [ 24 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212310.309 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212310.309 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212310.321 * * [misc]simplify:  iters left: 5 (93 enodes)
1545212310.369 * * [misc]simplify:  iters left: 4 (385 enodes)
1545212310.702 * [exit]simplify:  Simplified to (+ (* (* (/ (* d c0) (* D h)) d) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)))
1545212310.702 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* d c0) (* D h)) d) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212310.703 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212310.703 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212310.711 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212310.728 * * [misc]simplify:  iters left: 4 (234 enodes)
1545212310.935 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))
1545212310.935 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))))
1545212310.935 * * * * [misc]progress:  [ 25 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212310.936 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212310.936 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212310.948 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212310.991 * * [misc]simplify:  iters left: 4 (379 enodes)
1545212311.330 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (/ (/ (/ c0 h) (/ D d)) (/ w d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212311.330 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (/ (/ (/ c0 h) (/ D d)) (/ w d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212311.330 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212311.331 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212311.334 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212311.347 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212311.485 * [exit]simplify:  Simplified to (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212311.485 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212311.485 * * * * [misc]progress:  [ 26 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212311.485 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212311.485 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212311.492 * * [misc]simplify:  iters left: 5 (93 enodes)
1545212311.523 * * [misc]simplify:  iters left: 4 (387 enodes)
1545212311.823 * [exit]simplify:  Simplified to (+ (* (* (* d (/ c0 h)) (/ d D)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)))
1545212311.823 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* d (/ c0 h)) (/ d D)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212311.823 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212311.823 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212311.827 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212311.859 * * [misc]simplify:  iters left: 4 (234 enodes)
1545212312.080 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))
1545212312.081 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))))
1545212312.081 * * * * [misc]progress:  [ 27 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212312.081 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212312.082 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212312.093 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212312.126 * * [misc]simplify:  iters left: 4 (383 enodes)
1545212312.531 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (/ (* (/ c0 h) (/ d D)) (/ w d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212312.531 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (/ (* (/ c0 h) (/ d D)) (/ w d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212312.532 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212312.532 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212312.536 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212312.549 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212312.707 * [exit]simplify:  Simplified to (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212312.707 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212312.707 * * * * [misc]progress:  [ 28 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212312.708 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212312.708 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212312.714 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212312.739 * * [misc]simplify:  iters left: 4 (390 enodes)
1545212313.470 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (* (* M M) (- M))) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))))
1545212313.470 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (* (* M M) (- M))) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212313.471 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212313.471 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212313.479 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212313.494 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212313.657 * [exit]simplify:  Simplified to (* w (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212313.657 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212313.658 * * * * [misc]progress:  [ 29 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* (* w D) D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)))))>
1545212313.658 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* (* w D) D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d)))
1545212313.659 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212313.670 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212313.704 * * [misc]simplify:  iters left: 4 (279 enodes)
1545212313.910 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) w)) (* (* (/ c0 h) (* d d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212313.910 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) w)) (* (* (/ c0 h) (* d d)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)))))
1545212313.910 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D))
1545212313.910 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212313.914 * * [misc]simplify:  iters left: 5 (46 enodes)
1545212313.923 * * [misc]simplify:  iters left: 4 (148 enodes)
1545212313.997 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D D) w))
1545212313.997 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* (* w D) D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D D) w)))))
1545212313.997 * * * * [misc]progress:  [ 30 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))>
1545212313.998 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d)))
1545212313.998 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212314.006 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212314.022 * * [misc]simplify:  iters left: 4 (267 enodes)
1545212314.225 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)) (* (* (/ (* d c0) (* h w)) d) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212314.226 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)) (* (* (/ (* d c0) (* h w)) d) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))
1545212314.226 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D))
1545212314.226 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212314.232 * * [misc]simplify:  iters left: 5 (41 enodes)
1545212314.244 * * [misc]simplify:  iters left: 4 (132 enodes)
1545212314.322 * [exit]simplify:  Simplified to (* (* D D) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212314.322 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212314.322 * * * * [misc]progress:  [ 31 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212314.322 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d)))
1545212314.323 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212314.334 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212314.367 * * [misc]simplify:  iters left: 4 (282 enodes)
1545212314.557 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (* (* (/ (/ c0 h) (/ D d)) d) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212314.557 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (* (* (/ (/ c0 h) (/ D d)) d) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212314.558 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212314.558 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212314.563 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212314.580 * * [misc]simplify:  iters left: 4 (137 enodes)
1545212314.687 * [exit]simplify:  Simplified to (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212314.687 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d))) (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212314.687 * * * * [misc]progress:  [ 32 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212314.687 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212314.688 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212314.698 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212314.730 * * [misc]simplify:  iters left: 4 (271 enodes)
1545212314.996 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M))))) (* (/ (* d (/ c0 h)) (/ w (/ d D))) (sqrt (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))))
1545212314.996 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M))))) (* (/ (* d (/ c0 h)) (/ w (/ d D))) (sqrt (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212314.996 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212314.996 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212314.999 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212315.010 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212315.079 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D)
1545212315.079 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D))))
1545212315.079 * * * * [misc]progress:  [ 33 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212315.080 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D))))
1545212315.080 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212315.087 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212315.106 * * [misc]simplify:  iters left: 4 (282 enodes)
1545212315.299 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (* (/ (* (* d c0) (/ d D)) h) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212315.299 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (* (/ (* (* d c0) (/ d D)) h) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212315.300 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212315.300 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212315.306 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212315.327 * * [misc]simplify:  iters left: 4 (137 enodes)
1545212315.421 * [exit]simplify:  Simplified to (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212315.421 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D)))) (* (* D w) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212315.421 * * * * [misc]progress:  [ 34 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212315.422 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212315.422 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212315.432 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212315.466 * * [misc]simplify:  iters left: 4 (274 enodes)
1545212315.722 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ D (/ (* (/ c0 h) (* d d)) w))))
1545212315.722 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (/ (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ D (/ (* (/ c0 h) (* d d)) w)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212315.722 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212315.722 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212315.728 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212315.744 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212315.829 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D)
1545212315.829 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D))))
1545212315.830 * * * * [misc]progress:  [ 35 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))>
1545212315.830 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212315.830 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212315.836 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212315.853 * * [misc]simplify:  iters left: 4 (283 enodes)
1545212316.080 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)))) w) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))
1545212316.080 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)))) w) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))
1545212316.080 * [enter]simplify:  Simplifying (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w)
1545212316.081 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212316.084 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212316.099 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212316.199 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) w)
1545212316.199 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) w))))
1545212316.200 * * * * [misc]progress:  [ 36 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* (* w D) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212316.200 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* (* w D) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212316.200 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212316.212 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212316.249 * * [misc]simplify:  iters left: 4 (288 enodes)
1545212316.458 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) (* (* D D) w)) (* (* (/ c0 h) (* d d)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))
1545212316.458 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) (* (* D D) w)) (* (* (/ c0 h) (* d d)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212316.458 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212316.458 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212316.462 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212316.479 * * [misc]simplify:  iters left: 4 (171 enodes)
1545212316.620 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))) (* D (* w D)))
1545212316.620 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* (* w D) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))) (* D (* w D))))))
1545212316.620 * * * * [misc]progress:  [ 37 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212316.620 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212316.621 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212316.632 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212316.670 * * [misc]simplify:  iters left: 4 (280 enodes)
1545212316.899 * [exit]simplify:  Simplified to (+ (* (* D D) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (* d (* (/ d w) (/ c0 h))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))
1545212316.899 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D D) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (* d (* (/ d w) (/ c0 h))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212316.899 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212316.900 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212316.906 * * [misc]simplify:  iters left: 5 (46 enodes)
1545212316.916 * * [misc]simplify:  iters left: 4 (157 enodes)
1545212317.016 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) (* D D))
1545212317.016 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* D D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) (* D D)))))
1545212317.016 * * * * [misc]progress:  [ 38 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212317.016 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212317.017 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212317.028 * * [misc]simplify:  iters left: 5 (79 enodes)
1545212317.063 * * [misc]simplify:  iters left: 4 (293 enodes)
1545212317.319 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (* d (* (/ d D) (/ c0 h))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))
1545212317.319 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (* d (* (/ d D) (/ c0 h))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212317.320 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212317.320 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212317.324 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212317.334 * * [misc]simplify:  iters left: 4 (162 enodes)
1545212317.436 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D))
1545212317.436 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D)))))
1545212317.436 * * * * [misc]progress:  [ 39 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212317.436 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212317.437 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212317.450 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212317.485 * * [misc]simplify:  iters left: 4 (285 enodes)
1545212317.684 * [exit]simplify:  Simplified to (+ (* (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (/ d D) (* d c0)) (* w h))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) D))
1545212317.684 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (/ d D) (* d c0)) (* w h))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212317.685 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212317.685 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212317.688 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212317.697 * * [misc]simplify:  iters left: 4 (152 enodes)
1545212317.774 * [exit]simplify:  Simplified to (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212317.774 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))
1545212317.774 * * * * [misc]progress:  [ 40 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212317.774 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212317.775 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212317.786 * * [misc]simplify:  iters left: 5 (79 enodes)
1545212317.821 * * [misc]simplify:  iters left: 4 (295 enodes)
1545212318.031 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (* (/ c0 h) (/ (* d d) D)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))))
1545212318.031 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (* (/ c0 h) (/ (* d d) D)) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212318.031 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212318.032 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212318.035 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212318.055 * * [misc]simplify:  iters left: 4 (162 enodes)
1545212318.185 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D))
1545212318.185 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (* w D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))) (* w D)))))
1545212318.185 * * * * [misc]progress:  [ 41 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212318.186 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212318.186 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212318.197 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212318.234 * * [misc]simplify:  iters left: 4 (289 enodes)
1545212318.490 * [exit]simplify:  Simplified to (+ (* (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (* (/ d D) (/ c0 h)) (/ w d))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))) D))
1545212318.490 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (* (/ d D) (/ c0 h)) (/ w d))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212318.491 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212318.491 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212318.494 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212318.503 * * [misc]simplify:  iters left: 4 (152 enodes)
1545212318.613 * [exit]simplify:  Simplified to (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212318.613 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) D) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))
1545212318.613 * * * * [misc]progress:  [ 42 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212318.613 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212318.614 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212318.622 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212318.639 * * [misc]simplify:  iters left: 4 (296 enodes)
1545212318.823 * [exit]simplify:  Simplified to (+ (* (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (* w (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))
1545212318.824 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (* w (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212318.824 * [enter]simplify:  Simplifying (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212318.824 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212318.827 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212318.836 * * [misc]simplify:  iters left: 4 (152 enodes)
1545212318.932 * [exit]simplify:  Simplified to (* w (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212318.932 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) w) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))
1545212318.932 * * * * [misc]progress:  [ 43 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* (* w D) D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) d) d))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* w D) D)))))>
1545212318.933 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* (* w D) D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) d) d)))
1545212318.933 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212318.938 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212318.965 * * [misc]simplify:  iters left: 4 (200 enodes)
1545212319.074 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D D) w)) (* (* (/ c0 h) (* d d)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))
1545212319.074 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D D) w)) (* (* (/ c0 h) (* d d)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* w D) D)))))
1545212319.074 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* w D) D))
1545212319.074 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212319.080 * * [misc]simplify:  iters left: 5 (35 enodes)
1545212319.092 * * [misc]simplify:  iters left: 4 (87 enodes)
1545212319.118 * * [misc]simplify:  iters left: 3 (216 enodes)
1545212319.205 * [exit]simplify:  Simplified to (* (sqrt (+ M (* (* (/ c0 w) (/ d D)) (/ (/ d D) h)))) (* (* D D) w))
1545212319.205 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* (* w D) D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) d) d))) (* (sqrt (+ M (* (* (/ c0 w) (/ d D)) (/ (/ d D) h)))) (* (* D D) w)))))
1545212319.205 * * * * [misc]progress:  [ 44 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* D D)))))>
1545212319.205 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ (/ c0 h) w) d) d)))
1545212319.206 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212319.210 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212319.230 * * [misc]simplify:  iters left: 4 (192 enodes)
1545212319.348 * [exit]simplify:  Simplified to (+ (* (* d (* (/ d w) (/ c0 h))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (* D D)))
1545212319.348 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (* (/ d w) (/ c0 h))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (* D D))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* D D)))))
1545212319.348 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* D D))
1545212319.349 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212319.354 * * [misc]simplify:  iters left: 5 (30 enodes)
1545212319.364 * * [misc]simplify:  iters left: 4 (71 enodes)
1545212319.392 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212319.461 * [exit]simplify:  Simplified to (* (* D D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D))))))
1545212319.461 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* D D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))
1545212319.461 * * * * [misc]progress:  [ 45 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))>
1545212319.462 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) (/ d D)) d)))
1545212319.462 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212319.467 * * [misc]simplify:  iters left: 5 (60 enodes)
1545212319.481 * * [misc]simplify:  iters left: 4 (207 enodes)
1545212319.597 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (/ (* d d) D)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))
1545212319.597 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 h) (/ (* d d) D)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))
1545212319.597 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D))
1545212319.597 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212319.600 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212319.605 * * [misc]simplify:  iters left: 4 (76 enodes)
1545212319.621 * * [misc]simplify:  iters left: 3 (193 enodes)
1545212319.705 * [exit]simplify:  Simplified to (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))
1545212319.705 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) (/ d D)) d))) (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))))
1545212319.705 * * * * [misc]progress:  [ 46 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))>
1545212319.705 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212319.706 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212319.713 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212319.737 * * [misc]simplify:  iters left: 4 (197 enodes)
1545212319.862 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (/ c0 (* w h)) (* d (/ d D))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212319.863 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (/ c0 (* w h)) (* d (/ d D))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))
1545212319.863 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D)
1545212319.863 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212319.865 * * [misc]simplify:  iters left: 5 (27 enodes)
1545212319.873 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212319.888 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212319.980 * [exit]simplify:  Simplified to (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D)
1545212319.980 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D))))
1545212319.980 * * * * [misc]progress:  [ 47 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))>
1545212319.980 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) d) (/ d D))))
1545212319.981 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212319.990 * * [misc]simplify:  iters left: 5 (60 enodes)
1545212320.015 * * [misc]simplify:  iters left: 4 (207 enodes)
1545212320.180 * [exit]simplify:  Simplified to (+ (* (/ (* (/ c0 h) (* d d)) D) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))
1545212320.180 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ c0 h) (* d d)) D) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D)))))
1545212320.180 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* w D))
1545212320.180 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212320.186 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212320.194 * * [misc]simplify:  iters left: 4 (76 enodes)
1545212320.209 * * [misc]simplify:  iters left: 3 (193 enodes)
1545212320.286 * [exit]simplify:  Simplified to (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))
1545212320.286 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (* w D)) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) d) (/ d D)))) (* (* w D) (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))))
1545212320.286 * * * * [misc]progress:  [ 48 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))>
1545212320.287 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212320.287 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212320.291 * * [misc]simplify:  iters left: 5 (56 enodes)
1545212320.309 * * [misc]simplify:  iters left: 4 (199 enodes)
1545212320.452 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212320.452 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D))))
1545212320.452 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) D)
1545212320.453 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212320.457 * * [misc]simplify:  iters left: 5 (27 enodes)
1545212320.467 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212320.493 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212320.580 * [exit]simplify:  Simplified to (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D)
1545212320.580 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) D) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) D))))
1545212320.580 * * * * [misc]progress:  [ 49 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) w))))>
1545212320.580 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212320.581 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212320.590 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212320.607 * * [misc]simplify:  iters left: 4 (208 enodes)
1545212320.753 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M) (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))) w) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))))))
1545212320.753 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M) (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))) w) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) w))))
1545212320.753 * [enter]simplify:  Simplifying (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) w)
1545212320.753 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212320.758 * * [misc]simplify:  iters left: 5 (27 enodes)
1545212320.767 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212320.796 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212320.857 * [exit]simplify:  Simplified to (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) w)
1545212320.857 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) w) (* (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))) w))))
1545212320.857 * * * * [misc]progress:  [ 50 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))>
1545212320.858 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d)))
1545212320.858 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212320.864 * * [misc]simplify:  iters left: 5 (83 enodes)
1545212320.884 * * [misc]simplify:  iters left: 4 (306 enodes)
1545212321.118 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* w (* D D))) (* (/ (* d c0) (/ h d)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212321.118 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* w (* D D))) (* (/ (* d c0) (/ h d)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))
1545212321.118 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D))
1545212321.119 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212321.122 * * [misc]simplify:  iters left: 5 (52 enodes)
1545212321.134 * * [misc]simplify:  iters left: 4 (197 enodes)
1545212321.248 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* (* D D) w))
1545212321.249 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* (* D D) w)))))
1545212321.249 * * * * [misc]progress:  [ 51 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212321.249 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212321.249 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212321.263 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212321.293 * * [misc]simplify:  iters left: 4 (298 enodes)
1545212321.493 * [exit]simplify:  Simplified to (+ (* (* D D) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (* (/ c0 h) (/ (* d d) w)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212321.493 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D D) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (* (/ c0 h) (/ (* d d) w)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212321.494 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212321.494 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212321.498 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212321.508 * * [misc]simplify:  iters left: 4 (181 enodes)
1545212321.625 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* D D))
1545212321.625 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* D D)))))
1545212321.625 * * * * [misc]progress:  [ 52 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212321.625 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212321.626 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212321.637 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212321.674 * * [misc]simplify:  iters left: 4 (313 enodes)
1545212321.996 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (/ (/ (* d c0) D) (/ h d)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))
1545212321.996 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (/ (/ (* d c0) D) (/ h d)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212321.996 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212321.996 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212322.004 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212322.026 * * [misc]simplify:  iters left: 4 (186 enodes)
1545212322.173 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w))
1545212322.173 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w)))))
1545212322.173 * * * * [misc]progress:  [ 53 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212322.174 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212322.174 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212322.184 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212322.216 * * [misc]simplify:  iters left: 4 (303 enodes)
1545212322.441 * [exit]simplify:  Simplified to (+ (* (* (/ c0 (* w h)) (/ (* d d) D)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D))
1545212322.442 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ (* d d) D)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212322.442 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212322.442 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212322.445 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212322.456 * * [misc]simplify:  iters left: 4 (176 enodes)
1545212322.553 * [exit]simplify:  Simplified to (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))
1545212322.553 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212322.553 * * * * [misc]progress:  [ 54 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212322.554 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D))))
1545212322.554 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212322.559 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212322.579 * * [misc]simplify:  iters left: 4 (311 enodes)
1545212322.905 * [exit]simplify:  Simplified to (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ D (* (* d d) (/ c0 h)))))
1545212322.906 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ D (* (* d d) (/ c0 h))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212322.906 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212322.906 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212322.909 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212322.920 * * [misc]simplify:  iters left: 4 (186 enodes)
1545212323.070 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w))
1545212323.071 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* D w)))))
1545212323.071 * * * * [misc]progress:  [ 55 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212323.071 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212323.072 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212323.083 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212323.123 * * [misc]simplify:  iters left: 4 (307 enodes)
1545212323.430 * [exit]simplify:  Simplified to (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))) (/ (* d c0) (* (/ D d) (* w h)))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D))
1545212323.431 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))) (/ (* d c0) (* (/ D d) (* w h)))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212323.431 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212323.431 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212323.438 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212323.460 * * [misc]simplify:  iters left: 4 (176 enodes)
1545212323.557 * [exit]simplify:  Simplified to (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))
1545212323.557 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212323.558 * * * * [misc]progress:  [ 56 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212323.558 * [enter]simplify:  Simplifying (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212323.558 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212323.567 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212323.602 * * [misc]simplify:  iters left: 4 (314 enodes)
1545212323.831 * [exit]simplify:  Simplified to (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* (/ c0 h) (* (/ d D) (/ d D)))) (* w (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))
1545212323.831 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) (* (/ c0 h) (* (/ d D) (/ d D)))) (* w (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212323.832 * [enter]simplify:  Simplifying (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212323.832 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212323.838 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212323.859 * * [misc]simplify:  iters left: 4 (176 enodes)
1545212324.024 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) w)
1545212324.024 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))) w))))
1545212324.025 * * * * [misc]progress:  [ 57 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) d) d))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* w D) D)))))>
1545212324.025 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) d) d)))
1545212324.025 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212324.034 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212324.059 * * [misc]simplify:  iters left: 4 (232 enodes)
1545212324.210 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* w (* D D))) (* (/ (* d c0) (/ h d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212324.210 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* w (* D D))) (* (/ (* d c0) (/ h d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* w D) D)))))
1545212324.210 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* w D) D))
1545212324.210 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212324.215 * * [misc]simplify:  iters left: 5 (36 enodes)
1545212324.222 * * [misc]simplify:  iters left: 4 (103 enodes)
1545212324.247 * * [misc]simplify:  iters left: 3 (295 enodes)
1545212324.406 * [exit]simplify:  Simplified to (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* w (* D D)))
1545212324.406 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) d) d))) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* w (* D D))))))
1545212324.406 * * * * [misc]progress:  [ 58 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* D D)))))>
1545212324.406 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ (/ c0 h) w) d) d)))
1545212324.407 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212324.411 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212324.426 * * [misc]simplify:  iters left: 4 (220 enodes)
1545212324.551 * [exit]simplify:  Simplified to (+ (* (/ (* (* d d) c0) (* h w)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)))
1545212324.551 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (* d d) c0) (* h w)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* D D)))))
1545212324.552 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* D D))
1545212324.552 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212324.554 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212324.561 * * [misc]simplify:  iters left: 4 (85 enodes)
1545212324.587 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212324.730 * [exit]simplify:  Simplified to (* (* D D) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))
1545212324.730 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))))
1545212324.730 * * * * [misc]progress:  [ 59 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))>
1545212324.730 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) (/ d D)) d)))
1545212324.731 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212324.740 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212324.762 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212324.924 * [exit]simplify:  Simplified to (+ (* (* (/ d (/ D d)) (/ c0 h)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)))
1545212324.924 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ d (/ D d)) (/ c0 h)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))
1545212324.925 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D))
1545212324.925 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212324.929 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212324.939 * * [misc]simplify:  iters left: 4 (90 enodes)
1545212324.976 * * [misc]simplify:  iters left: 3 (270 enodes)
1545212325.130 * [exit]simplify:  Simplified to (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))
1545212325.130 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) (/ d D)) d))) (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212325.130 * * * * [misc]progress:  [ 60 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))>
1545212325.131 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212325.131 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212325.140 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212325.159 * * [misc]simplify:  iters left: 4 (225 enodes)
1545212325.318 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212325.319 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))
1545212325.319 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D)
1545212325.319 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212325.321 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212325.326 * * [misc]simplify:  iters left: 4 (82 enodes)
1545212325.346 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212325.516 * [exit]simplify:  Simplified to (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D)
1545212325.516 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D))))
1545212325.516 * * * * [misc]progress:  [ 61 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))>
1545212325.517 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) d) (/ d D))))
1545212325.517 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212325.527 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212325.556 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212325.726 * [exit]simplify:  Simplified to (+ (* (/ (* d c0) (* (/ D d) h)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)))
1545212325.727 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* d c0) (* (/ D d) h)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D)))))
1545212325.727 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* w D))
1545212325.727 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212325.730 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212325.735 * * [misc]simplify:  iters left: 4 (90 enodes)
1545212325.763 * * [misc]simplify:  iters left: 3 (270 enodes)
1545212325.933 * [exit]simplify:  Simplified to (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))
1545212325.934 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) d) (/ d D)))) (* (* D w) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212325.934 * * * * [misc]progress:  [ 62 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))>
1545212325.934 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212325.934 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212325.944 * * [misc]simplify:  iters left: 5 (60 enodes)
1545212325.976 * * [misc]simplify:  iters left: 4 (227 enodes)
1545212326.140 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212326.140 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D))))
1545212326.141 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) D)
1545212326.141 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212326.146 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212326.153 * * [misc]simplify:  iters left: 4 (82 enodes)
1545212326.176 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212326.319 * [exit]simplify:  Simplified to (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D)
1545212326.319 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) D))))
1545212326.319 * * * * [misc]progress:  [ 63 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) w))))>
1545212326.319 * [enter]simplify:  Simplifying (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212326.320 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212326.324 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212326.344 * * [misc]simplify:  iters left: 4 (236 enodes)
1545212326.498 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) w) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))
1545212326.499 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) w) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) w))))
1545212326.499 * [enter]simplify:  Simplifying (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) w)
1545212326.499 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212326.501 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212326.506 * * [misc]simplify:  iters left: 4 (82 enodes)
1545212326.525 * * [misc]simplify:  iters left: 3 (264 enodes)
1545212326.677 * [exit]simplify:  Simplified to (* w (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))
1545212326.678 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w) (* (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212326.678 * * * * [misc]progress:  [ 64 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (pow (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) 3) (pow (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) 3)) (+ (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (- (* (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))))))>
1545212326.678 * * * * [misc]progress:  [ 65 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 1 (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))))>
1545212326.678 * * * * [misc]progress:  [ 66 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (- (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))) (- (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))))>
1545212326.678 * * * * [misc]progress:  [ 67 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))>
1545212326.678 * * * * [misc]progress:  [ 68 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212326.678 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212326.678 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212326.680 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212326.684 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212326.710 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212326.814 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212326.814 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212326.814 * * * * [misc]progress:  [ 69 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212326.814 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212326.815 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212326.818 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212326.828 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212326.855 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212326.960 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212326.960 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212326.960 * * * * [misc]progress:  [ 70 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212326.960 * * * * [misc]progress:  [ 71 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212326.960 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))
1545212326.961 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212326.965 * * [misc]simplify:  iters left: 5 (23 enodes)
1545212326.972 * * [misc]simplify:  iters left: 4 (49 enodes)
1545212326.988 * * [misc]simplify:  iters left: 3 (125 enodes)
1545212327.040 * * [misc]simplify:  iters left: 2 (471 enodes)
1545212327.586 * [exit]simplify:  Simplified to (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))
1545212327.586 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212327.586 * * * * [misc]progress:  [ 72 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212327.587 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))
1545212327.587 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212327.591 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212327.599 * * [misc]simplify:  iters left: 4 (53 enodes)
1545212327.616 * * [misc]simplify:  iters left: 3 (114 enodes)
1545212327.665 * * [misc]simplify:  iters left: 2 (347 enodes)
1545212327.884 * [exit]simplify:  Simplified to (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))
1545212327.884 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212327.885 * * * * [misc]progress:  [ 73 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (log (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212327.885 * * * * [misc]progress:  [ 74 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (log (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212327.885 * * * * [misc]progress:  [ 75 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212327.885 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))
1545212327.885 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212327.891 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212327.910 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212328.018 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212328.018 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.018 * * * * [misc]progress:  [ 76 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.018 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))
1545212328.018 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212328.021 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212328.031 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212328.116 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212328.117 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.117 * * * * [misc]progress:  [ 77 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.117 * * * * [misc]progress:  [ 78 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.117 * * * * [misc]progress:  [ 79 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.117 * * * * [misc]progress:  [ 80 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d d)) (* w (* D D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.117 * [enter]simplify:  Simplifying (* (/ c0 h) (* d d))
1545212328.117 * * [misc]simplify:  iters left: 4 (6 enodes)
1545212328.118 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212328.120 * * [misc]simplify:  iters left: 2 (20 enodes)
1545212328.125 * * [misc]simplify:  iters left: 1 (28 enodes)
1545212328.131 * [exit]simplify:  Simplified to (/ (* d d) (/ h c0))
1545212328.131 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (/ (* d d) (/ h c0)) (* w (* D D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.131 * [enter]simplify:  Simplifying (* w (* D D))
1545212328.131 * * [misc]simplify:  iters left: 4 (4 enodes)
1545212328.133 * * [misc]simplify:  iters left: 3 (7 enodes)
1545212328.134 * * [misc]simplify:  iters left: 2 (9 enodes)
1545212328.136 * [exit]simplify:  Simplified to (* w (* D D))
1545212328.136 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d d)) (* w (* D D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.136 * * * * [misc]progress:  [ 81 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) d)) (* w D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.136 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) d))
1545212328.136 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212328.138 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212328.140 * * [misc]simplify:  iters left: 4 (40 enodes)
1545212328.148 * * [misc]simplify:  iters left: 3 (79 enodes)
1545212328.160 * * [misc]simplify:  iters left: 2 (132 enodes)
1545212328.192 * * [misc]simplify:  iters left: 1 (191 enodes)
1545212328.237 * [exit]simplify:  Simplified to (* (* d (/ d h)) (/ c0 D))
1545212328.237 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (* d (/ d h)) (/ c0 D)) (* w D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.237 * [enter]simplify:  Simplifying (* w D)
1545212328.237 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212328.238 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212328.238 * [exit]simplify:  Simplified to (* w D)
1545212328.239 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) d)) (* w D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.239 * * * * [misc]progress:  [ 82 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d (/ d D))) (* w D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.239 * [enter]simplify:  Simplifying (* (/ c0 h) (* d (/ d D)))
1545212328.239 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212328.240 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212328.243 * * [misc]simplify:  iters left: 4 (41 enodes)
1545212328.254 * * [misc]simplify:  iters left: 3 (75 enodes)
1545212328.276 * * [misc]simplify:  iters left: 2 (125 enodes)
1545212328.318 * * [misc]simplify:  iters left: 1 (181 enodes)
1545212328.401 * [exit]simplify:  Simplified to (* (/ d D) (* c0 (/ d h)))
1545212328.401 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ d D) (* c0 (/ d h))) (* w D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.401 * [enter]simplify:  Simplifying (* w D)
1545212328.401 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212328.402 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212328.402 * [exit]simplify:  Simplified to (* w D)
1545212328.402 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d (/ d D))) (* w D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.402 * * * * [misc]progress:  [ 83 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.402 * * * * [misc]progress:  [ 84 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.402 * [enter]simplify:  Simplifying (/ d D)
1545212328.402 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212328.403 * [exit]simplify:  Simplified to (/ d D)
1545212328.403 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.403 * * * * [misc]progress:  [ 85 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.403 * [enter]simplify:  Simplifying (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212328.403 * * [misc]simplify:  iters left: 6 (7 enodes)
1545212328.404 * * [misc]simplify:  iters left: 5 (9 enodes)
1545212328.406 * * [misc]simplify:  iters left: 4 (12 enodes)
1545212328.407 * [exit]simplify:  Simplified to (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212328.407 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.407 * * * * [misc]progress:  [ 86 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.408 * [enter]simplify:  Simplifying (sqrt (/ (/ c0 h) w))
1545212328.408 * * [misc]simplify:  iters left: 5 (6 enodes)
1545212328.409 * * [misc]simplify:  iters left: 4 (8 enodes)
1545212328.410 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212328.411 * [exit]simplify:  Simplified to (sqrt (/ (/ c0 h) w))
1545212328.411 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.411 * * * * [misc]progress:  [ 87 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.411 * * * * [misc]progress:  [ 88 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.412 * [enter]simplify:  Simplifying (/ c0 h)
1545212328.412 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212328.412 * [exit]simplify:  Simplified to (/ c0 h)
1545212328.412 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.412 * * * * [misc]progress:  [ 89 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d d)) (* D D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.412 * [enter]simplify:  Simplifying (* D D)
1545212328.412 * * [misc]simplify:  iters left: 2 (2 enodes)
1545212328.413 * [exit]simplify:  Simplified to (* D D)
1545212328.413 * [misc]simplify:  Simplified (2 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d d)) (* D D)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.413 * * * * [misc]progress:  [ 90 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.413 * * * * [misc]progress:  [ 91 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d (/ d D))) D) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.413 * * * * [misc]progress:  [ 92 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) (/ d D))) w) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.413 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) (/ d D)))
1545212328.413 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212328.414 * * [misc]simplify:  iters left: 5 (17 enodes)
1545212328.420 * * [misc]simplify:  iters left: 4 (46 enodes)
1545212328.437 * * [misc]simplify:  iters left: 3 (102 enodes)
1545212328.476 * * [misc]simplify:  iters left: 2 (213 enodes)
1545212328.560 * * [misc]simplify:  iters left: 1 (420 enodes)
1545212328.821 * [exit]simplify:  Simplified to (* (* (/ c0 h) (/ d D)) (/ d D))
1545212328.821 * [misc]simplify:  Simplified (2 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (* (/ c0 h) (/ d D)) (/ d D)) w) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.821 * * * * [misc]progress:  [ 93 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.821 * * * * [misc]progress:  [ 94 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.821 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212328.821 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212328.823 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212328.831 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212328.854 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212328.943 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212328.943 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212328.943 * * * * [misc]progress:  [ 95 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212328.944 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212328.944 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212328.947 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212328.955 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212328.977 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212329.043 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212329.043 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212329.044 * * * * [misc]progress:  [ 96 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212329.044 * * * * [misc]progress:  [ 97 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212329.044 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))
1545212329.044 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212329.046 * * [misc]simplify:  iters left: 5 (23 enodes)
1545212329.049 * * [misc]simplify:  iters left: 4 (49 enodes)
1545212329.060 * * [misc]simplify:  iters left: 3 (125 enodes)
1545212329.120 * * [misc]simplify:  iters left: 2 (471 enodes)
1545212329.609 * [exit]simplify:  Simplified to (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))
1545212329.610 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212329.610 * * * * [misc]progress:  [ 98 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212329.610 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))
1545212329.610 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212329.612 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212329.616 * * [misc]simplify:  iters left: 4 (53 enodes)
1545212329.625 * * [misc]simplify:  iters left: 3 (114 enodes)
1545212329.664 * * [misc]simplify:  iters left: 2 (347 enodes)
1545212329.861 * [exit]simplify:  Simplified to (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))
1545212329.861 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212329.861 * * * * [misc]progress:  [ 99 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (exp (log (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212329.861 * * * * [misc]progress:  [ 100 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (log (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212329.861 * * * * [misc]progress:  [ 101 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212329.861 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))
1545212329.861 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212329.864 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212329.879 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212329.983 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212329.983 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212329.983 * * * * [misc]progress:  [ 102 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212329.984 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))
1545212329.984 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212329.986 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212329.999 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212330.109 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212330.110 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.110 * * * * [misc]progress:  [ 103 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.110 * * * * [misc]progress:  [ 104 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (cbrt (* (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.110 * * * * [misc]progress:  [ 105 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.110 * * * * [misc]progress:  [ 106 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d d)) (* w (* D D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.110 * [enter]simplify:  Simplifying (* (/ c0 h) (* d d))
1545212330.110 * * [misc]simplify:  iters left: 4 (6 enodes)
1545212330.113 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212330.117 * * [misc]simplify:  iters left: 2 (20 enodes)
1545212330.122 * * [misc]simplify:  iters left: 1 (28 enodes)
1545212330.130 * [exit]simplify:  Simplified to (/ (* d d) (/ h c0))
1545212330.130 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (/ (* d d) (/ h c0)) (* w (* D D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.130 * [enter]simplify:  Simplifying (* w (* D D))
1545212330.130 * * [misc]simplify:  iters left: 4 (4 enodes)
1545212330.131 * * [misc]simplify:  iters left: 3 (7 enodes)
1545212330.132 * * [misc]simplify:  iters left: 2 (9 enodes)
1545212330.134 * [exit]simplify:  Simplified to (* w (* D D))
1545212330.134 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d d)) (* w (* D D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.134 * * * * [misc]progress:  [ 107 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* (/ d D) d)) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.134 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) d))
1545212330.134 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212330.135 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212330.138 * * [misc]simplify:  iters left: 4 (40 enodes)
1545212330.145 * * [misc]simplify:  iters left: 3 (79 enodes)
1545212330.157 * * [misc]simplify:  iters left: 2 (132 enodes)
1545212330.183 * * [misc]simplify:  iters left: 1 (191 enodes)
1545212330.259 * [exit]simplify:  Simplified to (* (* d (/ d h)) (/ c0 D))
1545212330.259 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (* d (/ d h)) (/ c0 D)) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.260 * [enter]simplify:  Simplifying (* w D)
1545212330.260 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212330.261 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212330.262 * [exit]simplify:  Simplified to (* w D)
1545212330.262 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* (/ d D) d)) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.262 * * * * [misc]progress:  [ 108 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d (/ d D))) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.262 * [enter]simplify:  Simplifying (* (/ c0 h) (* d (/ d D)))
1545212330.262 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212330.265 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212330.270 * * [misc]simplify:  iters left: 4 (41 enodes)
1545212330.284 * * [misc]simplify:  iters left: 3 (75 enodes)
1545212330.306 * * [misc]simplify:  iters left: 2 (125 enodes)
1545212330.329 * * [misc]simplify:  iters left: 1 (181 enodes)
1545212330.378 * [exit]simplify:  Simplified to (* (/ d D) (* c0 (/ d h)))
1545212330.379 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ d D) (* c0 (/ d h))) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.379 * [enter]simplify:  Simplifying (* w D)
1545212330.379 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212330.379 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212330.380 * [exit]simplify:  Simplified to (* w D)
1545212330.380 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* d (/ d D))) (* w D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.380 * * * * [misc]progress:  [ 109 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.380 * * * * [misc]progress:  [ 110 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.380 * [enter]simplify:  Simplifying (/ d D)
1545212330.380 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212330.381 * [exit]simplify:  Simplified to (/ d D)
1545212330.381 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.381 * * * * [misc]progress:  [ 111 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.381 * [enter]simplify:  Simplifying (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212330.381 * * [misc]simplify:  iters left: 6 (7 enodes)
1545212330.382 * * [misc]simplify:  iters left: 5 (9 enodes)
1545212330.383 * * [misc]simplify:  iters left: 4 (12 enodes)
1545212330.385 * [exit]simplify:  Simplified to (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212330.385 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.385 * * * * [misc]progress:  [ 112 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.385 * [enter]simplify:  Simplifying (sqrt (/ (/ c0 h) w))
1545212330.385 * * [misc]simplify:  iters left: 5 (6 enodes)
1545212330.386 * * [misc]simplify:  iters left: 4 (8 enodes)
1545212330.388 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212330.389 * [exit]simplify:  Simplified to (sqrt (/ (/ c0 h) w))
1545212330.389 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.389 * * * * [misc]progress:  [ 113 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.389 * * * * [misc]progress:  [ 114 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.389 * [enter]simplify:  Simplifying (/ c0 h)
1545212330.389 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212330.390 * [exit]simplify:  Simplified to (/ c0 h)
1545212330.390 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.390 * * * * [misc]progress:  [ 115 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d d)) (* D D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.390 * [enter]simplify:  Simplifying (* D D)
1545212330.390 * * [misc]simplify:  iters left: 2 (2 enodes)
1545212330.391 * [exit]simplify:  Simplified to (* D D)
1545212330.391 * [misc]simplify:  Simplified (2 2 1 1 1 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d d)) (* D D))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.391 * * * * [misc]progress:  [ 116 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.391 * * * * [misc]progress:  [ 117 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.391 * * * * [misc]progress:  [ 118 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ c0 h) (* (/ d D) (/ d D))) w)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.391 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) (/ d D)))
1545212330.391 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212330.393 * * [misc]simplify:  iters left: 5 (17 enodes)
1545212330.399 * * [misc]simplify:  iters left: 4 (46 enodes)
1545212330.413 * * [misc]simplify:  iters left: 3 (102 enodes)
1545212330.453 * * [misc]simplify:  iters left: 2 (213 enodes)
1545212330.537 * * [misc]simplify:  iters left: 1 (420 enodes)
1545212330.756 * [exit]simplify:  Simplified to (* (* (/ c0 h) (/ d D)) (/ d D))
1545212330.756 * [misc]simplify:  Simplified (2 2 1 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (* (/ c0 h) (/ d D)) (/ d D)) w)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.756 * * * * [misc]progress:  [ 119 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.756 * * * * [misc]progress:  [ 120 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (pow (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)) 1/2) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.757 * * * * [misc]progress:  [ 121 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (pow (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) 1) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.757 * * * * [misc]progress:  [ 122 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (exp (log (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.757 * * * * [misc]progress:  [ 123 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (log (exp (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.757 * * * * [misc]progress:  [ 124 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.757 * * * * [misc]progress:  [ 125 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (cbrt (* (* (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.757 * * * * [misc]progress:  [ 126 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.757 * [enter]simplify:  Simplifying (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))
1545212330.757 * * [misc]simplify:  iters left: 6 (13 enodes)
1545212330.759 * * [misc]simplify:  iters left: 5 (25 enodes)
1545212330.764 * * [misc]simplify:  iters left: 4 (66 enodes)
1545212330.782 * * [misc]simplify:  iters left: 3 (187 enodes)
1545212330.888 * [exit]simplify:  Simplified to (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))))
1545212330.889 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212330.889 * * * * [misc]progress:  [ 127 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212330.889 * [enter]simplify:  Simplifying (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))
1545212330.890 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212330.896 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212330.914 * * [misc]simplify:  iters left: 4 (160 enodes)
1545212331.042 * [exit]simplify:  Simplified to (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))
1545212331.043 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212331.043 * * * * [misc]progress:  [ 128 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212331.043 * [enter]simplify:  Simplifying (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))
1545212331.043 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212331.047 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212331.058 * * [misc]simplify:  iters left: 4 (196 enodes)
1545212331.204 * [exit]simplify:  Simplified to (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))
1545212331.204 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212331.204 * * * * [misc]progress:  [ 129 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212331.204 * [enter]simplify:  Simplifying (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))
1545212331.204 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212331.211 * * [misc]simplify:  iters left: 5 (50 enodes)
1545212331.231 * * [misc]simplify:  iters left: 4 (210 enodes)
1545212331.425 * [exit]simplify:  Simplified to (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))
1545212331.425 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212331.425 * * * * [misc]progress:  [ 130 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212331.425 * [enter]simplify:  Simplifying (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))
1545212331.426 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212331.432 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212331.456 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212331.616 * [exit]simplify:  Simplified to (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))
1545212331.617 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212331.617 * * * * [misc]progress:  [ 131 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))) (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212331.617 * [enter]simplify:  Simplifying (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))
1545212331.617 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212331.624 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212331.642 * * [misc]simplify:  iters left: 4 (160 enodes)
1545212331.795 * [exit]simplify:  Simplified to (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))
1545212331.795 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212331.795 * * * * [misc]progress:  [ 132 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))) (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212331.796 * [enter]simplify:  Simplifying (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))
1545212331.796 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212331.799 * * [misc]simplify:  iters left: 5 (38 enodes)
1545212331.807 * * [misc]simplify:  iters left: 4 (136 enodes)
1545212331.884 * [exit]simplify:  Simplified to (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))
1545212331.884 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212331.884 * * * * [misc]progress:  [ 133 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212331.884 * [enter]simplify:  Simplifying (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))
1545212331.884 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212331.889 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212331.898 * * [misc]simplify:  iters left: 4 (154 enodes)
1545212331.988 * [exit]simplify:  Simplified to (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))
1545212331.988 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212331.988 * * * * [misc]progress:  [ 134 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212331.989 * [enter]simplify:  Simplifying (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))
1545212331.989 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212331.995 * * [misc]simplify:  iters left: 5 (40 enodes)
1545212332.015 * * [misc]simplify:  iters left: 4 (149 enodes)
1545212332.134 * [exit]simplify:  Simplified to (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))
1545212332.134 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212332.134 * * * * [misc]progress:  [ 135 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212332.134 * * * * [misc]progress:  [ 136 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* 1 (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212332.134 * * * * [misc]progress:  [ 137 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))>
1545212332.134 * [enter]simplify:  Simplifying (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212332.135 * * [misc]simplify:  iters left: 6 (13 enodes)
1545212332.139 * * [misc]simplify:  iters left: 5 (30 enodes)
1545212332.153 * * [misc]simplify:  iters left: 4 (134 enodes)
1545212332.272 * [exit]simplify:  Simplified to (* (/ (* 2 c0) (* w h)) (* (/ d D) (/ d D)))
1545212332.273 * [misc]simplify:  Simplified (2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (/ (* 2 c0) (* w h)) (* (/ d D) (/ d D)))))
1545212332.273 * * * * [misc]progress:  [ 138 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (sqrt -1) M)))>
1545212332.273 * [enter]simplify:  Simplifying (* (sqrt -1) M)
1545212332.273 * * [misc]simplify:  iters left: 3 (4 enodes)
1545212332.275 * * [misc]simplify:  iters left: 2 (5 enodes)
1545212332.277 * [exit]simplify:  Simplified to (* M (sqrt -1))
1545212332.277 * [misc]simplify:  Simplified (2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* M (sqrt -1))))
1545212332.277 * * * * [misc]progress:  [ 139 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* -1 (* (sqrt -1) M))))>
1545212332.277 * [enter]simplify:  Simplifying (* -1 (* (sqrt -1) M))
1545212332.277 * * [misc]simplify:  iters left: 5 (5 enodes)
1545212332.279 * * [misc]simplify:  iters left: 4 (10 enodes)
1545212332.281 * * [misc]simplify:  iters left: 3 (21 enodes)
1545212332.284 * * [misc]simplify:  iters left: 2 (22 enodes)
1545212332.287 * [exit]simplify:  Simplified to (* (- M) (sqrt -1))
1545212332.287 * [misc]simplify:  Simplified (2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (- M) (sqrt -1))))
1545212332.287 * * * * [misc]progress:  [ 140 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212332.287 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212332.287 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212332.289 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212332.294 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212332.331 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212333.124 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212333.124 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212333.124 * * * * [misc]progress:  [ 141 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212333.125 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212333.125 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212333.127 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212333.132 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212333.169 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212333.641 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212333.641 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212333.641 * * * * [misc]progress:  [ 142 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212333.641 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212333.641 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212333.644 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212333.652 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212333.693 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212334.122 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212334.123 * [misc]simplify:  Simplified (2 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212334.123 * * * * [misc]progress:  [ 143 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212334.123 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212334.123 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212334.127 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212334.138 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212334.184 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212334.590 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212334.590 * [misc]simplify:  Simplified (2 2 1 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212334.590 * * * * [misc]progress:  [ 144 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212334.590 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212334.590 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212334.592 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212334.597 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212334.651 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212335.011 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212335.011 * [misc]simplify:  Simplified (2 2 1 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212335.011 * * * * [misc]progress:  [ 145 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212335.011 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212335.012 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212335.016 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212335.026 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212335.088 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212335.451 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212335.451 * [misc]simplify:  Simplified (2 2 1 1 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212335.451 * * * * [misc]progress:  [ 146 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212335.451 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212335.452 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212335.456 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212335.466 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212335.532 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212335.917 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212335.917 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212335.917 * * * * [misc]progress:  [ 147 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt -1) M) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212335.917 * [enter]simplify:  Simplifying (* (sqrt -1) M)
1545212335.918 * * [misc]simplify:  iters left: 3 (4 enodes)
1545212335.920 * * [misc]simplify:  iters left: 2 (5 enodes)
1545212335.922 * [exit]simplify:  Simplified to (* M (sqrt -1))
1545212335.922 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* M (sqrt -1)) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212335.922 * * * * [misc]progress:  [ 148 / 148 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* -1 (* (sqrt -1) M)) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212335.922 * [enter]simplify:  Simplifying (* -1 (* (sqrt -1) M))
1545212335.922 * * [misc]simplify:  iters left: 5 (5 enodes)
1545212335.925 * * [misc]simplify:  iters left: 4 (10 enodes)
1545212335.928 * * [misc]simplify:  iters left: 3 (21 enodes)
1545212335.932 * * [misc]simplify:  iters left: 2 (22 enodes)
1545212335.935 * [exit]simplify:  Simplified to (* (- M) (sqrt -1))
1545212335.935 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (- M) (sqrt -1)) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212335.935 * * * [misc]progress:  adding candidates to table
1545212339.353 * * [misc]progress:  iteration 4 / 4
1545212339.353 * * * [misc]progress:  picking best candidate
1545212339.458 * * * * [misc]pick:  Picked  #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212339.458 * * * [misc]progress:  localizing error
1545212339.477 * * * [misc]progress:  generating rewritten candidates
1545212339.478 * * * * [misc]progress:  [ 1 / 4 ] rewriting at (2 2)
1545212339.798 * * * * [misc]progress:  [ 2 / 4 ] rewriting at (2 2 1 2)
1545212339.858 * * * * [misc]progress:  [ 3 / 4 ] rewriting at (2 2 1 1)
1545212339.901 * * * * [misc]progress:  [ 4 / 4 ] rewriting at (2 2 1 2 1 1 2 1)
1545212339.914 * * * [misc]progress:  generating series expansions
1545212339.914 * * * * [misc]progress:  [ 1 / 4 ] generating series at (2 2)
1545212339.915 * [misc]backup-simplify:  Simplify (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) into (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212339.915 * [misc]approximate:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in (M c0 h w d D) around 0
1545212339.915 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of M in D
1545212339.915 * [misc]backup-simplify:  Simplify M into M
1545212339.915 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212339.915 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.915 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of d in D
1545212339.915 * [misc]backup-simplify:  Simplify d into d
1545212339.915 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of w in D
1545212339.915 * [misc]backup-simplify:  Simplify w into w
1545212339.915 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212339.915 * [misc]taylor:  Taking taylor expansion of D in D
1545212339.915 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.915 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.915 * [misc]taylor:  Taking taylor expansion of h in D
1545212339.915 * [misc]backup-simplify:  Simplify h into h
1545212339.915 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.916 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.916 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.916 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212339.916 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212339.916 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212339.916 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in D
1545212339.916 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212339.916 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212339.916 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212339.916 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.916 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212339.916 * [misc]taylor:  Taking taylor expansion of d in D
1545212339.916 * [misc]backup-simplify:  Simplify d into d
1545212339.916 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212339.916 * [misc]taylor:  Taking taylor expansion of w in D
1545212339.916 * [misc]backup-simplify:  Simplify w into w
1545212339.916 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212339.916 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212339.916 * [misc]taylor:  Taking taylor expansion of D in D
1545212339.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.916 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.916 * [misc]taylor:  Taking taylor expansion of h in D
1545212339.916 * [misc]backup-simplify:  Simplify h into h
1545212339.916 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.916 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.917 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.917 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212339.917 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212339.917 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212339.917 * [misc]taylor:  Taking taylor expansion of M in D
1545212339.917 * [misc]backup-simplify:  Simplify M into M
1545212339.917 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w h))) into (/ (* c0 (pow d 2)) (* w h))
1545212339.917 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w h)) 0) into (/ (* c0 (pow d 2)) (* w h))
1545212339.917 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* w h)) (/ (* c0 (pow d 2)) (* w h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))
1545212339.917 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) into (/ (* c0 (pow d 2)) (* w h))
1545212339.917 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.918 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.918 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212339.918 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212339.918 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212339.918 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212339.918 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.918 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.918 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.919 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212339.919 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 h)) into 0
1545212339.919 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212339.919 * [misc]backup-simplify:  Simplify (- (/ 0 (* h w)) (+ (* (/ (* c0 (pow d 2)) (* w h)) (/ 0 (* h w))))) into 0
1545212339.919 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.919 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* w h)) 0) (* 0 (/ (* c0 (pow d 2)) (* w h)))) into 0
1545212339.919 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))))) into 0
1545212339.919 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in D
1545212339.919 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212339.920 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212339.920 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.920 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212339.920 * [misc]taylor:  Taking taylor expansion of d in D
1545212339.920 * [misc]backup-simplify:  Simplify d into d
1545212339.920 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in D
1545212339.920 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212339.920 * [misc]taylor:  Taking taylor expansion of D in D
1545212339.920 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.920 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.920 * [misc]taylor:  Taking taylor expansion of (* w h) in D
1545212339.920 * [misc]taylor:  Taking taylor expansion of w in D
1545212339.920 * [misc]backup-simplify:  Simplify w into w
1545212339.920 * [misc]taylor:  Taking taylor expansion of h in D
1545212339.920 * [misc]backup-simplify:  Simplify h into h
1545212339.920 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.920 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.920 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.920 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212339.920 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212339.920 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212339.920 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of M in d
1545212339.920 * [misc]backup-simplify:  Simplify M into M
1545212339.920 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212339.920 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.920 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of d in d
1545212339.920 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.920 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.920 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of w in d
1545212339.920 * [misc]backup-simplify:  Simplify w into w
1545212339.920 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212339.920 * [misc]taylor:  Taking taylor expansion of D in d
1545212339.921 * [misc]backup-simplify:  Simplify D into D
1545212339.921 * [misc]taylor:  Taking taylor expansion of h in d
1545212339.921 * [misc]backup-simplify:  Simplify h into h
1545212339.921 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.921 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212339.921 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.921 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.921 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212339.921 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212339.921 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in d
1545212339.921 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212339.921 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212339.921 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212339.921 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.921 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212339.921 * [misc]taylor:  Taking taylor expansion of d in d
1545212339.921 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.921 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.921 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212339.921 * [misc]taylor:  Taking taylor expansion of w in d
1545212339.921 * [misc]backup-simplify:  Simplify w into w
1545212339.921 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212339.921 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212339.921 * [misc]taylor:  Taking taylor expansion of D in d
1545212339.921 * [misc]backup-simplify:  Simplify D into D
1545212339.921 * [misc]taylor:  Taking taylor expansion of h in d
1545212339.921 * [misc]backup-simplify:  Simplify h into h
1545212339.921 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.921 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212339.921 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.922 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.922 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212339.922 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212339.922 * [misc]taylor:  Taking taylor expansion of M in d
1545212339.922 * [misc]backup-simplify:  Simplify M into M
1545212339.922 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212339.922 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212339.922 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212339.922 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212339.922 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212339.922 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212339.922 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.922 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.922 * [misc]backup-simplify:  Simplify (+ (* M 0) (* 0 (- M))) into 0
1545212339.922 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212339.922 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in d
1545212339.922 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212339.922 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212339.922 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.922 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212339.923 * [misc]taylor:  Taking taylor expansion of d in d
1545212339.923 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.923 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.923 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in d
1545212339.923 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212339.923 * [misc]taylor:  Taking taylor expansion of D in d
1545212339.923 * [misc]backup-simplify:  Simplify D into D
1545212339.923 * [misc]taylor:  Taking taylor expansion of (* w h) in d
1545212339.923 * [misc]taylor:  Taking taylor expansion of w in d
1545212339.923 * [misc]backup-simplify:  Simplify w into w
1545212339.923 * [misc]taylor:  Taking taylor expansion of h in d
1545212339.923 * [misc]backup-simplify:  Simplify h into h
1545212339.923 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.923 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212339.923 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.923 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212339.923 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212339.923 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212339.923 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of M in w
1545212339.923 * [misc]backup-simplify:  Simplify M into M
1545212339.923 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212339.923 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.923 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of d in w
1545212339.923 * [misc]backup-simplify:  Simplify d into d
1545212339.923 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of w in w
1545212339.923 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.923 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.923 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212339.923 * [misc]taylor:  Taking taylor expansion of D in w
1545212339.923 * [misc]backup-simplify:  Simplify D into D
1545212339.923 * [misc]taylor:  Taking taylor expansion of h in w
1545212339.923 * [misc]backup-simplify:  Simplify h into h
1545212339.924 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.924 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.924 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.924 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.924 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212339.924 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.924 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212339.924 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212339.924 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212339.924 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in w
1545212339.924 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212339.924 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212339.924 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212339.924 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.924 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212339.924 * [misc]taylor:  Taking taylor expansion of d in w
1545212339.924 * [misc]backup-simplify:  Simplify d into d
1545212339.924 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212339.924 * [misc]taylor:  Taking taylor expansion of w in w
1545212339.924 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.924 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.924 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212339.924 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212339.924 * [misc]taylor:  Taking taylor expansion of D in w
1545212339.924 * [misc]backup-simplify:  Simplify D into D
1545212339.924 * [misc]taylor:  Taking taylor expansion of h in w
1545212339.924 * [misc]backup-simplify:  Simplify h into h
1545212339.925 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.925 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.925 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.925 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.925 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212339.925 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.925 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212339.925 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212339.925 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212339.925 * [misc]taylor:  Taking taylor expansion of M in w
1545212339.925 * [misc]backup-simplify:  Simplify M into M
1545212339.925 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212339.926 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) h)) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212339.926 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))
1545212339.926 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212339.926 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.926 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.926 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.926 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212339.927 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212339.927 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212339.927 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212339.927 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212339.927 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.927 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.927 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.927 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212339.928 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (* (pow D 2) h)))) into 0
1545212339.928 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) h)) (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ 0 (* (pow D 2) h))))) into 0
1545212339.928 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212339.928 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) h)))) into 0
1545212339.929 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))))) into 0
1545212339.929 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in w
1545212339.929 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212339.929 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212339.929 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.929 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212339.929 * [misc]taylor:  Taking taylor expansion of d in w
1545212339.929 * [misc]backup-simplify:  Simplify d into d
1545212339.929 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in w
1545212339.929 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212339.929 * [misc]taylor:  Taking taylor expansion of D in w
1545212339.929 * [misc]backup-simplify:  Simplify D into D
1545212339.929 * [misc]taylor:  Taking taylor expansion of (* w h) in w
1545212339.929 * [misc]taylor:  Taking taylor expansion of w in w
1545212339.929 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.929 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.929 * [misc]taylor:  Taking taylor expansion of h in w
1545212339.929 * [misc]backup-simplify:  Simplify h into h
1545212339.929 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.929 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.929 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.929 * [misc]backup-simplify:  Simplify (* 0 h) into 0
1545212339.929 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212339.929 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 h)) into h
1545212339.929 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.930 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212339.930 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212339.930 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of M in h
1545212339.930 * [misc]backup-simplify:  Simplify M into M
1545212339.930 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212339.930 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.930 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of d in h
1545212339.930 * [misc]backup-simplify:  Simplify d into d
1545212339.930 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of w in h
1545212339.930 * [misc]backup-simplify:  Simplify w into w
1545212339.930 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212339.930 * [misc]taylor:  Taking taylor expansion of D in h
1545212339.930 * [misc]backup-simplify:  Simplify D into D
1545212339.930 * [misc]taylor:  Taking taylor expansion of h in h
1545212339.930 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.930 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.930 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.930 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.930 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.930 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212339.930 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212339.930 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.930 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212339.931 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212339.931 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212339.931 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in h
1545212339.931 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212339.931 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212339.931 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212339.931 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.931 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212339.931 * [misc]taylor:  Taking taylor expansion of d in h
1545212339.931 * [misc]backup-simplify:  Simplify d into d
1545212339.931 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212339.931 * [misc]taylor:  Taking taylor expansion of w in h
1545212339.931 * [misc]backup-simplify:  Simplify w into w
1545212339.931 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212339.931 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212339.931 * [misc]taylor:  Taking taylor expansion of D in h
1545212339.931 * [misc]backup-simplify:  Simplify D into D
1545212339.931 * [misc]taylor:  Taking taylor expansion of h in h
1545212339.931 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.931 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.931 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.931 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.931 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.931 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212339.931 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212339.931 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.932 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212339.932 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212339.932 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212339.932 * [misc]taylor:  Taking taylor expansion of M in h
1545212339.932 * [misc]backup-simplify:  Simplify M into M
1545212339.932 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (pow D 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212339.932 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (pow D 2))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212339.932 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (/ (* c0 (pow d 2)) (* (pow D 2) w))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))
1545212339.933 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212339.933 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.933 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.933 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.933 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212339.933 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212339.933 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212339.934 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212339.934 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212339.934 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.934 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.934 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.934 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212339.934 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212339.934 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (* c0 (pow d 2)) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212339.934 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212339.935 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (- M)) (* M (/ (* c0 (pow d 2)) (* (pow D 2) w)))) into (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w)))
1545212339.935 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (* M (pow d 2))) (* w (pow D 2))) (/ (* c0 (* M (pow d 2))) (* (pow D 2) w))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))))) into 0
1545212339.935 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in h
1545212339.935 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212339.935 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212339.935 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.935 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212339.935 * [misc]taylor:  Taking taylor expansion of d in h
1545212339.936 * [misc]backup-simplify:  Simplify d into d
1545212339.936 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in h
1545212339.936 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212339.936 * [misc]taylor:  Taking taylor expansion of D in h
1545212339.936 * [misc]backup-simplify:  Simplify D into D
1545212339.936 * [misc]taylor:  Taking taylor expansion of (* w h) in h
1545212339.936 * [misc]taylor:  Taking taylor expansion of w in h
1545212339.936 * [misc]backup-simplify:  Simplify w into w
1545212339.936 * [misc]taylor:  Taking taylor expansion of h in h
1545212339.936 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.936 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.936 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.936 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.936 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.936 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212339.936 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212339.936 * [misc]backup-simplify:  Simplify (+ (* w 1) (* 0 0)) into w
1545212339.936 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.936 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212339.937 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212339.937 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of M in c0
1545212339.937 * [misc]backup-simplify:  Simplify M into M
1545212339.937 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212339.937 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.937 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.937 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of d in c0
1545212339.937 * [misc]backup-simplify:  Simplify d into d
1545212339.937 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of w in c0
1545212339.937 * [misc]backup-simplify:  Simplify w into w
1545212339.937 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212339.937 * [misc]taylor:  Taking taylor expansion of D in c0
1545212339.937 * [misc]backup-simplify:  Simplify D into D
1545212339.937 * [misc]taylor:  Taking taylor expansion of h in c0
1545212339.937 * [misc]backup-simplify:  Simplify h into h
1545212339.937 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.937 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212339.937 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.937 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212339.937 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.937 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.938 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212339.938 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212339.938 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in c0
1545212339.938 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212339.938 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212339.938 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212339.938 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.938 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.938 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212339.938 * [misc]taylor:  Taking taylor expansion of d in c0
1545212339.938 * [misc]backup-simplify:  Simplify d into d
1545212339.938 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212339.938 * [misc]taylor:  Taking taylor expansion of w in c0
1545212339.938 * [misc]backup-simplify:  Simplify w into w
1545212339.938 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212339.938 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212339.938 * [misc]taylor:  Taking taylor expansion of D in c0
1545212339.938 * [misc]backup-simplify:  Simplify D into D
1545212339.938 * [misc]taylor:  Taking taylor expansion of h in c0
1545212339.938 * [misc]backup-simplify:  Simplify h into h
1545212339.938 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.938 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212339.938 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.938 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212339.938 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.939 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.939 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212339.939 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212339.939 * [misc]taylor:  Taking taylor expansion of M in c0
1545212339.939 * [misc]backup-simplify:  Simplify M into M
1545212339.939 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212339.939 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212339.939 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212339.939 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212339.939 * [misc]backup-simplify:  Simplify (sqrt (* -1 (pow M 2))) into (sqrt (* -1 (pow M 2)))
1545212339.939 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212339.940 * [misc]backup-simplify:  Simplify (+ (/ (pow d 2) (* w (* (pow D 2) h))) 0) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212339.940 * [misc]backup-simplify:  Simplify (+ 0 (/ (pow d 2) (* w (* (pow D 2) h)))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212339.941 * [misc]backup-simplify:  Simplify (+ (* M (/ (pow d 2) (* w (* (pow D 2) h)))) (* (/ (pow d 2) (* w (* (pow D 2) h))) (- M))) into 0
1545212339.941 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (* -1 (pow M 2))))) into 0
1545212339.941 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in c0
1545212339.941 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212339.941 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212339.941 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.941 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.941 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212339.941 * [misc]taylor:  Taking taylor expansion of d in c0
1545212339.941 * [misc]backup-simplify:  Simplify d into d
1545212339.941 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in c0
1545212339.941 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212339.941 * [misc]taylor:  Taking taylor expansion of D in c0
1545212339.941 * [misc]backup-simplify:  Simplify D into D
1545212339.941 * [misc]taylor:  Taking taylor expansion of (* w h) in c0
1545212339.941 * [misc]taylor:  Taking taylor expansion of w in c0
1545212339.941 * [misc]backup-simplify:  Simplify w into w
1545212339.941 * [misc]taylor:  Taking taylor expansion of h in c0
1545212339.941 * [misc]backup-simplify:  Simplify h into h
1545212339.942 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.942 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212339.942 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.942 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212339.943 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.943 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212339.943 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212339.943 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212339.943 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in M
1545212339.943 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212339.943 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212339.943 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212339.943 * [misc]taylor:  Taking taylor expansion of M in M
1545212339.943 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.943 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.943 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212339.943 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212339.943 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212339.943 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.943 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212339.943 * [misc]taylor:  Taking taylor expansion of d in M
1545212339.943 * [misc]backup-simplify:  Simplify d into d
1545212339.944 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212339.944 * [misc]taylor:  Taking taylor expansion of w in M
1545212339.944 * [misc]backup-simplify:  Simplify w into w
1545212339.944 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212339.944 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212339.944 * [misc]taylor:  Taking taylor expansion of D in M
1545212339.944 * [misc]backup-simplify:  Simplify D into D
1545212339.944 * [misc]taylor:  Taking taylor expansion of h in M
1545212339.944 * [misc]backup-simplify:  Simplify h into h
1545212339.944 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.944 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.944 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.944 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.944 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212339.944 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212339.944 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212339.944 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212339.944 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212339.945 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212339.945 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.945 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212339.945 * [misc]taylor:  Taking taylor expansion of d in M
1545212339.945 * [misc]backup-simplify:  Simplify d into d
1545212339.945 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212339.945 * [misc]taylor:  Taking taylor expansion of w in M
1545212339.945 * [misc]backup-simplify:  Simplify w into w
1545212339.945 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212339.945 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212339.945 * [misc]taylor:  Taking taylor expansion of D in M
1545212339.945 * [misc]backup-simplify:  Simplify D into D
1545212339.945 * [misc]taylor:  Taking taylor expansion of h in M
1545212339.945 * [misc]backup-simplify:  Simplify h into h
1545212339.945 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.945 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.945 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.945 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.945 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212339.945 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212339.946 * [misc]taylor:  Taking taylor expansion of M in M
1545212339.946 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.946 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.946 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212339.946 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212339.946 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212339.947 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212339.947 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212339.947 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.948 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.948 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.948 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212339.948 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212339.948 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.949 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212339.949 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212339.949 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.949 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.949 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.949 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212339.949 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212339.950 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.950 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212339.951 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212339.951 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212339.951 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in M
1545212339.951 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212339.951 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212339.952 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.952 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of d in M
1545212339.952 * [misc]backup-simplify:  Simplify d into d
1545212339.952 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of D in M
1545212339.952 * [misc]backup-simplify:  Simplify D into D
1545212339.952 * [misc]taylor:  Taking taylor expansion of (* w h) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of w in M
1545212339.952 * [misc]backup-simplify:  Simplify w into w
1545212339.952 * [misc]taylor:  Taking taylor expansion of h in M
1545212339.952 * [misc]backup-simplify:  Simplify h into h
1545212339.952 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.952 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.952 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.952 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212339.952 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212339.952 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212339.952 * [misc]taylor:  Taking taylor expansion of (+ (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of (sqrt (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of M in M
1545212339.952 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.952 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.952 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212339.952 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.952 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of d in M
1545212339.952 * [misc]backup-simplify:  Simplify d into d
1545212339.952 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of w in M
1545212339.952 * [misc]backup-simplify:  Simplify w into w
1545212339.952 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212339.952 * [misc]taylor:  Taking taylor expansion of D in M
1545212339.952 * [misc]backup-simplify:  Simplify D into D
1545212339.952 * [misc]taylor:  Taking taylor expansion of h in M
1545212339.952 * [misc]backup-simplify:  Simplify h into h
1545212339.952 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.953 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.953 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.953 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.953 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212339.953 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212339.953 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212339.953 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212339.953 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212339.953 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212339.953 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.953 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212339.953 * [misc]taylor:  Taking taylor expansion of d in M
1545212339.953 * [misc]backup-simplify:  Simplify d into d
1545212339.953 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212339.953 * [misc]taylor:  Taking taylor expansion of w in M
1545212339.953 * [misc]backup-simplify:  Simplify w into w
1545212339.953 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212339.953 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212339.953 * [misc]taylor:  Taking taylor expansion of D in M
1545212339.953 * [misc]backup-simplify:  Simplify D into D
1545212339.953 * [misc]taylor:  Taking taylor expansion of h in M
1545212339.953 * [misc]backup-simplify:  Simplify h into h
1545212339.953 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.953 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.953 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.953 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212339.953 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212339.953 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212339.953 * [misc]taylor:  Taking taylor expansion of M in M
1545212339.953 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.953 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.954 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212339.954 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212339.954 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212339.955 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212339.955 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212339.955 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.955 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.956 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.956 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212339.956 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212339.956 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.956 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212339.956 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212339.956 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.956 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.956 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.957 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212339.957 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212339.957 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.957 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212339.957 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212339.958 * [misc]backup-simplify:  Simplify (/ (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) (* 2 (sqrt (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))))) into 0
1545212339.958 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in M
1545212339.958 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212339.958 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212339.958 * [misc]backup-simplify:  Simplify c0 into c0
1545212339.958 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212339.958 * [misc]taylor:  Taking taylor expansion of d in M
1545212339.958 * [misc]backup-simplify:  Simplify d into d
1545212339.958 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in M
1545212339.958 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212339.958 * [misc]taylor:  Taking taylor expansion of D in M
1545212339.958 * [misc]backup-simplify:  Simplify D into D
1545212339.958 * [misc]taylor:  Taking taylor expansion of (* w h) in M
1545212339.958 * [misc]taylor:  Taking taylor expansion of w in M
1545212339.958 * [misc]backup-simplify:  Simplify w into w
1545212339.958 * [misc]taylor:  Taking taylor expansion of h in M
1545212339.958 * [misc]backup-simplify:  Simplify h into h
1545212339.958 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.958 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212339.958 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.958 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212339.958 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212339.958 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212339.959 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212339.959 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) in c0
1545212339.959 * [misc]taylor:  Taking taylor expansion of 2 in c0
1545212339.959 * [misc]backup-simplify:  Simplify 2 into 2
1545212339.959 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) in c0
1545212339.959 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212339.959 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212339.959 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.959 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.959 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212339.959 * [misc]taylor:  Taking taylor expansion of d in c0
1545212339.959 * [misc]backup-simplify:  Simplify d into d
1545212339.959 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* w h)) in c0
1545212339.959 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212339.959 * [misc]taylor:  Taking taylor expansion of D in c0
1545212339.959 * [misc]backup-simplify:  Simplify D into D
1545212339.959 * [misc]taylor:  Taking taylor expansion of (* w h) in c0
1545212339.959 * [misc]taylor:  Taking taylor expansion of w in c0
1545212339.959 * [misc]backup-simplify:  Simplify w into w
1545212339.959 * [misc]taylor:  Taking taylor expansion of h in c0
1545212339.959 * [misc]backup-simplify:  Simplify h into h
1545212339.959 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.959 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212339.959 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.959 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212339.960 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.960 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212339.960 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212339.960 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212339.960 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.960 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212339.960 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212339.960 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.960 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212339.960 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.960 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.960 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212339.961 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.961 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212339.961 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.961 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (* w (* (pow D 2) h)))) into (* 2 (/ (pow d 2) (* w (* (pow D 2) h))))
1545212339.961 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (* w (* (pow D 2) h)))) in h
1545212339.961 * [misc]taylor:  Taking taylor expansion of 2 in h
1545212339.961 * [misc]backup-simplify:  Simplify 2 into 2
1545212339.961 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212339.961 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212339.961 * [misc]taylor:  Taking taylor expansion of d in h
1545212339.961 * [misc]backup-simplify:  Simplify d into d
1545212339.961 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212339.961 * [misc]taylor:  Taking taylor expansion of w in h
1545212339.961 * [misc]backup-simplify:  Simplify w into w
1545212339.961 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212339.961 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212339.961 * [misc]taylor:  Taking taylor expansion of D in h
1545212339.961 * [misc]backup-simplify:  Simplify D into D
1545212339.961 * [misc]taylor:  Taking taylor expansion of h in h
1545212339.961 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.961 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.961 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.961 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.961 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212339.961 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212339.961 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.961 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212339.962 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212339.962 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212339.962 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (* w (pow D 2)))) into (* 2 (/ (pow d 2) (* w (pow D 2))))
1545212339.962 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (* w (pow D 2)))) in w
1545212339.962 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212339.962 * [misc]backup-simplify:  Simplify 2 into 2
1545212339.962 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212339.962 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212339.962 * [misc]taylor:  Taking taylor expansion of d in w
1545212339.962 * [misc]backup-simplify:  Simplify d into d
1545212339.962 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212339.962 * [misc]taylor:  Taking taylor expansion of w in w
1545212339.962 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.962 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.962 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212339.962 * [misc]taylor:  Taking taylor expansion of D in w
1545212339.962 * [misc]backup-simplify:  Simplify D into D
1545212339.962 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.962 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.962 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212339.962 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.962 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212339.962 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212339.962 * [misc]backup-simplify:  Simplify (* 2 (/ (pow d 2) (pow D 2))) into (* 2 (/ (pow d 2) (pow D 2)))
1545212339.962 * [misc]taylor:  Taking taylor expansion of (* 2 (/ (pow d 2) (pow D 2))) in d
1545212339.963 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212339.963 * [misc]backup-simplify:  Simplify 2 into 2
1545212339.963 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212339.963 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212339.963 * [misc]taylor:  Taking taylor expansion of d in d
1545212339.963 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.963 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.963 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212339.963 * [misc]taylor:  Taking taylor expansion of D in d
1545212339.963 * [misc]backup-simplify:  Simplify D into D
1545212339.963 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.963 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.963 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212339.963 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212339.963 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212339.963 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.964 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212339.964 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212339.964 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.964 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212339.964 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.964 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212339.965 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212339.965 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.965 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 h))) into 0
1545212339.965 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))) into 0
1545212339.965 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.966 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.966 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))) into (- 1)
1545212339.967 * [misc]backup-simplify:  Simplify (/ (- (- 1) (pow 0 2) (+)) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2))))
1545212339.967 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212339.967 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212339.967 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 h))) into 0
1545212339.967 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.968 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212339.968 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.968 * [misc]backup-simplify:  Simplify (+ (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 0) into (- (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))))
1545212339.968 * [misc]taylor:  Taking taylor expansion of (- (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) in c0
1545212339.968 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in c0
1545212339.968 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212339.968 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212339.968 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212339.968 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212339.968 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212339.968 * [misc]taylor:  Taking taylor expansion of D in c0
1545212339.968 * [misc]backup-simplify:  Simplify D into D
1545212339.968 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212339.968 * [misc]taylor:  Taking taylor expansion of h in c0
1545212339.968 * [misc]backup-simplify:  Simplify h into h
1545212339.968 * [misc]taylor:  Taking taylor expansion of w in c0
1545212339.968 * [misc]backup-simplify:  Simplify w into w
1545212339.968 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212339.968 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212339.968 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.968 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.968 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212339.968 * [misc]taylor:  Taking taylor expansion of d in c0
1545212339.968 * [misc]backup-simplify:  Simplify d into d
1545212339.969 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.969 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212339.969 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212339.969 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.969 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212339.969 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.969 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212339.969 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212339.969 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212339.969 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.969 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212339.969 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212339.970 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212339.970 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212339.970 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212339.970 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212339.970 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212339.970 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.970 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212339.970 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.970 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212339.971 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212339.971 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 h)) into 0
1545212339.971 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212339.971 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212339.971 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.971 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h))))) into 0
1545212339.971 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212339.971 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.971 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212339.971 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.971 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.972 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.972 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212339.972 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212339.972 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212339.972 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (* w (pow D 2))))) into 0
1545212339.972 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212339.972 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.973 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212339.973 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.973 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212339.973 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212339.973 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ (pow d 2) (pow D 2)))) into 0
1545212339.973 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212339.973 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.973 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212339.973 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.974 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212339.974 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212339.974 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212339.974 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212339.975 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212339.975 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.975 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212339.975 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.976 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212339.976 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212339.976 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212339.976 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212339.976 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))) into 0
1545212339.977 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.977 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.977 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))) into 0
1545212339.978 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))))))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212339.978 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212339.978 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212339.979 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212339.979 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212339.979 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212339.979 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.980 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.980 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212339.980 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.980 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212339.980 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.980 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212339.980 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.980 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212339.980 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212339.981 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212339.981 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212339.981 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212339.981 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212339.981 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212339.981 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.981 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212339.981 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.982 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212339.982 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212339.982 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 h))) into 0
1545212339.982 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212339.982 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212339.983 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.983 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h)))))) into 0
1545212339.983 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212339.983 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.983 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212339.983 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.983 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212339.983 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.983 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212339.983 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.983 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212339.983 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.984 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212339.984 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212339.984 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212339.984 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212339.984 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212339.985 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2)))))) into 0
1545212339.985 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212339.985 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.985 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212339.985 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.985 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212339.985 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.985 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212339.985 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.985 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212339.985 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.985 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212339.985 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212339.986 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212339.986 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212339.986 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2))))) into 0
1545212339.986 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212339.986 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.986 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212339.986 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.986 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212339.986 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.986 * [misc]backup-simplify:  Simplify (* 2 (/ 1 (pow D 2))) into (/ 2 (pow D 2))
1545212339.987 * [misc]taylor:  Taking taylor expansion of (/ 2 (pow D 2)) in D
1545212339.987 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212339.987 * [misc]backup-simplify:  Simplify 2 into 2
1545212339.987 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212339.987 * [misc]taylor:  Taking taylor expansion of D in D
1545212339.987 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.987 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.987 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.987 * [misc]backup-simplify:  Simplify (/ 2 1) into 2
1545212339.987 * [misc]backup-simplify:  Simplify 2 into 2
1545212339.987 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212339.988 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212339.988 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212339.988 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212339.989 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212339.989 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.989 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212339.989 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.990 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212339.990 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212339.990 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212339.991 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212339.991 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h)))))) into 0
1545212339.991 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.992 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212339.992 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))))))) into 0
1545212339.993 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 2) (+ (* 2 (* 0 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))))
1545212339.994 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212339.994 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212339.994 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212339.995 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212339.995 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212339.996 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212339.996 * [misc]backup-simplify:  Simplify (+ (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))) 0) into (- (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))))
1545212339.996 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))))) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212339.996 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212339.996 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6))) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of (* (pow D 6) (* (pow h 3) (pow w 3))) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of (pow D 6) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of D in c0
1545212339.996 * [misc]backup-simplify:  Simplify D into D
1545212339.996 * [misc]taylor:  Taking taylor expansion of (* (pow h 3) (pow w 3)) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of (pow h 3) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of h in c0
1545212339.996 * [misc]backup-simplify:  Simplify h into h
1545212339.996 * [misc]taylor:  Taking taylor expansion of (pow w 3) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of w in c0
1545212339.996 * [misc]backup-simplify:  Simplify w into w
1545212339.996 * [misc]taylor:  Taking taylor expansion of (* (pow c0 3) (pow d 6)) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of (pow c0 3) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212339.996 * [misc]backup-simplify:  Simplify 0 into 0
1545212339.996 * [misc]backup-simplify:  Simplify 1 into 1
1545212339.996 * [misc]taylor:  Taking taylor expansion of (pow d 6) in c0
1545212339.996 * [misc]taylor:  Taking taylor expansion of d in c0
1545212339.996 * [misc]backup-simplify:  Simplify d into d
1545212339.997 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212339.997 * [misc]backup-simplify:  Simplify (* D (pow D 2)) into (pow D 3)
1545212339.997 * [misc]backup-simplify:  Simplify (* (pow D 3) (pow D 3)) into (pow D 6)
1545212339.997 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212339.997 * [misc]backup-simplify:  Simplify (* h (pow h 2)) into (pow h 3)
1545212339.997 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212339.997 * [misc]backup-simplify:  Simplify (* w (pow w 2)) into (pow w 3)
1545212339.997 * [misc]backup-simplify:  Simplify (* (pow h 3) (pow w 3)) into (* (pow h 3) (pow w 3))
1545212339.997 * [misc]backup-simplify:  Simplify (* (pow D 6) (* (pow h 3) (pow w 3))) into (* (pow D 6) (* (pow h 3) (pow w 3)))
1545212339.997 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.997 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212339.997 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212339.997 * [misc]backup-simplify:  Simplify (* d (pow d 2)) into (pow d 3)
1545212339.997 * [misc]backup-simplify:  Simplify (* (pow d 3) (pow d 3)) into (pow d 6)
1545212339.997 * [misc]backup-simplify:  Simplify (* 1 (pow d 6)) into (pow d 6)
1545212339.998 * [misc]backup-simplify:  Simplify (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) into (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))
1545212339.998 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212339.998 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212339.998 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212339.998 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212339.998 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212339.998 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 (pow h 2))) into 0
1545212339.999 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212339.999 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212339.999 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212339.999 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (pow w 2))) into 0
1545212339.999 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212340.000 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212340.000 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3))))) into 0
1545212340.000 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.000 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 (pow D 2))) into 0
1545212340.000 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (* 0 (pow D 3))) into 0
1545212340.000 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (* 0 (pow w 3)))) into 0
1545212340.000 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.001 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212340.001 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (* 0 (pow D 3)))) into 0
1545212340.001 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (* 0 (pow w 3))) into 0
1545212340.001 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.001 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212340.002 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3))))) into 0
1545212340.002 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3)))))) into 0
1545212340.002 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.002 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.002 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.003 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.003 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 (pow d 2))) into 0
1545212340.003 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.003 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3))))) into 0
1545212340.003 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.003 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.004 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (* 0 (pow d 3)))) into 0
1545212340.004 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.004 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.004 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (* 0 (pow d 3))) into 0
1545212340.004 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.004 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.005 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6))))) into 0
1545212340.005 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (* 0 (* (pow h 3) (pow w 3)))) into 0
1545212340.005 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow d 6))) into 0
1545212340.005 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))))) into 0
1545212340.005 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 6)))) into 0
1545212340.006 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))) into 0
1545212340.006 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212340.006 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212340.007 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)))))) into 0
1545212340.007 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.007 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.007 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.007 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.007 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.007 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.007 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.008 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.008 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.008 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212340.009 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.009 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212340.009 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.009 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.009 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.009 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.009 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.010 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.010 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212340.010 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212340.010 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.011 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.011 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.012 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h))))))) into 0
1545212340.012 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.012 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.012 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.012 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.012 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.012 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.012 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.012 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.012 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.012 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.012 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.012 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.012 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.012 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.012 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.012 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.012 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.012 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.012 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.013 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.013 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212340.013 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212340.014 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212340.014 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2))))))) into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.014 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.014 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.015 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.015 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.015 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.015 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.015 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.015 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.015 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.015 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.015 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.015 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.016 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212340.016 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212340.016 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2)))))) into 0
1545212340.016 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.016 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.016 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.016 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.016 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.016 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.016 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.016 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.017 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.017 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.017 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.017 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.017 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.017 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.017 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212340.017 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (/ 1 (pow D 2)))) into 0
1545212340.017 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.017 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.018 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.018 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* 2 (/ 0 1)))) into 0
1545212340.018 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.018 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.018 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212340.019 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212340.019 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212340.019 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212340.020 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212340.020 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.021 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.021 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.021 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212340.021 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212340.022 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212340.022 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212340.023 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow D 2) h))))))) into 0
1545212340.023 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.023 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.024 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 -1) (* 0 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))))) into 0
1545212340.025 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* -1/8 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (* (pow c0 3) (pow d 6)))))) (* 2 (* (* -1/2 (/ (* w (* (pow D 2) h)) (* c0 (pow d 2)))) 0)))) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into 0
1545212340.025 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212340.025 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212340.026 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))))) into 0
1545212340.026 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212340.027 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))))) into 0
1545212340.027 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.027 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.027 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212340.027 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.027 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.027 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.028 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212340.028 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2)))))) into 0
1545212340.028 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212340.029 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2)))))) into 0
1545212340.029 * [misc]backup-simplify:  Simplify (+ (* (pow h 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 3)))))) into 0
1545212340.029 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.030 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212340.030 * [misc]backup-simplify:  Simplify (+ (* (pow D 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 3)))))) into 0
1545212340.030 * [misc]backup-simplify:  Simplify (+ (* (pow D 6) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 3) (pow w 3))))))) into 0
1545212340.031 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.031 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212340.032 * [misc]backup-simplify:  Simplify (+ (* (pow d 3) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 3)))))) into 0
1545212340.032 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212340.032 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212340.033 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 6)))))) into 0
1545212340.033 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 6)) (+ (* (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6)) (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))) (* 0 (/ 0 (pow d 6))))) into 0
1545212340.034 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 6) (* (pow h 3) (pow w 3))) (pow d 6))))))) into 0
1545212340.034 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.034 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.034 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.034 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.034 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.034 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212340.034 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.035 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212340.035 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212340.036 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212340.036 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.036 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))))) into 0
1545212340.037 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.037 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.037 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.037 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.037 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.037 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212340.038 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212340.038 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 h))))) into 0
1545212340.038 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.038 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212340.039 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.039 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (* (pow D 2) h)))))))) into 0
1545212340.039 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.039 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.040 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.040 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.041 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212340.041 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212340.042 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212340.042 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212340.042 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (* w (pow D 2)))))))) into 0
1545212340.042 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.042 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.043 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.043 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.044 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.044 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.045 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.045 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.045 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.045 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.046 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212340.047 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212340.047 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212340.049 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow d 2) (pow D 2))))))) into 0
1545212340.049 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.049 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.049 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.049 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.050 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.050 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.050 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.050 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.050 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.050 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.050 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.050 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.050 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.051 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.051 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.051 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.051 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.051 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.051 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.051 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.051 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.051 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.052 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.052 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212340.052 * [misc]backup-simplify:  Simplify (+ (* 2 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2))))) into 0
1545212340.052 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.052 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.053 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.054 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.054 * [misc]backup-simplify:  Simplify (* 2 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) (* c0 1)))))) into (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212340.057 * [misc]backup-simplify:  Simplify (+ (* (sqrt (sqrt (* (+ (/ 1 M) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) (- (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) (/ 1 M))))) (sqrt (sqrt (* (+ (/ 1 M) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) (- (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) (/ 1 M)))))) (* (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (/ (/ 1 d) (/ 1 D))) (/ (/ 1 d) (/ 1 D)))) into (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))
1545212340.057 * [misc]approximate:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in (M c0 h w d D) around 0
1545212340.057 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in D
1545212340.057 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212340.057 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.057 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.057 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.057 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.057 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.057 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.057 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.057 * [misc]backup-simplify:  Simplify h into h
1545212340.057 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.057 * [misc]backup-simplify:  Simplify w into w
1545212340.057 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212340.057 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.057 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.057 * [misc]backup-simplify:  Simplify d into d
1545212340.057 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.057 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.058 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.058 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.058 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.058 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.058 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.058 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.058 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in D
1545212340.058 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in D
1545212340.058 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212340.058 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212340.058 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.058 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.058 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.058 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.058 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.058 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.058 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.058 * [misc]backup-simplify:  Simplify h into h
1545212340.058 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.059 * [misc]backup-simplify:  Simplify w into w
1545212340.059 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.059 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.059 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.059 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.059 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.059 * [misc]backup-simplify:  Simplify d into d
1545212340.059 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.059 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.059 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.059 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.059 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.059 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.059 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.059 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.059 * [misc]backup-simplify:  Simplify M into M
1545212340.059 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.059 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212340.060 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212340.060 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.060 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.060 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.060 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.060 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.060 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.060 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.060 * [misc]backup-simplify:  Simplify h into h
1545212340.060 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.060 * [misc]backup-simplify:  Simplify w into w
1545212340.060 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.060 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.060 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.060 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.060 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.060 * [misc]backup-simplify:  Simplify d into d
1545212340.060 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.060 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.060 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.060 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.060 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.061 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.061 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.061 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.061 * [misc]backup-simplify:  Simplify M into M
1545212340.061 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.061 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.061 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.061 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.061 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212340.061 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.061 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.061 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.062 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.062 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.062 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.062 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) 0) (* 0 (/ 1 M))) into 0
1545212340.062 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.062 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in d
1545212340.062 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212340.062 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.062 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.062 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.062 * [misc]backup-simplify:  Simplify D into D
1545212340.062 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.062 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.063 * [misc]backup-simplify:  Simplify h into h
1545212340.063 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.063 * [misc]backup-simplify:  Simplify w into w
1545212340.063 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212340.063 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.063 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.063 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.063 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.063 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.063 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.063 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.063 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.063 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.063 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.063 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212340.063 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.063 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in d
1545212340.063 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in d
1545212340.063 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212340.064 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212340.064 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.064 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.064 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.064 * [misc]backup-simplify:  Simplify D into D
1545212340.064 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.064 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.064 * [misc]backup-simplify:  Simplify h into h
1545212340.064 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.064 * [misc]backup-simplify:  Simplify w into w
1545212340.064 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.064 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.064 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.064 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.064 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.064 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.064 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.064 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.064 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.064 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.064 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.064 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.065 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.065 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.065 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.065 * [misc]backup-simplify:  Simplify M into M
1545212340.065 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.065 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212340.065 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212340.065 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.065 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.065 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.065 * [misc]backup-simplify:  Simplify D into D
1545212340.065 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.065 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.065 * [misc]backup-simplify:  Simplify h into h
1545212340.065 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.065 * [misc]backup-simplify:  Simplify w into w
1545212340.065 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.065 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.065 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.065 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.065 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.065 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.065 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.065 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.065 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.065 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.066 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.066 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.066 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.066 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.066 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.066 * [misc]backup-simplify:  Simplify M into M
1545212340.066 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.066 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.066 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.067 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) c0) (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212340.067 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212340.067 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.067 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.067 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.068 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.068 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212340.068 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212340.068 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.068 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.068 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.069 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.069 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.069 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 1)) into 0
1545212340.069 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212340.069 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.070 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) c0) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212340.070 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212340.070 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in w
1545212340.070 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212340.070 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.070 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.070 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.070 * [misc]backup-simplify:  Simplify D into D
1545212340.070 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.070 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.070 * [misc]backup-simplify:  Simplify h into h
1545212340.070 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.070 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.070 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.071 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212340.071 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.071 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.071 * [misc]backup-simplify:  Simplify d into d
1545212340.071 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.071 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.071 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.071 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.071 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.071 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.071 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.071 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.071 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.072 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.072 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.072 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in w
1545212340.072 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in w
1545212340.072 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212340.072 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212340.072 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.072 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.072 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.072 * [misc]backup-simplify:  Simplify D into D
1545212340.072 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.072 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.072 * [misc]backup-simplify:  Simplify h into h
1545212340.072 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.072 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.072 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.072 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.072 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.072 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.072 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.072 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.072 * [misc]backup-simplify:  Simplify d into d
1545212340.072 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.072 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.072 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.073 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.073 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.073 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.073 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.073 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.073 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.073 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.073 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.073 * [misc]backup-simplify:  Simplify M into M
1545212340.074 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.074 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212340.074 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212340.074 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.074 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.074 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.074 * [misc]backup-simplify:  Simplify D into D
1545212340.074 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.074 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.074 * [misc]backup-simplify:  Simplify h into h
1545212340.074 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.074 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.074 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.074 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.074 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.074 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.074 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.074 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.074 * [misc]backup-simplify:  Simplify d into d
1545212340.074 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.074 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.074 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.074 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.075 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.075 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.075 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.075 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.075 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.075 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.075 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.075 * [misc]backup-simplify:  Simplify M into M
1545212340.075 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.075 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.075 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.076 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.076 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212340.076 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.076 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.076 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.076 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.076 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.077 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) h) (* c0 (pow d 2))) 0) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.077 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (/ (* (pow D 2) h) (* c0 (pow d 2))) (/ 1 M))) into 0
1545212340.078 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.078 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in h
1545212340.078 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212340.078 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.078 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.078 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.078 * [misc]backup-simplify:  Simplify D into D
1545212340.078 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.078 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.078 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.078 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.078 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.078 * [misc]backup-simplify:  Simplify w into w
1545212340.078 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212340.078 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.078 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.078 * [misc]backup-simplify:  Simplify d into d
1545212340.078 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.078 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.078 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.078 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.078 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.078 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.079 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.079 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.079 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.079 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.079 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.079 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in h
1545212340.079 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in h
1545212340.079 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212340.079 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212340.079 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.079 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.079 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.079 * [misc]backup-simplify:  Simplify D into D
1545212340.079 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.079 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.079 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.079 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.079 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.079 * [misc]backup-simplify:  Simplify w into w
1545212340.079 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.079 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.079 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.079 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.079 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.080 * [misc]backup-simplify:  Simplify d into d
1545212340.080 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.080 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.080 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.080 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.080 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.080 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.080 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.080 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.080 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.080 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.080 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.080 * [misc]backup-simplify:  Simplify M into M
1545212340.080 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.080 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212340.080 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212340.080 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.080 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.080 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.080 * [misc]backup-simplify:  Simplify D into D
1545212340.080 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.080 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.080 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.080 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.080 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.080 * [misc]backup-simplify:  Simplify w into w
1545212340.080 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.081 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.081 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.081 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.081 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.081 * [misc]backup-simplify:  Simplify d into d
1545212340.081 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.081 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.081 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.081 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.081 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.081 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.081 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.081 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.081 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.081 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.081 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.081 * [misc]backup-simplify:  Simplify M into M
1545212340.081 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.081 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.081 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.082 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.082 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212340.082 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.082 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.082 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212340.082 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.082 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.082 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) w) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212340.083 * [misc]backup-simplify:  Simplify (+ (* (- (/ 1 M)) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (/ (* (pow D 2) w) (* c0 (pow d 2))) (/ 1 M))) into (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M))))
1545212340.083 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) w) (* (pow d 2) (* c0 M))) (/ (* (pow D 2) w) (* c0 (* (pow d 2) M)))) (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.083 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in c0
1545212340.083 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.083 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.083 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.083 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.083 * [misc]backup-simplify:  Simplify D into D
1545212340.083 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.083 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.083 * [misc]backup-simplify:  Simplify h into h
1545212340.083 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.083 * [misc]backup-simplify:  Simplify w into w
1545212340.083 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.083 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.083 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.083 * [misc]backup-simplify:  Simplify d into d
1545212340.083 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.083 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.083 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.083 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.083 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.083 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.083 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.083 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.084 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.084 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.084 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.084 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in c0
1545212340.084 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in c0
1545212340.084 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212340.084 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212340.084 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.084 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.084 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.084 * [misc]backup-simplify:  Simplify D into D
1545212340.084 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.084 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.084 * [misc]backup-simplify:  Simplify h into h
1545212340.084 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.084 * [misc]backup-simplify:  Simplify w into w
1545212340.084 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.084 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.084 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.084 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.084 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.084 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.084 * [misc]backup-simplify:  Simplify d into d
1545212340.084 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.084 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.084 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.084 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.084 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.084 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.085 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.085 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.085 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.085 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.085 * [misc]backup-simplify:  Simplify M into M
1545212340.085 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.085 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212340.085 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212340.085 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.085 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.085 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.085 * [misc]backup-simplify:  Simplify D into D
1545212340.085 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.085 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.085 * [misc]backup-simplify:  Simplify h into h
1545212340.085 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.085 * [misc]backup-simplify:  Simplify w into w
1545212340.085 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.085 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.085 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.085 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.085 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.085 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.085 * [misc]backup-simplify:  Simplify d into d
1545212340.085 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.085 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.085 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.085 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.085 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.085 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.085 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.086 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.086 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.086 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.086 * [misc]backup-simplify:  Simplify M into M
1545212340.086 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.086 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.086 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.086 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212340.086 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.086 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.086 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.086 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.087 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.087 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212340.087 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.087 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.087 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.087 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.087 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.087 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.088 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212340.088 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.088 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.088 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.088 * [misc]backup-simplify:  Simplify (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 1 M)) (* (- (/ 1 M)) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212340.089 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212340.089 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.089 * [misc]backup-simplify:  Simplify D into D
1545212340.089 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.089 * [misc]backup-simplify:  Simplify h into h
1545212340.089 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.089 * [misc]backup-simplify:  Simplify w into w
1545212340.089 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.089 * [misc]backup-simplify:  Simplify d into d
1545212340.089 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.089 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.089 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.089 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.089 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.089 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.089 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.089 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.089 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.089 * [misc]backup-simplify:  Simplify D into D
1545212340.089 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.089 * [misc]backup-simplify:  Simplify h into h
1545212340.089 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.089 * [misc]backup-simplify:  Simplify w into w
1545212340.089 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.089 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.089 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.089 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.089 * [misc]backup-simplify:  Simplify d into d
1545212340.090 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.090 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.090 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.090 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.090 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.090 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.090 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.090 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.090 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.090 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.090 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.090 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.090 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.090 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.090 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.090 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.090 * [misc]backup-simplify:  Simplify D into D
1545212340.090 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.090 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.090 * [misc]backup-simplify:  Simplify h into h
1545212340.090 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.090 * [misc]backup-simplify:  Simplify w into w
1545212340.090 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.090 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.090 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.090 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.090 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.090 * [misc]backup-simplify:  Simplify d into d
1545212340.090 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.090 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.090 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.090 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.091 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.091 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.091 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.091 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.091 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.091 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.091 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.091 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212340.091 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212340.091 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212340.091 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.091 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.092 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.092 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.092 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.092 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.092 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.092 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.093 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212340.093 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212340.093 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.093 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.093 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.093 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.093 * [misc]backup-simplify:  Simplify D into D
1545212340.093 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.093 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.093 * [misc]backup-simplify:  Simplify h into h
1545212340.093 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.093 * [misc]backup-simplify:  Simplify w into w
1545212340.093 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.093 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.093 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.093 * [misc]backup-simplify:  Simplify d into d
1545212340.093 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.093 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.093 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.093 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.093 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.094 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.094 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.094 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.094 * [misc]taylor:  Taking taylor expansion of (sqrt (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212340.094 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212340.094 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.094 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.094 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.094 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.094 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.094 * [misc]backup-simplify:  Simplify D into D
1545212340.094 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.094 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.094 * [misc]backup-simplify:  Simplify h into h
1545212340.094 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.094 * [misc]backup-simplify:  Simplify w into w
1545212340.094 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.094 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.094 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.094 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.094 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.094 * [misc]backup-simplify:  Simplify d into d
1545212340.094 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.094 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.095 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.095 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.095 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.095 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.095 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.095 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.095 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.095 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.095 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.095 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.095 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.095 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.095 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.095 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.095 * [misc]backup-simplify:  Simplify D into D
1545212340.095 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.095 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.095 * [misc]backup-simplify:  Simplify h into h
1545212340.095 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.095 * [misc]backup-simplify:  Simplify w into w
1545212340.095 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.095 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.095 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.095 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.095 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.095 * [misc]backup-simplify:  Simplify d into d
1545212340.095 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.095 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.095 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.095 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.095 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.096 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.096 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.096 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.096 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.096 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.096 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.096 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212340.096 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212340.096 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212340.096 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.096 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.097 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.097 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.097 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.097 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.097 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.098 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.098 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 2 (sqrt -1))) into 0
1545212340.099 * [misc]backup-simplify:  Simplify (+ 0 (sqrt -1)) into (sqrt -1)
1545212340.099 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.099 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.099 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.099 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.099 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.099 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.099 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212340.099 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.099 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.099 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.099 * [misc]backup-simplify:  Simplify D into D
1545212340.099 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.099 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.099 * [misc]backup-simplify:  Simplify h into h
1545212340.099 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.099 * [misc]backup-simplify:  Simplify w into w
1545212340.099 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.099 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.099 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.099 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.099 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.099 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.100 * [misc]backup-simplify:  Simplify d into d
1545212340.100 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.100 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.100 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.100 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.100 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.100 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.100 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.100 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.100 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212340.100 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.100 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.100 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.100 * [misc]backup-simplify:  Simplify D into D
1545212340.100 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.100 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.100 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.100 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.100 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.100 * [misc]backup-simplify:  Simplify w into w
1545212340.100 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.100 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.100 * [misc]backup-simplify:  Simplify d into d
1545212340.100 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.100 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.101 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.101 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.101 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.101 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.101 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.101 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212340.101 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212340.101 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.101 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.101 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.101 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.101 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212340.101 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.102 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.102 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.102 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.102 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212340.102 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.102 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.102 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.102 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.102 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.102 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.102 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.102 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.102 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212340.103 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.103 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.103 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.103 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.103 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.103 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212340.103 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.104 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.104 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.104 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.104 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.104 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.104 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.104 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212340.104 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.104 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.105 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.105 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.105 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212340.106 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212340.107 * [misc]backup-simplify:  Simplify (+ 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))))
1545212340.107 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212340.107 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212340.107 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.107 * [misc]backup-simplify:  Simplify D into D
1545212340.107 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.107 * [misc]backup-simplify:  Simplify h into h
1545212340.107 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.107 * [misc]backup-simplify:  Simplify w into w
1545212340.107 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.107 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.107 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.107 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.107 * [misc]backup-simplify:  Simplify d into d
1545212340.107 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.107 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.107 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.107 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.107 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.108 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.108 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.108 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.108 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.108 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212340.108 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212340.108 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.108 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.108 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.109 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212340.109 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212340.109 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212340.110 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.110 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.110 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212340.110 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.110 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.110 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212340.110 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.110 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.111 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212340.111 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.111 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212340.112 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.113 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212340.113 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.113 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.113 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.113 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.113 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.113 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.113 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.113 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.114 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.114 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.114 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212340.115 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.115 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.115 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.115 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.115 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.115 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.115 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.115 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212340.115 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212340.115 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.115 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.115 * [misc]backup-simplify:  Simplify D into D
1545212340.115 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.115 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.115 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.115 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.115 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.115 * [misc]backup-simplify:  Simplify d into d
1545212340.116 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.116 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.116 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.116 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212340.116 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.116 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212340.116 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.116 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.116 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.116 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.117 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.117 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.117 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.117 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.118 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.118 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.118 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212340.119 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.119 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.119 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.120 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.120 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.120 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.121 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.121 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.121 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.121 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.122 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.122 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.122 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.123 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.123 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.124 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.124 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.124 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.125 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212340.126 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212340.126 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.126 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212340.126 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.126 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.126 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212340.127 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212340.127 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.127 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212340.128 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212340.129 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.130 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.130 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.130 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.130 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.131 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212340.132 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.133 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212340.133 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.133 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.133 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.133 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.133 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.133 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.133 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.134 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.134 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.134 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.135 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.135 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.135 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.135 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.135 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.135 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.135 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.135 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.137 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.137 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.137 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.137 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.137 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.137 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.137 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.137 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.137 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.137 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.137 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.137 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.137 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.138 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.138 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.138 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.138 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.138 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.138 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.138 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212340.138 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.139 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212340.139 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.139 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.139 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.139 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.139 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.139 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.141 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.141 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.141 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.141 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.141 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.141 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.141 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212340.141 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.141 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.141 * [misc]backup-simplify:  Simplify D into D
1545212340.141 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.141 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.141 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.141 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.141 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.142 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.142 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212340.142 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.142 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.142 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.142 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.142 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.142 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.143 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.143 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.143 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.144 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212340.144 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.144 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.144 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.144 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.144 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.145 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.145 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.146 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.146 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.146 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212340.147 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.148 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.148 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.148 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.149 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.149 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.150 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.150 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.150 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.151 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.151 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.151 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.152 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.152 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.153 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.153 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.154 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.154 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.155 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212340.156 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212340.158 * [misc]backup-simplify:  Simplify (+ 0 (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) into (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))))
1545212340.158 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212340.158 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212340.158 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.158 * [misc]backup-simplify:  Simplify D into D
1545212340.158 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.158 * [misc]backup-simplify:  Simplify h into h
1545212340.158 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.158 * [misc]backup-simplify:  Simplify w into w
1545212340.158 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.158 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.158 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.158 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212340.158 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212340.159 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.159 * [misc]backup-simplify:  Simplify d into d
1545212340.159 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212340.159 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.159 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.159 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.159 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.159 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.159 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.159 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.159 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212340.159 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.160 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212340.160 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.160 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212340.160 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212340.160 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212340.160 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.160 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.160 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.161 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.161 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212340.161 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212340.161 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212340.162 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212340.162 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212340.162 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212340.163 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.163 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.163 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.164 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212340.164 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.164 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212340.164 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212340.164 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212340.165 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212340.165 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212340.165 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212340.166 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212340.166 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212340.166 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.166 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.167 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212340.167 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212340.167 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.167 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212340.168 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212340.168 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212340.168 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.169 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212340.169 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212340.170 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212340.171 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.171 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.172 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212340.172 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.172 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212340.173 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212340.173 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.173 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.173 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212340.173 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212340.174 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.174 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.174 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212340.175 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212340.175 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.175 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.176 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212340.176 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212340.177 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.177 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.177 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212340.177 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.178 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.178 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212340.179 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.179 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.180 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212340.180 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212340.180 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212340.181 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212340.182 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212340.182 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212340.183 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212340.185 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212340.186 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212340.186 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.186 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.186 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.186 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.186 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.186 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.186 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.186 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.187 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.187 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212340.188 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212340.188 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.188 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212340.189 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212340.189 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.190 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.190 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.190 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212340.191 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.191 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.193 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.194 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212340.194 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.194 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.194 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.194 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.194 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.194 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.195 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.195 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.195 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.196 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.198 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212340.198 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.199 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.199 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.199 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.199 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.199 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.199 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.199 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.200 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.200 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.201 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.201 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.201 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.201 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.202 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212340.202 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.203 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.203 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.203 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.203 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.203 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.203 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.203 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.203 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.203 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.203 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.203 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.203 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.203 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.203 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.203 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.203 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.204 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.204 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.204 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.204 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.204 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.204 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.204 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.204 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.204 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.204 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.204 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.204 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.204 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.204 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.204 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.204 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.204 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.205 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.205 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.205 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.205 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.205 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.205 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.205 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.206 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.206 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.206 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.206 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.206 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.207 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212340.207 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.207 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.207 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.207 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.207 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.207 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.208 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.208 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.208 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.208 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.208 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.208 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 M)))))))) into (* (sqrt -1) M)
1545212340.211 * [misc]backup-simplify:  Simplify (+ (* (sqrt (sqrt (* (+ (/ 1 (- M)) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) (- (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) (/ 1 (- M)))))) (sqrt (sqrt (* (+ (/ 1 (- M)) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) (- (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) (/ 1 (- M))))))) (* (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (/ (/ 1 (- d)) (/ 1 (- D)))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.212 * [misc]approximate:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in (M c0 h w d D) around 0
1545212340.212 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.212 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.212 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.212 * [misc]backup-simplify:  Simplify M into M
1545212340.212 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.212 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.212 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.212 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.212 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.212 * [misc]backup-simplify:  Simplify h into h
1545212340.212 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.212 * [misc]backup-simplify:  Simplify w into w
1545212340.212 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.212 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.212 * [misc]backup-simplify:  Simplify d into d
1545212340.212 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.212 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.213 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.213 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.213 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.213 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.213 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.213 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.213 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212340.213 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.213 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.213 * [misc]backup-simplify:  Simplify M into M
1545212340.213 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.213 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212340.213 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.213 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.213 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.213 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.213 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.213 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.213 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.214 * [misc]backup-simplify:  Simplify h into h
1545212340.214 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.214 * [misc]backup-simplify:  Simplify w into w
1545212340.214 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212340.214 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.214 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.214 * [misc]backup-simplify:  Simplify d into d
1545212340.214 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.214 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.214 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.214 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.214 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.214 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.214 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.214 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.214 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.215 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.215 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212340.215 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212340.215 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.215 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.215 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.215 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.215 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.216 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) 0) (* 0 (/ 1 M))) into 0
1545212340.216 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212340.216 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.216 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212340.216 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.216 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.216 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.216 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.216 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.216 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.216 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.216 * [misc]backup-simplify:  Simplify h into h
1545212340.216 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.216 * [misc]backup-simplify:  Simplify w into w
1545212340.216 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.216 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.216 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.216 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.216 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.216 * [misc]backup-simplify:  Simplify d into d
1545212340.217 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.217 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.217 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.217 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.217 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.217 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.217 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in d
1545212340.217 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in d
1545212340.217 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in d
1545212340.217 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.217 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.217 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in d
1545212340.217 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212340.217 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.217 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.217 * [misc]backup-simplify:  Simplify M into M
1545212340.217 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.217 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212340.217 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.218 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.218 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.218 * [misc]backup-simplify:  Simplify D into D
1545212340.218 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.218 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.218 * [misc]backup-simplify:  Simplify h into h
1545212340.218 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.218 * [misc]backup-simplify:  Simplify w into w
1545212340.218 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212340.218 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.218 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.218 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.218 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.218 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.218 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.218 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.218 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.218 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.218 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.218 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212340.218 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.218 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212340.219 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.219 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.219 * [misc]backup-simplify:  Simplify M into M
1545212340.219 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.219 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212340.219 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.219 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.219 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.219 * [misc]backup-simplify:  Simplify D into D
1545212340.219 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.219 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.219 * [misc]backup-simplify:  Simplify h into h
1545212340.219 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.219 * [misc]backup-simplify:  Simplify w into w
1545212340.219 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212340.219 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.219 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.219 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.219 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.219 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.219 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.219 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.219 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.219 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.219 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.220 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212340.220 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.220 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) c0)) into (- (/ (* (pow D 2) (* h w)) c0))
1545212340.220 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) c0))) into (- (/ (* (pow D 2) (* h w)) c0))
1545212340.220 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 2) (* h w)) c0)
1545212340.221 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) c0)) (/ (* (pow D 2) (* h w)) c0)) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))
1545212340.221 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212340.221 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212340.222 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.222 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.222 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.222 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.222 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212340.222 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212340.223 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.223 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.223 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.223 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.223 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.223 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212340.224 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212340.224 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.224 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.224 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) c0)) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212340.225 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212340.225 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212340.225 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212340.225 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.225 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.225 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.225 * [misc]backup-simplify:  Simplify D into D
1545212340.225 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.225 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.225 * [misc]backup-simplify:  Simplify h into h
1545212340.225 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.225 * [misc]backup-simplify:  Simplify w into w
1545212340.225 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.225 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.225 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.225 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.225 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.225 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.226 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.226 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.226 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.226 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.226 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.226 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.226 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.226 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in w
1545212340.226 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in w
1545212340.226 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in w
1545212340.226 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.226 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.226 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in w
1545212340.226 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212340.226 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.226 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.226 * [misc]backup-simplify:  Simplify M into M
1545212340.226 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.226 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212340.226 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.227 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.227 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.227 * [misc]backup-simplify:  Simplify D into D
1545212340.227 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.227 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.227 * [misc]backup-simplify:  Simplify h into h
1545212340.227 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.227 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.227 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.227 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212340.227 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.227 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.227 * [misc]backup-simplify:  Simplify d into d
1545212340.227 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.227 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.227 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.227 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.227 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.227 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.227 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.228 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.228 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.228 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.228 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.228 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212340.228 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.228 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.228 * [misc]backup-simplify:  Simplify M into M
1545212340.228 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.228 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212340.228 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.228 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.228 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.228 * [misc]backup-simplify:  Simplify D into D
1545212340.228 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.228 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.229 * [misc]backup-simplify:  Simplify h into h
1545212340.229 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.229 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.229 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.229 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212340.229 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.229 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.229 * [misc]backup-simplify:  Simplify d into d
1545212340.229 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.229 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.229 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.229 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.229 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.229 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.229 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.230 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.230 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.230 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.230 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.230 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.230 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.230 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212340.230 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212340.230 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.231 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.231 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.231 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.231 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212340.232 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) h) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212340.232 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) (/ 1 M))) into 0
1545212340.233 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212340.233 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.233 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212340.233 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.233 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.233 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.233 * [misc]backup-simplify:  Simplify D into D
1545212340.233 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.233 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.233 * [misc]backup-simplify:  Simplify h into h
1545212340.233 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.233 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.233 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.233 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.233 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.233 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.233 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.233 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.233 * [misc]backup-simplify:  Simplify d into d
1545212340.233 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.233 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.233 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.234 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.234 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.234 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.234 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.234 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.234 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.234 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.235 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.235 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.235 * [misc]backup-simplify:  Simplify M into M
1545212340.235 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.235 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.235 * [misc]backup-simplify:  Simplify D into D
1545212340.235 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.235 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.235 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.235 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.235 * [misc]backup-simplify:  Simplify w into w
1545212340.235 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.235 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.235 * [misc]backup-simplify:  Simplify d into d
1545212340.235 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.235 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.235 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.235 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.236 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.236 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.236 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.236 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.236 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.236 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.236 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.237 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212340.237 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.237 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.237 * [misc]backup-simplify:  Simplify M into M
1545212340.237 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.237 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212340.237 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.237 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.237 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.237 * [misc]backup-simplify:  Simplify D into D
1545212340.237 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.237 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.237 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.237 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.237 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.237 * [misc]backup-simplify:  Simplify w into w
1545212340.237 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212340.237 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.237 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.237 * [misc]backup-simplify:  Simplify d into d
1545212340.237 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.237 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.237 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.237 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.237 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.238 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.238 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.238 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.238 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.238 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.238 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.238 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.239 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.239 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212340.239 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212340.239 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.239 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.239 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) w) (* (pow d 2) c0))) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212340.239 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.240 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (* (pow d 2) c0))) into (- (/ (* (pow D 2) w) (* c0 (pow d 2))))
1545212340.240 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) w) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) w) (* (pow d 2) c0)))
1545212340.241 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) w) (* (pow d 2) c0))) (/ 1 M))) into 0
1545212340.241 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212340.241 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.241 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212340.241 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.241 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.241 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.241 * [misc]backup-simplify:  Simplify D into D
1545212340.241 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.241 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.242 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.242 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.242 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.242 * [misc]backup-simplify:  Simplify w into w
1545212340.242 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.242 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.242 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.242 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.242 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.242 * [misc]backup-simplify:  Simplify d into d
1545212340.242 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.242 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.242 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.242 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.242 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.243 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.243 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.243 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.243 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.243 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in c0
1545212340.243 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in c0
1545212340.243 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in c0
1545212340.243 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.243 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.243 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in c0
1545212340.243 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212340.243 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.243 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.243 * [misc]backup-simplify:  Simplify M into M
1545212340.243 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.243 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.243 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.243 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.243 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.243 * [misc]backup-simplify:  Simplify D into D
1545212340.243 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.244 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.244 * [misc]backup-simplify:  Simplify h into h
1545212340.244 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.244 * [misc]backup-simplify:  Simplify w into w
1545212340.244 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.244 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.244 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.244 * [misc]backup-simplify:  Simplify d into d
1545212340.244 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.244 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.244 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.244 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.244 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.244 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.244 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.244 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.245 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.245 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.245 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.245 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212340.245 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.245 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.245 * [misc]backup-simplify:  Simplify M into M
1545212340.245 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.245 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.245 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.245 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.245 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.245 * [misc]backup-simplify:  Simplify D into D
1545212340.245 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.246 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.246 * [misc]backup-simplify:  Simplify h into h
1545212340.246 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.246 * [misc]backup-simplify:  Simplify w into w
1545212340.246 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.246 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.246 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.246 * [misc]backup-simplify:  Simplify d into d
1545212340.246 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.246 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.246 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.246 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.246 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.246 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.246 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.246 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.246 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.247 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.247 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.247 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.248 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (pow d 2)))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.248 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.248 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212340.249 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212340.249 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.249 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.249 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.249 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.250 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.250 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.250 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.251 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.251 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.251 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.251 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.251 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.252 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.252 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.252 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.252 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.253 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ 1 M)) (* (/ 1 M) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212340.254 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212340.254 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212340.254 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212340.254 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.254 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.254 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.254 * [misc]backup-simplify:  Simplify D into D
1545212340.254 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.254 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.254 * [misc]backup-simplify:  Simplify h into h
1545212340.254 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.254 * [misc]backup-simplify:  Simplify w into w
1545212340.254 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.254 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.254 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.254 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.255 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.255 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.255 * [misc]backup-simplify:  Simplify d into d
1545212340.255 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.255 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.255 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.255 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.255 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.255 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.255 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.255 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.255 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in M
1545212340.255 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212340.255 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212340.255 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212340.256 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.256 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.256 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.256 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.256 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.256 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.256 * [misc]backup-simplify:  Simplify D into D
1545212340.256 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.256 * [misc]backup-simplify:  Simplify h into h
1545212340.256 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.256 * [misc]backup-simplify:  Simplify w into w
1545212340.256 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.256 * [misc]backup-simplify:  Simplify d into d
1545212340.256 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.256 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.256 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.256 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.256 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.256 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.256 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.256 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.256 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.256 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.256 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.256 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.257 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.257 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.257 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.257 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.257 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.257 * [misc]backup-simplify:  Simplify D into D
1545212340.257 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.257 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.257 * [misc]backup-simplify:  Simplify h into h
1545212340.257 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.257 * [misc]backup-simplify:  Simplify w into w
1545212340.257 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.257 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.257 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.257 * [misc]backup-simplify:  Simplify d into d
1545212340.257 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.257 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.257 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.257 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.257 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.257 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.257 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.257 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.257 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.257 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.257 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.258 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.258 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.258 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.258 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.258 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.258 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.259 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212340.259 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212340.259 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212340.259 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.259 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.259 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.259 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.259 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.259 * [misc]backup-simplify:  Simplify D into D
1545212340.259 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.259 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.259 * [misc]backup-simplify:  Simplify h into h
1545212340.259 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.259 * [misc]backup-simplify:  Simplify w into w
1545212340.259 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.259 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.259 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.260 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.260 * [misc]backup-simplify:  Simplify d into d
1545212340.260 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.260 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.260 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.260 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.260 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.260 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.260 * [misc]taylor:  Taking taylor expansion of (- (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212340.260 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.260 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.260 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.260 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.260 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.260 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.260 * [misc]backup-simplify:  Simplify D into D
1545212340.260 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.260 * [misc]backup-simplify:  Simplify h into h
1545212340.260 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.260 * [misc]backup-simplify:  Simplify w into w
1545212340.260 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.260 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.260 * [misc]backup-simplify:  Simplify d into d
1545212340.260 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.260 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.260 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.261 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.261 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.261 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.261 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.261 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.261 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.261 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.261 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.261 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.261 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.261 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.261 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.261 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.261 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.261 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.261 * [misc]backup-simplify:  Simplify D into D
1545212340.261 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.261 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.261 * [misc]backup-simplify:  Simplify h into h
1545212340.261 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.261 * [misc]backup-simplify:  Simplify w into w
1545212340.261 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.261 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.261 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.261 * [misc]backup-simplify:  Simplify d into d
1545212340.261 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.261 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.261 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.261 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.261 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.261 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.261 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.262 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.262 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.262 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.262 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.262 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.262 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.262 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.262 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.263 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.263 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.263 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212340.263 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212340.264 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212340.264 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.264 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.264 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.264 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.264 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.264 * [misc]backup-simplify:  Simplify D into D
1545212340.264 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.264 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.264 * [misc]backup-simplify:  Simplify h into h
1545212340.264 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.264 * [misc]backup-simplify:  Simplify w into w
1545212340.264 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.264 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.264 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.264 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.264 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.264 * [misc]backup-simplify:  Simplify d into d
1545212340.264 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.264 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.264 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.264 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.264 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.264 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.265 * [misc]backup-simplify:  Simplify (+ (sqrt -1) 0) into (sqrt -1)
1545212340.265 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.265 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.265 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.265 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.265 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.265 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.265 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212340.265 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212340.265 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.265 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.265 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.265 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.265 * [misc]backup-simplify:  Simplify D into D
1545212340.265 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.265 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.266 * [misc]backup-simplify:  Simplify h into h
1545212340.266 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.266 * [misc]backup-simplify:  Simplify w into w
1545212340.266 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.266 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.266 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.266 * [misc]backup-simplify:  Simplify d into d
1545212340.266 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.266 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.266 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.266 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.266 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.266 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.266 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.266 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.266 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.266 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.266 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.266 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.266 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212340.266 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212340.266 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.266 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.266 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.266 * [misc]backup-simplify:  Simplify D into D
1545212340.266 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.266 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.267 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.267 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.267 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.267 * [misc]backup-simplify:  Simplify w into w
1545212340.267 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.267 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.267 * [misc]backup-simplify:  Simplify d into d
1545212340.267 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.267 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.267 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.267 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.267 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.267 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.267 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.267 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212340.267 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212340.267 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.267 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.267 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.268 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.268 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212340.268 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.268 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.268 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.268 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.268 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212340.268 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.268 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.268 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.268 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.268 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.268 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.268 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.269 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.270 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212340.270 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.270 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.270 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.271 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))
1545212340.271 * [misc]backup-simplify:  Simplify (+ (* -1 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212340.272 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212340.272 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.272 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.272 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.272 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.272 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212340.273 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.273 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.273 * [misc]backup-simplify:  Simplify (+ (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 0) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))))
1545212340.273 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212340.273 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212340.273 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212340.273 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212340.273 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212340.273 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212340.273 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.273 * [misc]backup-simplify:  Simplify D into D
1545212340.273 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212340.273 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212340.273 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.273 * [misc]backup-simplify:  Simplify h into h
1545212340.273 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212340.273 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.273 * [misc]backup-simplify:  Simplify w into w
1545212340.273 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212340.273 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212340.273 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.274 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.274 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.274 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212340.274 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212340.274 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.274 * [misc]backup-simplify:  Simplify d into d
1545212340.274 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.274 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.274 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.274 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.274 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.274 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.274 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.274 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.274 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.274 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212340.274 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212340.274 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.274 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.274 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.275 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212340.275 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212340.275 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212340.275 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.275 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.275 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212340.275 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.275 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.275 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212340.276 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.276 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.276 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212340.276 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.276 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212340.277 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.277 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212340.277 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.277 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.277 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.277 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.277 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.277 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.277 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.277 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.277 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.278 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.278 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.278 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.278 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.278 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.278 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.278 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.278 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.278 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.278 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.278 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.278 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.278 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.278 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.278 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.278 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.278 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (pow d 2))) into (- (/ (* (pow D 2) w) (pow d 2)))
1545212340.278 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) w) (pow d 2))) in w
1545212340.278 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212340.278 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212340.278 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.278 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.279 * [misc]backup-simplify:  Simplify D into D
1545212340.279 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.279 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.279 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.279 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.279 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.279 * [misc]backup-simplify:  Simplify d into d
1545212340.279 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.279 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.279 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.279 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212340.279 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.279 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212340.279 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.279 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.279 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.279 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.279 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.279 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.280 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.280 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.280 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.280 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.280 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.280 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212340.281 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.281 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.281 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.281 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.281 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.282 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.282 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.282 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212340.282 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.282 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.282 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.283 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212340.283 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1)))) into 0
1545212340.284 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212340.284 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.284 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.285 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.285 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.285 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.285 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.285 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.285 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.285 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212340.285 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.286 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.286 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212340.286 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212340.286 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.286 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212340.286 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212340.287 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.288 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.288 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.288 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.288 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.288 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212340.289 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.289 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212340.290 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.290 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.290 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.290 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.290 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.290 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.290 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.290 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.290 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.290 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.291 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212340.291 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.291 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.291 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.291 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.291 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.291 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.291 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.291 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.292 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.292 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.292 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212340.293 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.293 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212340.293 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.293 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.293 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.293 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.293 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.293 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.293 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.294 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.294 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.294 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.294 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.294 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.294 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.294 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.294 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.294 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.294 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.294 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.294 * [misc]backup-simplify:  Simplify (- (/ (pow D 2) (pow d 2))) into (- (/ (pow D 2) (pow d 2)))
1545212340.294 * [misc]taylor:  Taking taylor expansion of (- (/ (pow D 2) (pow d 2))) in d
1545212340.294 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212340.294 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.294 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.294 * [misc]backup-simplify:  Simplify D into D
1545212340.295 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.295 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.295 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.295 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.295 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.295 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.295 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212340.295 * [misc]backup-simplify:  Simplify (- (pow D 2)) into (- (pow D 2))
1545212340.295 * [misc]taylor:  Taking taylor expansion of (- (pow D 2)) in D
1545212340.295 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.295 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.295 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.295 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.295 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.295 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.296 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.296 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.296 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.296 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212340.296 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.296 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.296 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.296 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.297 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.297 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.297 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.297 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.298 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.298 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.298 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212340.299 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.299 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.299 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.299 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.299 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.300 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.300 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.300 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 c0)))) into 0
1545212340.300 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.301 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.301 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.301 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))))) into 0
1545212340.302 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))))) into 0
1545212340.303 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))
1545212340.303 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.303 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.304 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.304 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.304 * [misc]backup-simplify:  Simplify (+ (* c0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.304 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.305 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.305 * [misc]backup-simplify:  Simplify (+ (* -1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) 0) into (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))))
1545212340.305 * [misc]taylor:  Taking taylor expansion of (- (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))))) in c0
1545212340.305 * [misc]taylor:  Taking taylor expansion of (* 1/8 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))))) in c0
1545212340.305 * [misc]taylor:  Taking taylor expansion of 1/8 in c0
1545212340.305 * [misc]backup-simplify:  Simplify 1/8 into 1/8
1545212340.305 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3)))) in c0
1545212340.305 * [misc]taylor:  Taking taylor expansion of (* (pow D 8) (* (pow h 4) (pow w 4))) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of (pow D 8) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.306 * [misc]backup-simplify:  Simplify D into D
1545212340.306 * [misc]taylor:  Taking taylor expansion of (* (pow h 4) (pow w 4)) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of (pow h 4) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.306 * [misc]backup-simplify:  Simplify h into h
1545212340.306 * [misc]taylor:  Taking taylor expansion of (pow w 4) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.306 * [misc]backup-simplify:  Simplify w into w
1545212340.306 * [misc]taylor:  Taking taylor expansion of (* (pow c0 4) (* (pow d 8) (pow (sqrt -1) 3))) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of (pow c0 4) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.306 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.306 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.306 * [misc]taylor:  Taking taylor expansion of (* (pow d 8) (pow (sqrt -1) 3)) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of (pow d 8) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.306 * [misc]backup-simplify:  Simplify d into d
1545212340.306 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.306 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.306 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.306 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.306 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.306 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.306 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.307 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow D 4)) into (pow D 8)
1545212340.307 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.307 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow h 2)) into (pow h 4)
1545212340.307 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.307 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow w 2)) into (pow w 4)
1545212340.307 * [misc]backup-simplify:  Simplify (* (pow h 4) (pow w 4)) into (* (pow h 4) (pow w 4))
1545212340.307 * [misc]backup-simplify:  Simplify (* (pow D 8) (* (pow h 4) (pow w 4))) into (* (pow D 8) (* (pow h 4) (pow w 4)))
1545212340.307 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.307 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.307 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.307 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.307 * [misc]backup-simplify:  Simplify (* (pow d 4) (pow d 4)) into (pow d 8)
1545212340.307 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212340.308 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212340.308 * [misc]backup-simplify:  Simplify (* (pow d 8) (* -1 (sqrt -1))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212340.308 * [misc]backup-simplify:  Simplify (* 1 (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (* (sqrt -1) (pow d 8)))
1545212340.308 * [misc]backup-simplify:  Simplify (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* -1 (* (sqrt -1) (pow d 8)))) into (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1))))
1545212340.309 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.309 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.309 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.309 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212340.309 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.309 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow h 2))) into 0
1545212340.309 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212340.310 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212340.310 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow h 2)))) into 0
1545212340.310 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow w 2))) into 0
1545212340.310 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212340.310 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow h 2))))) into 0
1545212340.311 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 4))))) into 0
1545212340.311 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.311 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.311 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow D 4))) into 0
1545212340.311 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (+ (* 0 0) (* 0 (pow w 4)))) into 0
1545212340.311 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.311 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212340.311 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (pow D 4)))) into 0
1545212340.312 * [misc]backup-simplify:  Simplify (+ (* (pow h 4) 0) (* 0 (pow w 4))) into 0
1545212340.312 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.312 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212340.312 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 4))))) into 0
1545212340.313 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4)))))) into 0
1545212340.314 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.314 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.314 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212340.314 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.314 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212340.315 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (+ (* 0 0) (* 0 -1)))) into 0
1545212340.315 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.315 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.315 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (pow d 4))) into 0
1545212340.315 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (+ (* 0 0) (* 0 -1))) into 0
1545212340.315 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.315 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.316 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (pow d 4)))) into 0
1545212340.316 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 -1)) into 0
1545212340.316 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.317 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.317 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4))))) into 0
1545212340.318 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1)))))) into 0
1545212340.318 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.318 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.318 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (+ (* 0 0) (* 0 (* -1 (sqrt -1))))) into 0
1545212340.319 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.319 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.319 * [misc]backup-simplify:  Simplify (+ (* (pow d 8) 0) (* 0 (* -1 (sqrt -1)))) into 0
1545212340.320 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.320 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.321 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212340.321 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (* 0 (* (pow h 4) (pow w 4)))) into 0
1545212340.321 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* -1 (* (sqrt -1) (pow d 8))))) into 0
1545212340.322 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212340.323 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* -1 (* (sqrt -1) (pow d 8)))))) into 0
1545212340.325 * [misc]backup-simplify:  Simplify (+ (* (pow D 8) 0) (+ (* 0 0) (* 0 (* (pow h 4) (pow w 4))))) into 0
1545212340.326 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212340.328 * [misc]backup-simplify:  Simplify (- (/ 0 (* -1 (* (sqrt -1) (pow d 8)))) (+ (* (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))) (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))) (* 0 (/ 0 (* -1 (* (sqrt -1) (pow d 8))))))) into 0
1545212340.329 * [misc]backup-simplify:  Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* -1 (/ (* (pow D 8) (* (pow h 4) (pow w 4))) (* (pow d 8) (sqrt -1)))))))) into 0
1545212340.329 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.329 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.329 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.329 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.329 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.329 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.329 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.329 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.330 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.330 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 h)))) into 0
1545212340.331 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow w 2))))) into 0
1545212340.331 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.331 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212340.332 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2)))))) into 0
1545212340.332 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.333 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.333 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.333 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (sqrt -1))))) into 0
1545212340.334 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.334 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.336 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.337 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into 0
1545212340.337 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.337 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.337 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.337 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.337 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.337 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.337 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.338 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.338 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.339 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.339 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212340.340 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.340 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.340 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.340 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.340 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.340 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.340 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.340 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.341 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.341 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.342 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.342 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.342 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.343 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212340.343 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.343 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.344 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.344 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.344 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.344 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.344 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.344 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.344 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.344 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.344 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.344 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.344 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.344 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.344 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.344 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.344 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.344 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.344 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.345 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.345 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.345 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.345 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.345 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.345 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.345 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.345 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.345 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.345 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.345 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.345 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.345 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.345 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.345 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.345 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.346 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.346 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.346 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.346 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.346 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.346 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.347 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.347 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.347 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt -1))) into 0
1545212340.347 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.347 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.347 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.348 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.348 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212340.348 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.348 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.348 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.348 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.349 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.350 * [misc]backup-simplify:  Simplify (* (sqrt -1) (* 1 (* 1 (* 1 (* 1 (* 1 (/ 1 (/ 1 (- M))))))))) into (* -1 (* (sqrt -1) M))
1545212340.350 * * * * [misc]progress:  [ 2 / 4 ] generating series at (2 2 1 2)
1545212340.351 * [misc]backup-simplify:  Simplify (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) into (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4)
1545212340.351 * [misc]approximate:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in (M c0 h w d D) around 0
1545212340.351 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in D
1545212340.351 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in D
1545212340.351 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in D
1545212340.351 * [misc]taylor:  Taking taylor expansion of 1/4 in D
1545212340.351 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.351 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in D
1545212340.351 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in D
1545212340.351 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in D
1545212340.351 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.351 * [misc]backup-simplify:  Simplify M into M
1545212340.351 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212340.351 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.351 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.351 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.351 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.351 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.352 * [misc]backup-simplify:  Simplify d into d
1545212340.352 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212340.352 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.352 * [misc]backup-simplify:  Simplify w into w
1545212340.352 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212340.352 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.352 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.352 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.352 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.352 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.352 * [misc]backup-simplify:  Simplify h into h
1545212340.352 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.352 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.352 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.352 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212340.352 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212340.352 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212340.352 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in D
1545212340.353 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212340.353 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.353 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.353 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.353 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.353 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.353 * [misc]backup-simplify:  Simplify d into d
1545212340.353 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212340.353 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.353 * [misc]backup-simplify:  Simplify w into w
1545212340.353 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212340.353 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.353 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.353 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.353 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.353 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.353 * [misc]backup-simplify:  Simplify h into h
1545212340.353 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.353 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.353 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.353 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212340.353 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212340.354 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212340.354 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.354 * [misc]backup-simplify:  Simplify M into M
1545212340.354 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w h))) into (/ (* c0 (pow d 2)) (* w h))
1545212340.354 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w h)) 0) into (/ (* c0 (pow d 2)) (* w h))
1545212340.354 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* w h)) (/ (* c0 (pow d 2)) (* w h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))
1545212340.355 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2))))
1545212340.355 * [misc]backup-simplify:  Simplify (+ (* (- 4) (log D)) (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2))))) into (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D)))
1545212340.355 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D)))) into (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D))))
1545212340.356 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D))))) into (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D)))))
1545212340.356 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in d
1545212340.356 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in d
1545212340.356 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in d
1545212340.356 * [misc]taylor:  Taking taylor expansion of 1/4 in d
1545212340.356 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.356 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in d
1545212340.356 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in d
1545212340.356 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in d
1545212340.356 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.356 * [misc]backup-simplify:  Simplify M into M
1545212340.356 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212340.356 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.356 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.356 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.356 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.356 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.356 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.357 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.357 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212340.357 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.357 * [misc]backup-simplify:  Simplify w into w
1545212340.357 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212340.357 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.357 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.357 * [misc]backup-simplify:  Simplify D into D
1545212340.357 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.357 * [misc]backup-simplify:  Simplify h into h
1545212340.357 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.357 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.357 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.357 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.357 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.357 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212340.357 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in d
1545212340.358 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212340.358 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.358 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.358 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.358 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.358 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.358 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.358 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.358 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212340.358 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.358 * [misc]backup-simplify:  Simplify w into w
1545212340.358 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212340.358 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.358 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.358 * [misc]backup-simplify:  Simplify D into D
1545212340.358 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.358 * [misc]backup-simplify:  Simplify h into h
1545212340.358 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.358 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.358 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.358 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.358 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.359 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212340.359 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.359 * [misc]backup-simplify:  Simplify M into M
1545212340.359 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212340.359 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212340.359 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212340.359 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212340.359 * [misc]backup-simplify:  Simplify (log (* -1 (pow M 2))) into (log (* -1 (pow M 2)))
1545212340.359 * [misc]backup-simplify:  Simplify (* 1/4 (log (* -1 (pow M 2)))) into (* 1/4 (log (* -1 (pow M 2))))
1545212340.359 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (* -1 (pow M 2))))) into (pow (* -1 (pow M 2)) 1/4)
1545212340.359 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in w
1545212340.359 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in w
1545212340.359 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in w
1545212340.359 * [misc]taylor:  Taking taylor expansion of 1/4 in w
1545212340.359 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.360 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in w
1545212340.360 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in w
1545212340.360 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in w
1545212340.360 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.360 * [misc]backup-simplify:  Simplify M into M
1545212340.360 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212340.360 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.360 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.360 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.360 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.360 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.360 * [misc]backup-simplify:  Simplify d into d
1545212340.360 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212340.360 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.360 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.360 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.360 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212340.360 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.360 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.360 * [misc]backup-simplify:  Simplify D into D
1545212340.360 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.360 * [misc]backup-simplify:  Simplify h into h
1545212340.360 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.360 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.360 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.360 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.361 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212340.361 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.361 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212340.361 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212340.361 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212340.361 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in w
1545212340.361 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212340.362 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.362 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.362 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.362 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.362 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.362 * [misc]backup-simplify:  Simplify d into d
1545212340.362 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212340.362 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.362 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.362 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.362 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212340.362 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.362 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.362 * [misc]backup-simplify:  Simplify D into D
1545212340.362 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.362 * [misc]backup-simplify:  Simplify h into h
1545212340.362 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.362 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.362 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.362 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.363 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212340.363 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.363 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212340.363 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212340.363 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212340.363 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.363 * [misc]backup-simplify:  Simplify M into M
1545212340.364 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212340.364 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) h)) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212340.364 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))
1545212340.365 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2))))
1545212340.365 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log w)) (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2))))) into (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w)))
1545212340.365 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w)))) into (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w))))
1545212340.366 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w))))) into (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w)))))
1545212340.366 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of 1/4 in h
1545212340.366 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.366 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.366 * [misc]backup-simplify:  Simplify M into M
1545212340.366 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.366 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.366 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.366 * [misc]backup-simplify:  Simplify d into d
1545212340.366 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212340.366 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.367 * [misc]backup-simplify:  Simplify w into w
1545212340.367 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212340.367 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.367 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.367 * [misc]backup-simplify:  Simplify D into D
1545212340.367 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.367 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.367 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.367 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.367 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.367 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.367 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.367 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212340.367 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.367 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212340.368 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212340.368 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212340.368 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in h
1545212340.368 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212340.368 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.368 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.368 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.368 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.368 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.368 * [misc]backup-simplify:  Simplify d into d
1545212340.368 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212340.368 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.368 * [misc]backup-simplify:  Simplify w into w
1545212340.368 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212340.368 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.368 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.368 * [misc]backup-simplify:  Simplify D into D
1545212340.368 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.368 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.368 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.369 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.369 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.369 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.369 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.369 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212340.369 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.369 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212340.369 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212340.370 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212340.370 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.370 * [misc]backup-simplify:  Simplify M into M
1545212340.370 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (pow D 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212340.370 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (pow D 2))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212340.371 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (/ (* c0 (pow d 2)) (* (pow D 2) w))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))
1545212340.371 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4))))
1545212340.371 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log h)) (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4))))) into (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h)))
1545212340.372 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h)))) into (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h))))
1545212340.372 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h))))) into (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h)))))
1545212340.372 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in c0
1545212340.372 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in c0
1545212340.372 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in c0
1545212340.372 * [misc]taylor:  Taking taylor expansion of 1/4 in c0
1545212340.372 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.372 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in c0
1545212340.372 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in c0
1545212340.372 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in c0
1545212340.373 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.373 * [misc]backup-simplify:  Simplify M into M
1545212340.373 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212340.373 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.373 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.373 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.373 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.373 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.373 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.373 * [misc]backup-simplify:  Simplify d into d
1545212340.373 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212340.373 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.373 * [misc]backup-simplify:  Simplify w into w
1545212340.373 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212340.373 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.373 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.373 * [misc]backup-simplify:  Simplify D into D
1545212340.373 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.373 * [misc]backup-simplify:  Simplify h into h
1545212340.373 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.373 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.373 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.374 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.374 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.374 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.374 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.374 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212340.374 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in c0
1545212340.374 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212340.374 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.374 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.374 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.374 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.374 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.374 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.374 * [misc]backup-simplify:  Simplify d into d
1545212340.374 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212340.374 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.374 * [misc]backup-simplify:  Simplify w into w
1545212340.374 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212340.374 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.374 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.375 * [misc]backup-simplify:  Simplify D into D
1545212340.375 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.375 * [misc]backup-simplify:  Simplify h into h
1545212340.375 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.375 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.375 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.375 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.375 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.375 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.375 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.376 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212340.376 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.376 * [misc]backup-simplify:  Simplify M into M
1545212340.376 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212340.376 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212340.376 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212340.376 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212340.376 * [misc]backup-simplify:  Simplify (log (* -1 (pow M 2))) into (log (* -1 (pow M 2)))
1545212340.376 * [misc]backup-simplify:  Simplify (* 1/4 (log (* -1 (pow M 2)))) into (* 1/4 (log (* -1 (pow M 2))))
1545212340.376 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (* -1 (pow M 2))))) into (pow (* -1 (pow M 2)) 1/4)
1545212340.376 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in M
1545212340.376 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in M
1545212340.376 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in M
1545212340.376 * [misc]taylor:  Taking taylor expansion of 1/4 in M
1545212340.376 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.376 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212340.376 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212340.377 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212340.377 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.377 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.377 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.377 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212340.377 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.377 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.377 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.377 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.377 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.377 * [misc]backup-simplify:  Simplify d into d
1545212340.377 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212340.377 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.377 * [misc]backup-simplify:  Simplify w into w
1545212340.377 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212340.377 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.377 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.377 * [misc]backup-simplify:  Simplify D into D
1545212340.377 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.377 * [misc]backup-simplify:  Simplify h into h
1545212340.377 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.377 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.377 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.377 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.378 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.378 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212340.378 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212340.378 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212340.378 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.378 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.378 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.378 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.378 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.378 * [misc]backup-simplify:  Simplify d into d
1545212340.378 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212340.378 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.378 * [misc]backup-simplify:  Simplify w into w
1545212340.378 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212340.378 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.378 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.378 * [misc]backup-simplify:  Simplify D into D
1545212340.378 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.378 * [misc]backup-simplify:  Simplify h into h
1545212340.378 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.378 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.378 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.378 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.379 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.379 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212340.379 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.379 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.379 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.379 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.379 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.380 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.380 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212340.381 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))
1545212340.381 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))) into (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))
1545212340.381 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) into (pow (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))) 1/4)
1545212340.381 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in M
1545212340.381 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in M
1545212340.381 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in M
1545212340.381 * [misc]taylor:  Taking taylor expansion of 1/4 in M
1545212340.381 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.381 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212340.382 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212340.382 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212340.382 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.382 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.382 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.382 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212340.382 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.382 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.382 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.382 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.382 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.382 * [misc]backup-simplify:  Simplify d into d
1545212340.382 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212340.382 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.382 * [misc]backup-simplify:  Simplify w into w
1545212340.382 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212340.382 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.382 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.382 * [misc]backup-simplify:  Simplify D into D
1545212340.382 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.382 * [misc]backup-simplify:  Simplify h into h
1545212340.382 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.382 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.382 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.382 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.382 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.383 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212340.383 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212340.383 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212340.383 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.383 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.383 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.383 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.383 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.383 * [misc]backup-simplify:  Simplify d into d
1545212340.383 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212340.383 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.383 * [misc]backup-simplify:  Simplify w into w
1545212340.383 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212340.383 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.383 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.383 * [misc]backup-simplify:  Simplify D into D
1545212340.383 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.383 * [misc]backup-simplify:  Simplify h into h
1545212340.383 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.383 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.383 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.383 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.384 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.384 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212340.384 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.384 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.384 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.384 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.385 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.385 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.385 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212340.386 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))
1545212340.386 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))) into (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))
1545212340.386 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) into (pow (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))) 1/4)
1545212340.386 * [misc]taylor:  Taking taylor expansion of (pow (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))) 1/4) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of 1/4 in c0
1545212340.387 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.387 * [misc]taylor:  Taking taylor expansion of (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (pow d 4)) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.387 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.387 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.387 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.387 * [misc]backup-simplify:  Simplify d into d
1545212340.387 * [misc]taylor:  Taking taylor expansion of (* (pow w 2) (* (pow D 4) (pow h 2))) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.387 * [misc]backup-simplify:  Simplify w into w
1545212340.387 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (pow h 2)) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.387 * [misc]backup-simplify:  Simplify D into D
1545212340.387 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212340.387 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.387 * [misc]backup-simplify:  Simplify h into h
1545212340.388 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.388 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.388 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.388 * [misc]backup-simplify:  Simplify (* 1 (pow d 4)) into (pow d 4)
1545212340.388 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.388 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.388 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.388 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.388 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow h 2)) into (* (pow D 4) (pow h 2))
1545212340.388 * [misc]backup-simplify:  Simplify (* (pow w 2) (* (pow D 4) (pow h 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212340.389 * [misc]backup-simplify:  Simplify (/ (pow d 4) (* (pow D 4) (* (pow h 2) (pow w 2)))) into (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))
1545212340.389 * [misc]backup-simplify:  Simplify (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))) into (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))
1545212340.389 * [misc]backup-simplify:  Simplify (+ (* (- -2) (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))) into (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))
1545212340.390 * [misc]backup-simplify:  Simplify (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))) into (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))
1545212340.390 * [misc]backup-simplify:  Simplify (exp (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))) into (exp (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))))
1545212340.390 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))) in h
1545212340.390 * [misc]taylor:  Taking taylor expansion of (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))) in h
1545212340.390 * [misc]taylor:  Taking taylor expansion of 1/4 in h
1545212340.390 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.390 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))) in h
1545212340.390 * [misc]taylor:  Taking taylor expansion of (* 2 (log c0)) in h
1545212340.390 * [misc]taylor:  Taking taylor expansion of 2 in h
1545212340.390 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.390 * [misc]taylor:  Taking taylor expansion of (log c0) in h
1545212340.390 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.391 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.391 * [misc]backup-simplify:  Simplify (log c0) into (log c0)
1545212340.391 * [misc]taylor:  Taking taylor expansion of (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))) in h
1545212340.391 * [misc]taylor:  Taking taylor expansion of (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))) in h
1545212340.391 * [misc]taylor:  Taking taylor expansion of (pow d 4) in h
1545212340.391 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.391 * [misc]backup-simplify:  Simplify d into d
1545212340.391 * [misc]taylor:  Taking taylor expansion of (* (pow w 2) (* (pow D 4) (pow h 2))) in h
1545212340.391 * [misc]taylor:  Taking taylor expansion of (pow w 2) in h
1545212340.391 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.391 * [misc]backup-simplify:  Simplify w into w
1545212340.391 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (pow h 2)) in h
1545212340.391 * [misc]taylor:  Taking taylor expansion of (pow D 4) in h
1545212340.391 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.391 * [misc]backup-simplify:  Simplify D into D
1545212340.391 * [misc]taylor:  Taking taylor expansion of (pow h 2) in h
1545212340.391 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.391 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.391 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.391 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.391 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.391 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.391 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.392 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.392 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.392 * [misc]backup-simplify:  Simplify (* (pow D 4) 1) into (pow D 4)
1545212340.392 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow D 4)) into (* (pow D 4) (pow w 2))
1545212340.392 * [misc]backup-simplify:  Simplify (/ (pow d 4) (* (pow D 4) (pow w 2))) into (/ (pow d 4) (* (pow w 2) (pow D 4)))
1545212340.392 * [misc]backup-simplify:  Simplify (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) into (log (/ (pow d 4) (* (pow w 2) (pow D 4))))
1545212340.392 * [misc]backup-simplify:  Simplify (* 2 (log c0)) into (* 2 (log c0))
1545212340.393 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log h)) (log (/ (pow d 4) (* (pow w 2) (pow D 4))))) into (- (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log h)))
1545212340.393 * [misc]backup-simplify:  Simplify (+ (* 2 (log c0)) (- (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log h)))) into (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h)))
1545212340.393 * [misc]backup-simplify:  Simplify (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h)))) into (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))
1545212340.394 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))) into (exp (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h)))))
1545212340.394 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h)))) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of 1/4 in w
1545212340.394 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.394 * [misc]taylor:  Taking taylor expansion of (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of (/ (pow d 4) (* (pow w 2) (pow D 4))) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of (pow d 4) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.394 * [misc]backup-simplify:  Simplify d into d
1545212340.394 * [misc]taylor:  Taking taylor expansion of (* (pow w 2) (pow D 4)) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of (pow w 2) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.394 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.394 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.394 * [misc]taylor:  Taking taylor expansion of (pow D 4) in w
1545212340.394 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.394 * [misc]backup-simplify:  Simplify D into D
1545212340.395 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.395 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.395 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.395 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.395 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.395 * [misc]backup-simplify:  Simplify (* 1 (pow D 4)) into (pow D 4)
1545212340.395 * [misc]backup-simplify:  Simplify (/ (pow d 4) (pow D 4)) into (/ (pow d 4) (pow D 4))
1545212340.395 * [misc]backup-simplify:  Simplify (log (/ (pow d 4) (pow D 4))) into (log (/ (pow d 4) (pow D 4)))
1545212340.395 * [misc]taylor:  Taking taylor expansion of (* 2 (log c0)) in w
1545212340.395 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212340.395 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.395 * [misc]taylor:  Taking taylor expansion of (log c0) in w
1545212340.396 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.396 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.396 * [misc]backup-simplify:  Simplify (log c0) into (log c0)
1545212340.396 * [misc]taylor:  Taking taylor expansion of (* 2 (log h)) in w
1545212340.396 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212340.396 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.396 * [misc]taylor:  Taking taylor expansion of (log h) in w
1545212340.396 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.396 * [misc]backup-simplify:  Simplify h into h
1545212340.396 * [misc]backup-simplify:  Simplify (log h) into (log h)
1545212340.396 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log w)) (log (/ (pow d 4) (pow D 4)))) into (- (log (/ (pow d 4) (pow D 4))) (* 2 (log w)))
1545212340.396 * [misc]backup-simplify:  Simplify (* 2 (log c0)) into (* 2 (log c0))
1545212340.396 * [misc]backup-simplify:  Simplify (+ (- (log (/ (pow d 4) (pow D 4))) (* 2 (log w))) (* 2 (log c0))) into (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (* 2 (log w)))
1545212340.397 * [misc]backup-simplify:  Simplify (* 2 (log h)) into (* 2 (log h))
1545212340.397 * [misc]backup-simplify:  Simplify (- (* 2 (log h))) into (- (* 2 (log h)))
1545212340.397 * [misc]backup-simplify:  Simplify (+ (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (* 2 (log w))) (- (* 2 (log h)))) into (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w))))
1545212340.397 * [misc]backup-simplify:  Simplify (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w))))) into (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))
1545212340.398 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w))))))
1545212340.398 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w))))) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of 1/4 in d
1545212340.398 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.398 * [misc]taylor:  Taking taylor expansion of (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of (* 2 (log c0)) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212340.398 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.398 * [misc]taylor:  Taking taylor expansion of (log c0) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.398 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.398 * [misc]backup-simplify:  Simplify (log c0) into (log c0)
1545212340.398 * [misc]taylor:  Taking taylor expansion of (log (/ (pow d 4) (pow D 4))) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of (/ (pow d 4) (pow D 4)) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of (pow d 4) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.398 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.398 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.398 * [misc]taylor:  Taking taylor expansion of (pow D 4) in d
1545212340.398 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.398 * [misc]backup-simplify:  Simplify D into D
1545212340.399 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.399 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.399 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.399 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.399 * [misc]backup-simplify:  Simplify (/ 1 (pow D 4)) into (/ 1 (pow D 4))
1545212340.399 * [misc]backup-simplify:  Simplify (log (/ 1 (pow D 4))) into (log (/ 1 (pow D 4)))
1545212340.399 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log h)) (* 2 (log w))) in d
1545212340.399 * [misc]taylor:  Taking taylor expansion of (* 2 (log h)) in d
1545212340.399 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212340.399 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.399 * [misc]taylor:  Taking taylor expansion of (log h) in d
1545212340.399 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.399 * [misc]backup-simplify:  Simplify h into h
1545212340.399 * [misc]backup-simplify:  Simplify (log h) into (log h)
1545212340.399 * [misc]taylor:  Taking taylor expansion of (* 2 (log w)) in d
1545212340.399 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212340.399 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.399 * [misc]taylor:  Taking taylor expansion of (log w) in d
1545212340.399 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.400 * [misc]backup-simplify:  Simplify w into w
1545212340.400 * [misc]backup-simplify:  Simplify (log w) into (log w)
1545212340.400 * [misc]backup-simplify:  Simplify (* 2 (log c0)) into (* 2 (log c0))
1545212340.400 * [misc]backup-simplify:  Simplify (+ (* (- -4) (log d)) (log (/ 1 (pow D 4)))) into (+ (* 4 (log d)) (log (/ 1 (pow D 4))))
1545212340.400 * [misc]backup-simplify:  Simplify (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) into (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4)))))
1545212340.400 * [misc]backup-simplify:  Simplify (* 2 (log h)) into (* 2 (log h))
1545212340.400 * [misc]backup-simplify:  Simplify (* 2 (log w)) into (* 2 (log w))
1545212340.400 * [misc]backup-simplify:  Simplify (+ (* 2 (log h)) (* 2 (log w))) into (+ (* 2 (log h)) (* 2 (log w)))
1545212340.401 * [misc]backup-simplify:  Simplify (- (+ (* 2 (log h)) (* 2 (log w)))) into (- (+ (* 2 (log h)) (* 2 (log w))))
1545212340.401 * [misc]backup-simplify:  Simplify (+ (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (- (+ (* 2 (log h)) (* 2 (log w))))) into (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h))))
1545212340.401 * [misc]backup-simplify:  Simplify (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h))))) into (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))
1545212340.402 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h))))))
1545212340.402 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))) in D
1545212340.402 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h))))) in D
1545212340.402 * [misc]taylor:  Taking taylor expansion of 1/4 in D
1545212340.402 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.402 * [misc]taylor:  Taking taylor expansion of (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))) in D
1545212340.402 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) in D
1545212340.402 * [misc]taylor:  Taking taylor expansion of (* 2 (log c0)) in D
1545212340.402 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212340.402 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.402 * [misc]taylor:  Taking taylor expansion of (log c0) in D
1545212340.402 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.402 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.402 * [misc]backup-simplify:  Simplify (log c0) into (log c0)
1545212340.402 * [misc]taylor:  Taking taylor expansion of (+ (* 4 (log d)) (log (/ 1 (pow D 4)))) in D
1545212340.402 * [misc]taylor:  Taking taylor expansion of (* 4 (log d)) in D
1545212340.402 * [misc]taylor:  Taking taylor expansion of 4 in D
1545212340.402 * [misc]backup-simplify:  Simplify 4 into 4
1545212340.402 * [misc]taylor:  Taking taylor expansion of (log d) in D
1545212340.402 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.402 * [misc]backup-simplify:  Simplify d into d
1545212340.403 * [misc]backup-simplify:  Simplify (log d) into (log d)
1545212340.403 * [misc]taylor:  Taking taylor expansion of (log (/ 1 (pow D 4))) in D
1545212340.403 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 4)) in D
1545212340.403 * [misc]taylor:  Taking taylor expansion of (pow D 4) in D
1545212340.403 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.403 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.403 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.403 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.403 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.403 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.403 * [misc]backup-simplify:  Simplify (log 1) into 0
1545212340.403 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log w)) (* 2 (log h))) in D
1545212340.403 * [misc]taylor:  Taking taylor expansion of (* 2 (log w)) in D
1545212340.403 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212340.403 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.403 * [misc]taylor:  Taking taylor expansion of (log w) in D
1545212340.403 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.403 * [misc]backup-simplify:  Simplify w into w
1545212340.403 * [misc]backup-simplify:  Simplify (log w) into (log w)
1545212340.403 * [misc]taylor:  Taking taylor expansion of (* 2 (log h)) in D
1545212340.403 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212340.403 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.404 * [misc]taylor:  Taking taylor expansion of (log h) in D
1545212340.404 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.404 * [misc]backup-simplify:  Simplify h into h
1545212340.404 * [misc]backup-simplify:  Simplify (log h) into (log h)
1545212340.404 * [misc]backup-simplify:  Simplify (* 2 (log c0)) into (* 2 (log c0))
1545212340.404 * [misc]backup-simplify:  Simplify (* 4 (log d)) into (* 4 (log d))
1545212340.404 * [misc]backup-simplify:  Simplify (+ (* (- 4) (log D)) 0) into (- (* 4 (log D)))
1545212340.404 * [misc]backup-simplify:  Simplify (+ (* 4 (log d)) (- (* 4 (log D)))) into (- (* 4 (log d)) (* 4 (log D)))
1545212340.404 * [misc]backup-simplify:  Simplify (+ (* 2 (log c0)) (- (* 4 (log d)) (* 4 (log D)))) into (- (+ (* 2 (log c0)) (* 4 (log d))) (* 4 (log D)))
1545212340.404 * [misc]backup-simplify:  Simplify (* 2 (log w)) into (* 2 (log w))
1545212340.404 * [misc]backup-simplify:  Simplify (* 2 (log h)) into (* 2 (log h))
1545212340.404 * [misc]backup-simplify:  Simplify (+ (* 2 (log w)) (* 2 (log h))) into (+ (* 2 (log h)) (* 2 (log w)))
1545212340.404 * [misc]backup-simplify:  Simplify (- (+ (* 2 (log h)) (* 2 (log w)))) into (- (+ (* 2 (log h)) (* 2 (log w))))
1545212340.404 * [misc]backup-simplify:  Simplify (+ (- (+ (* 2 (log c0)) (* 4 (log d))) (* 4 (log D))) (- (+ (* 2 (log h)) (* 2 (log w))))) into (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))
1545212340.405 * [misc]backup-simplify:  Simplify (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))) into (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))
1545212340.405 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))))
1545212340.405 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))))
1545212340.405 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.405 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212340.405 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.405 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212340.406 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212340.406 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.406 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212340.406 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212340.406 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.406 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212340.406 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.406 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212340.406 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212340.407 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.407 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.407 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212340.408 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) 1)) (pow (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2)))) 1)))) 1) into 0
1545212340.408 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) into 0
1545212340.409 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.409 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212340.409 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.409 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.409 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.409 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.409 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.409 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.409 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.409 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.409 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.409 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.409 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.409 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.410 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.410 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow d 4))) into 0
1545212340.410 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.410 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.410 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.410 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow h 2))) into 0
1545212340.410 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.410 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (* (pow D 4) (pow h 2)))) into 0
1545212340.410 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 4) (* (pow h 2) (pow w 2)))) (+ (* (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))) (/ 0 (* (pow D 4) (* (pow h 2) (pow w 2))))))) into 0
1545212340.411 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))) 1)))) 1) into 0
1545212340.411 * [misc]backup-simplify:  Simplify (+ (* (- -2) (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))) into (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))
1545212340.412 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))) into 0
1545212340.413 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.413 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.413 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.413 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.413 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.413 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.413 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow c0 1)))) 1) into 0
1545212340.413 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log c0))) into 0
1545212340.414 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.414 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.414 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.414 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.414 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.414 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 1)) into 0
1545212340.414 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.414 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow D 4))) into 0
1545212340.414 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 4) (pow w 2))) (+ (* (/ (pow d 4) (* (pow w 2) (pow D 4))) (/ 0 (* (pow D 4) (pow w 2)))))) into 0
1545212340.415 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ (pow d 4) (* (pow w 2) (pow D 4))) 1)))) 1) into 0
1545212340.415 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.416 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))) into 0
1545212340.417 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.417 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.417 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.417 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.417 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.417 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.417 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.417 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.417 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.417 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.417 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow D 4))) into 0
1545212340.417 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 4)) (+ (* (/ (pow d 4) (pow D 4)) (/ 0 (pow D 4))))) into 0
1545212340.418 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ (pow d 4) (pow D 4)) 1)))) 1) into 0
1545212340.419 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow c0 1)))) 1) into 0
1545212340.419 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log c0))) into 0
1545212340.419 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.419 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow h 1)))) 1) into 0
1545212340.419 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log h))) into 0
1545212340.419 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.420 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.420 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))) into 0
1545212340.421 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.421 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.421 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.421 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.421 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.421 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.421 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow c0 1)))) 1) into 0
1545212340.422 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log c0))) into 0
1545212340.422 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.422 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.422 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.422 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.422 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 4)) (+ (* (/ 1 (pow D 4)) (/ 0 (pow D 4))))) into 0
1545212340.423 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow D 4)) 1)))) 1) into 0
1545212340.423 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.423 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow h 1)))) 1) into 0
1545212340.423 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log h))) into 0
1545212340.424 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow w 1)))) 1) into 0
1545212340.424 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log w))) into 0
1545212340.424 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.424 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.424 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.425 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))) into 0
1545212340.425 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.425 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.425 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.426 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.426 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow c0 1)))) 1) into 0
1545212340.426 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log c0))) into 0
1545212340.427 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow d 1)))) 1) into 0
1545212340.427 * [misc]backup-simplify:  Simplify (+ (* 4 0) (* 0 (log d))) into 0
1545212340.427 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.427 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.427 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.429 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
1545212340.429 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.429 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.429 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow w 1)))) 1) into 0
1545212340.429 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log w))) into 0
1545212340.430 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow h 1)))) 1) into 0
1545212340.430 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log h))) into 0
1545212340.430 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.430 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.430 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.431 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) into 0
1545212340.432 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.432 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.432 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))))
1545212340.433 * [misc]backup-simplify:  Simplify (sqrt (sqrt (* (+ (/ 1 M) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) (- (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) (/ 1 M))))) into (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4)
1545212340.433 * [misc]approximate:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in (M c0 h w d D) around 0
1545212340.433 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of 1/4 in D
1545212340.434 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.434 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.434 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.434 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.434 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.434 * [misc]backup-simplify:  Simplify h into h
1545212340.434 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.434 * [misc]backup-simplify:  Simplify w into w
1545212340.434 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.434 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.434 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.434 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.434 * [misc]backup-simplify:  Simplify d into d
1545212340.435 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.435 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.435 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.435 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.435 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.435 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.435 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.435 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.435 * [misc]backup-simplify:  Simplify M into M
1545212340.435 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.435 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212340.435 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212340.435 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.435 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.435 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.435 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.435 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.435 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.435 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.436 * [misc]backup-simplify:  Simplify h into h
1545212340.436 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.436 * [misc]backup-simplify:  Simplify w into w
1545212340.436 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.436 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.436 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.436 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.436 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.436 * [misc]backup-simplify:  Simplify d into d
1545212340.436 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.436 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.436 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.436 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.436 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.436 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.436 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.436 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.436 * [misc]backup-simplify:  Simplify M into M
1545212340.437 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.437 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.437 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.437 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.437 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212340.437 * [misc]backup-simplify:  Simplify (log (/ -1 (pow M 2))) into (log (/ -1 (pow M 2)))
1545212340.437 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ -1 (pow M 2)))) into (* 1/4 (log (/ -1 (pow M 2))))
1545212340.437 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ -1 (pow M 2))))) into (pow (/ -1 (pow M 2)) 1/4)
1545212340.437 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in d
1545212340.437 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in d
1545212340.437 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in d
1545212340.437 * [misc]taylor:  Taking taylor expansion of 1/4 in d
1545212340.437 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.438 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in d
1545212340.438 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in d
1545212340.438 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212340.438 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212340.438 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.438 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.438 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.438 * [misc]backup-simplify:  Simplify D into D
1545212340.438 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.438 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.438 * [misc]backup-simplify:  Simplify h into h
1545212340.438 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.438 * [misc]backup-simplify:  Simplify w into w
1545212340.438 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.438 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.438 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.438 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.438 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.438 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.438 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.438 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.438 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.438 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.439 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.439 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.439 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.439 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.439 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.439 * [misc]backup-simplify:  Simplify M into M
1545212340.439 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.439 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212340.439 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212340.439 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.439 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.439 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.439 * [misc]backup-simplify:  Simplify D into D
1545212340.439 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.439 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.439 * [misc]backup-simplify:  Simplify h into h
1545212340.439 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.439 * [misc]backup-simplify:  Simplify w into w
1545212340.439 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.439 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.439 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.439 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.439 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.439 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.440 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.440 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.440 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.440 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.440 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.440 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.440 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.440 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.440 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.440 * [misc]backup-simplify:  Simplify M into M
1545212340.440 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.441 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.441 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.441 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) c0) (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212340.441 * [misc]backup-simplify:  Simplify (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))
1545212340.442 * [misc]backup-simplify:  Simplify (+ (* (- 4) (log d)) (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))) into (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d)))
1545212340.442 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d)))) into (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d))))
1545212340.443 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d))))) into (exp (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d)))))
1545212340.443 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of 1/4 in w
1545212340.443 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.443 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.443 * [misc]backup-simplify:  Simplify D into D
1545212340.443 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.443 * [misc]backup-simplify:  Simplify h into h
1545212340.443 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.443 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.443 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.443 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.443 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.444 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.444 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.444 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.444 * [misc]backup-simplify:  Simplify d into d
1545212340.444 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.444 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.444 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.444 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.444 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.444 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.445 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.445 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.445 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.445 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.445 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.445 * [misc]backup-simplify:  Simplify M into M
1545212340.445 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.445 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212340.445 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212340.445 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.445 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.445 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.445 * [misc]backup-simplify:  Simplify D into D
1545212340.445 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.445 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.445 * [misc]backup-simplify:  Simplify h into h
1545212340.445 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.445 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.445 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.445 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.445 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.445 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.445 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.445 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.445 * [misc]backup-simplify:  Simplify d into d
1545212340.445 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.446 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.446 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.446 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.446 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.446 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.446 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.446 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.447 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.447 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.447 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.447 * [misc]backup-simplify:  Simplify M into M
1545212340.447 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.447 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.447 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.447 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.447 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212340.447 * [misc]backup-simplify:  Simplify (log (/ -1 (pow M 2))) into (log (/ -1 (pow M 2)))
1545212340.447 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ -1 (pow M 2)))) into (* 1/4 (log (/ -1 (pow M 2))))
1545212340.447 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ -1 (pow M 2))))) into (pow (/ -1 (pow M 2)) 1/4)
1545212340.447 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of 1/4 in h
1545212340.448 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.448 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.448 * [misc]backup-simplify:  Simplify D into D
1545212340.448 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.448 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.448 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.448 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.448 * [misc]backup-simplify:  Simplify w into w
1545212340.448 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.448 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.448 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.448 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.448 * [misc]backup-simplify:  Simplify d into d
1545212340.448 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.448 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.448 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.449 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.449 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.449 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.449 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.449 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.449 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.449 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.449 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.449 * [misc]backup-simplify:  Simplify M into M
1545212340.449 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.450 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212340.450 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212340.450 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.450 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.450 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.450 * [misc]backup-simplify:  Simplify D into D
1545212340.450 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.450 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.450 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.450 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.450 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.450 * [misc]backup-simplify:  Simplify w into w
1545212340.450 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.450 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.450 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.450 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.450 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.450 * [misc]backup-simplify:  Simplify d into d
1545212340.450 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.450 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.450 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.450 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.450 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.451 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.451 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.451 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.451 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.451 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.451 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.451 * [misc]backup-simplify:  Simplify M into M
1545212340.451 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.451 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.451 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.451 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.452 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212340.452 * [misc]backup-simplify:  Simplify (log (/ -1 (pow M 2))) into (log (/ -1 (pow M 2)))
1545212340.452 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ -1 (pow M 2)))) into (* 1/4 (log (/ -1 (pow M 2))))
1545212340.452 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ -1 (pow M 2))))) into (pow (/ -1 (pow M 2)) 1/4)
1545212340.452 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of 1/4 in c0
1545212340.452 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.452 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.452 * [misc]backup-simplify:  Simplify D into D
1545212340.452 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.452 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.452 * [misc]backup-simplify:  Simplify h into h
1545212340.453 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.453 * [misc]backup-simplify:  Simplify w into w
1545212340.453 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.453 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.453 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.453 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.453 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.453 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.453 * [misc]backup-simplify:  Simplify d into d
1545212340.453 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.453 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.453 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.453 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.453 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.453 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.454 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.454 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.454 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.454 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.454 * [misc]backup-simplify:  Simplify M into M
1545212340.454 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.454 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212340.454 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212340.454 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.454 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.454 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.454 * [misc]backup-simplify:  Simplify D into D
1545212340.454 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.454 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.454 * [misc]backup-simplify:  Simplify h into h
1545212340.454 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.454 * [misc]backup-simplify:  Simplify w into w
1545212340.454 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.454 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.454 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.454 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.454 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.454 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.454 * [misc]backup-simplify:  Simplify d into d
1545212340.454 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.454 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.455 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.455 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.455 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.455 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.455 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.455 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.455 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.455 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.455 * [misc]backup-simplify:  Simplify M into M
1545212340.455 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.456 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.456 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.456 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212340.457 * [misc]backup-simplify:  Simplify (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212340.457 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log c0)) (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0)))
1545212340.457 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0)))) into (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0))))
1545212340.458 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0))))) into (exp (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0)))))
1545212340.458 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of 1/4 in M
1545212340.458 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.458 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.458 * [misc]backup-simplify:  Simplify D into D
1545212340.458 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.458 * [misc]backup-simplify:  Simplify h into h
1545212340.458 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.458 * [misc]backup-simplify:  Simplify w into w
1545212340.458 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.458 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.458 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.458 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.459 * [misc]backup-simplify:  Simplify d into d
1545212340.459 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.459 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.459 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.459 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.459 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.459 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.459 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.459 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.459 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.459 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.459 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.459 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.460 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.460 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.460 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.460 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.460 * [misc]backup-simplify:  Simplify D into D
1545212340.460 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.460 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.460 * [misc]backup-simplify:  Simplify h into h
1545212340.460 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.460 * [misc]backup-simplify:  Simplify w into w
1545212340.460 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.460 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.460 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.460 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.460 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.460 * [misc]backup-simplify:  Simplify d into d
1545212340.460 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.460 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.460 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.460 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.460 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.461 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.461 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.461 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.461 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.461 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.461 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.461 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212340.461 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212340.461 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212340.461 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.462 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.462 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log M)) (log -1)) into (- (log -1) (* 2 (log M)))
1545212340.462 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.463 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.463 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of 1/4 in M
1545212340.463 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.463 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.463 * [misc]backup-simplify:  Simplify D into D
1545212340.463 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.463 * [misc]backup-simplify:  Simplify h into h
1545212340.463 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.463 * [misc]backup-simplify:  Simplify w into w
1545212340.463 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.463 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.463 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.463 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.463 * [misc]backup-simplify:  Simplify d into d
1545212340.463 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.464 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.464 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.464 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.464 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.464 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.464 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.464 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.464 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.464 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.464 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.464 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.464 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.464 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.464 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.465 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.465 * [misc]backup-simplify:  Simplify D into D
1545212340.465 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.465 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.465 * [misc]backup-simplify:  Simplify h into h
1545212340.465 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.465 * [misc]backup-simplify:  Simplify w into w
1545212340.465 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.465 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.465 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.465 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.465 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.465 * [misc]backup-simplify:  Simplify d into d
1545212340.465 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.465 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.465 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.465 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.465 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.465 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.466 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.466 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.466 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.466 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.466 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.466 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212340.467 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212340.467 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212340.467 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.467 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.468 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log M)) (log -1)) into (- (log -1) (* 2 (log M)))
1545212340.468 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.468 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.468 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in c0
1545212340.469 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in c0
1545212340.469 * [misc]taylor:  Taking taylor expansion of 1/4 in c0
1545212340.469 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.469 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in c0
1545212340.469 * [misc]taylor:  Taking taylor expansion of (log -1) in c0
1545212340.469 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.469 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.469 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.469 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in c0
1545212340.469 * [misc]taylor:  Taking taylor expansion of 2 in c0
1545212340.469 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.469 * [misc]taylor:  Taking taylor expansion of (log M) in c0
1545212340.469 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.469 * [misc]backup-simplify:  Simplify M into M
1545212340.469 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.469 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.469 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.470 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.470 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.470 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.470 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in h
1545212340.470 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in h
1545212340.470 * [misc]taylor:  Taking taylor expansion of 1/4 in h
1545212340.470 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.470 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in h
1545212340.471 * [misc]taylor:  Taking taylor expansion of (log -1) in h
1545212340.471 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.471 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.471 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.471 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in h
1545212340.471 * [misc]taylor:  Taking taylor expansion of 2 in h
1545212340.471 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.471 * [misc]taylor:  Taking taylor expansion of (log M) in h
1545212340.471 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.471 * [misc]backup-simplify:  Simplify M into M
1545212340.471 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.471 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.471 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.471 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.472 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.472 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.472 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in w
1545212340.472 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in w
1545212340.472 * [misc]taylor:  Taking taylor expansion of 1/4 in w
1545212340.472 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.472 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in w
1545212340.472 * [misc]taylor:  Taking taylor expansion of (log -1) in w
1545212340.472 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.472 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.473 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.473 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in w
1545212340.473 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212340.473 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.473 * [misc]taylor:  Taking taylor expansion of (log M) in w
1545212340.473 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.473 * [misc]backup-simplify:  Simplify M into M
1545212340.473 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.473 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.473 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.473 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.474 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.474 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.474 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in d
1545212340.474 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in d
1545212340.474 * [misc]taylor:  Taking taylor expansion of 1/4 in d
1545212340.474 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.474 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in d
1545212340.474 * [misc]taylor:  Taking taylor expansion of (log -1) in d
1545212340.474 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.474 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.474 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.474 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in d
1545212340.474 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212340.474 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.474 * [misc]taylor:  Taking taylor expansion of (log M) in d
1545212340.475 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.475 * [misc]backup-simplify:  Simplify M into M
1545212340.475 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.475 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.475 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.475 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.475 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.476 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.476 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in D
1545212340.476 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in D
1545212340.476 * [misc]taylor:  Taking taylor expansion of 1/4 in D
1545212340.476 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.476 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in D
1545212340.476 * [misc]taylor:  Taking taylor expansion of (log -1) in D
1545212340.476 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.476 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.476 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.476 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in D
1545212340.476 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212340.476 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.476 * [misc]taylor:  Taking taylor expansion of (log M) in D
1545212340.476 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.476 * [misc]backup-simplify:  Simplify M into M
1545212340.476 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.477 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.477 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.477 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.477 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.477 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.478 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.478 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.478 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.479 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.479 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.479 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.480 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.481 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) 1)) (pow -1 1)))) 1) into 0
1545212340.482 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log M)) (log -1)) into (- (log -1) (* 2 (log M)))
1545212340.482 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.485 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.485 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212340.485 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.485 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.485 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.485 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.485 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.485 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.485 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.485 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.485 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.485 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.488 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.489 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.489 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.489 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.489 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.490 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.491 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.491 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.491 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.491 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.491 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.491 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.491 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.491 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.491 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.491 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.494 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.495 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.495 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.495 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.495 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.496 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.497 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.497 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.497 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.497 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.497 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.497 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.497 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.497 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.500 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.501 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.501 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.501 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.501 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.502 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.503 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.503 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.503 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.503 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.503 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.503 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.506 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.507 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.507 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.507 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.507 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.508 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.509 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.509 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.509 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.509 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.511 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.512 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.512 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.513 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.513 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.513 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.514 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.514 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.515 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log (/ 1 M)))))) into (exp (* 1/4 (- (log -1) (* 2 (log (/ 1 M))))))
1545212340.516 * [misc]backup-simplify:  Simplify (sqrt (sqrt (* (+ (/ 1 (- M)) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) (- (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) (/ 1 (- M)))))) into (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))))
1545212340.516 * [misc]approximate:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in (M c0 h w d D) around 0
1545212340.516 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.517 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.517 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.517 * [misc]backup-simplify:  Simplify M into M
1545212340.517 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.517 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.517 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.517 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.517 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.517 * [misc]backup-simplify:  Simplify h into h
1545212340.517 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.517 * [misc]backup-simplify:  Simplify w into w
1545212340.517 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.517 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.517 * [misc]backup-simplify:  Simplify d into d
1545212340.517 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.517 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.518 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.518 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.518 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.518 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.518 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.518 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.518 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212340.518 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.518 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.518 * [misc]backup-simplify:  Simplify M into M
1545212340.518 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.518 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212340.518 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.518 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.518 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.518 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.518 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.519 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.519 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.519 * [misc]backup-simplify:  Simplify h into h
1545212340.519 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.519 * [misc]backup-simplify:  Simplify w into w
1545212340.519 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212340.519 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.519 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.519 * [misc]backup-simplify:  Simplify d into d
1545212340.519 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.519 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.519 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.519 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.519 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.519 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.519 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.519 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.520 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.520 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.520 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212340.520 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212340.520 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.520 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.520 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.520 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.521 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.521 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) 0) (* 0 (/ 1 M))) into 0
1545212340.521 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212340.521 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.521 * [misc]backup-simplify:  Simplify (sqrt (sqrt (/ -1 (pow M 2)))) into (sqrt (sqrt (/ -1 (pow M 2))))
1545212340.521 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (sqrt (/ -1 (pow M 2)))))) into 0
1545212340.522 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.522 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.522 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.522 * [misc]backup-simplify:  Simplify M into M
1545212340.522 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.522 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.522 * [misc]backup-simplify:  Simplify D into D
1545212340.522 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.522 * [misc]backup-simplify:  Simplify h into h
1545212340.522 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.522 * [misc]backup-simplify:  Simplify w into w
1545212340.522 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.522 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.522 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.522 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.522 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.522 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.522 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.523 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.523 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.523 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.523 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212340.523 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.523 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212340.523 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.523 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.523 * [misc]backup-simplify:  Simplify M into M
1545212340.523 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.523 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212340.523 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.523 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.523 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.523 * [misc]backup-simplify:  Simplify D into D
1545212340.523 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.523 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.523 * [misc]backup-simplify:  Simplify h into h
1545212340.523 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.523 * [misc]backup-simplify:  Simplify w into w
1545212340.523 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212340.523 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.523 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.523 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.523 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.523 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.523 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.524 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.524 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.524 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.524 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.524 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212340.524 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.524 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) c0)) into (- (/ (* (pow D 2) (* h w)) c0))
1545212340.524 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) c0))) into (- (/ (* (pow D 2) (* h w)) c0))
1545212340.524 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 2) (* h w)) c0)
1545212340.525 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) c0)) (/ (* (pow D 2) (* h w)) c0)) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))
1545212340.525 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212340.525 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212340.525 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.525 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.525 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.525 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.526 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212340.526 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212340.526 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.526 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.526 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.526 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.526 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.526 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212340.527 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212340.527 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.527 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.528 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) c0)) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212340.528 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212340.529 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212340.529 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 2) (* h w)) c0)) into (* (sqrt (/ (* h w) c0)) D)
1545212340.529 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 2) (* h w)) c0)))) into 0
1545212340.529 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.529 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.529 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.529 * [misc]backup-simplify:  Simplify M into M
1545212340.529 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.529 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.529 * [misc]backup-simplify:  Simplify D into D
1545212340.529 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.529 * [misc]backup-simplify:  Simplify h into h
1545212340.529 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.529 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.529 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.529 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.529 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.529 * [misc]backup-simplify:  Simplify d into d
1545212340.529 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.529 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.529 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.529 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.529 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.530 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.530 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.530 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.530 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.530 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.530 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.530 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212340.530 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.530 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.530 * [misc]backup-simplify:  Simplify M into M
1545212340.530 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.530 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212340.530 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.530 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.530 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.530 * [misc]backup-simplify:  Simplify D into D
1545212340.530 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.530 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.530 * [misc]backup-simplify:  Simplify h into h
1545212340.530 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.530 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.530 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.530 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212340.530 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.530 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.530 * [misc]backup-simplify:  Simplify d into d
1545212340.530 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.530 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.530 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.531 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.531 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.531 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.531 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.531 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.531 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.531 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.531 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.531 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.531 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.531 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212340.531 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212340.531 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.532 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.532 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.532 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.532 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212340.532 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) h) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212340.532 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) (/ 1 M))) into 0
1545212340.533 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212340.533 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.533 * [misc]backup-simplify:  Simplify (sqrt (sqrt (/ -1 (pow M 2)))) into (sqrt (sqrt (/ -1 (pow M 2))))
1545212340.533 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (sqrt (/ -1 (pow M 2)))))) into 0
1545212340.533 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.533 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.533 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.533 * [misc]backup-simplify:  Simplify M into M
1545212340.533 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.533 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.533 * [misc]backup-simplify:  Simplify D into D
1545212340.533 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.533 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.533 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.533 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.533 * [misc]backup-simplify:  Simplify w into w
1545212340.533 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.533 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.533 * [misc]backup-simplify:  Simplify d into d
1545212340.533 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.533 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.533 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.534 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.534 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.534 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.534 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.534 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.534 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.534 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.534 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.534 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212340.534 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.534 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.534 * [misc]backup-simplify:  Simplify M into M
1545212340.534 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.534 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212340.534 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.534 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.534 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.534 * [misc]backup-simplify:  Simplify D into D
1545212340.534 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.534 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.534 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.534 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.534 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.534 * [misc]backup-simplify:  Simplify w into w
1545212340.534 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212340.534 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.535 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.535 * [misc]backup-simplify:  Simplify d into d
1545212340.535 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.535 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.535 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.535 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.535 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.535 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.535 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.535 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.535 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.535 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.535 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.535 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.535 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.535 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212340.535 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212340.536 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.536 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.536 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) w) (* (pow d 2) c0))) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212340.536 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.536 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (* (pow d 2) c0))) into (- (/ (* (pow D 2) w) (* c0 (pow d 2))))
1545212340.536 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) w) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) w) (* (pow d 2) c0)))
1545212340.537 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) w) (* (pow d 2) c0))) (/ 1 M))) into 0
1545212340.537 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212340.537 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.537 * [misc]backup-simplify:  Simplify (sqrt (sqrt (/ -1 (pow M 2)))) into (sqrt (sqrt (/ -1 (pow M 2))))
1545212340.537 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (sqrt (/ -1 (pow M 2)))))) into 0
1545212340.537 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.537 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.537 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.537 * [misc]backup-simplify:  Simplify M into M
1545212340.537 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.537 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.537 * [misc]backup-simplify:  Simplify D into D
1545212340.537 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.537 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.537 * [misc]backup-simplify:  Simplify h into h
1545212340.537 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.537 * [misc]backup-simplify:  Simplify w into w
1545212340.538 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.538 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.538 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.538 * [misc]backup-simplify:  Simplify d into d
1545212340.538 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.538 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.538 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.538 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.538 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.538 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.538 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.538 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.538 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.538 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.538 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.538 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212340.538 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.538 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.538 * [misc]backup-simplify:  Simplify M into M
1545212340.538 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.538 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.538 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.538 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.538 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.538 * [misc]backup-simplify:  Simplify D into D
1545212340.538 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.538 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.538 * [misc]backup-simplify:  Simplify h into h
1545212340.538 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.538 * [misc]backup-simplify:  Simplify w into w
1545212340.538 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.538 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.539 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.539 * [misc]backup-simplify:  Simplify d into d
1545212340.539 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.539 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.539 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.539 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.539 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.539 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.539 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.539 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.539 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.539 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.539 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.539 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.539 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (pow d 2)))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.540 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.540 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212340.540 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212340.540 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.540 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.540 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.540 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.541 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.541 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.541 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.541 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.541 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.541 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.541 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.541 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.542 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.542 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.542 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.542 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.542 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ 1 M)) (* (/ 1 M) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212340.543 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212340.543 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212340.543 * [misc]backup-simplify:  Simplify (sqrt 0) into 0
1545212340.543 * [misc]backup-simplify:  Simplify (/ (/ (* (pow D 2) (* h w)) (pow d 2)) (* 2 (sqrt 0))) into (* +nan.0 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.543 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in M
1545212340.543 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212340.543 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212340.543 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212340.543 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.543 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212340.543 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.543 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.543 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.543 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.543 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.544 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.544 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.544 * [misc]backup-simplify:  Simplify D into D
1545212340.544 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.544 * [misc]backup-simplify:  Simplify h into h
1545212340.544 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.544 * [misc]backup-simplify:  Simplify w into w
1545212340.544 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.544 * [misc]backup-simplify:  Simplify d into d
1545212340.544 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.544 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.544 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.544 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.544 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.544 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.544 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.544 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.544 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.544 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.544 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.544 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.544 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.544 * [misc]backup-simplify:  Simplify D into D
1545212340.544 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.544 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.545 * [misc]backup-simplify:  Simplify h into h
1545212340.545 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.545 * [misc]backup-simplify:  Simplify w into w
1545212340.545 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.545 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.545 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.545 * [misc]backup-simplify:  Simplify d into d
1545212340.545 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.545 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.545 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.545 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.545 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.545 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.545 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.545 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.545 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.545 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.545 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.545 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.546 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.546 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.546 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.546 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.546 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.546 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212340.547 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212340.547 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212340.547 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.547 * [misc]backup-simplify:  Simplify (sqrt 0) into 0
1545212340.548 * [misc]backup-simplify:  Simplify (/ (sqrt -1) (* 2 (sqrt 0))) into (* +nan.0 (sqrt -1))
1545212340.548 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212340.548 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.548 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.548 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.548 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.548 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.548 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.548 * [misc]backup-simplify:  Simplify D into D
1545212340.548 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.548 * [misc]backup-simplify:  Simplify h into h
1545212340.548 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.548 * [misc]backup-simplify:  Simplify w into w
1545212340.548 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.548 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.548 * [misc]backup-simplify:  Simplify d into d
1545212340.548 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.548 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.548 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.548 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.549 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.549 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.549 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.549 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.549 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.549 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.549 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.549 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.549 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.549 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.549 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.549 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.549 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.549 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.549 * [misc]backup-simplify:  Simplify D into D
1545212340.549 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.549 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.549 * [misc]backup-simplify:  Simplify h into h
1545212340.549 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.549 * [misc]backup-simplify:  Simplify w into w
1545212340.549 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.549 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.549 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.549 * [misc]backup-simplify:  Simplify d into d
1545212340.549 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.549 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.549 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.549 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.549 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.549 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.549 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.550 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.550 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.550 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.550 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.550 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.550 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.550 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.550 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.551 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.551 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.551 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212340.551 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212340.552 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212340.552 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.552 * [misc]backup-simplify:  Simplify (sqrt 0) into 0
1545212340.552 * [misc]backup-simplify:  Simplify (/ (sqrt -1) (* 2 (sqrt 0))) into (* +nan.0 (sqrt -1))
1545212340.552 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212340.552 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.552 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in c0
1545212340.552 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.552 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.552 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.552 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.552 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.552 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.553 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.553 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.553 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.553 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.553 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.554 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* +nan.0 (sqrt -1)) 2) (+)) (* 2 0)) into (* +nan.0 (pow (sqrt -1) 2))
1545212340.554 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (pow (sqrt -1) 2)) in c0
1545212340.554 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.554 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.554 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 2) in c0
1545212340.554 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.554 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.554 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.554 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.554 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.554 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.554 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in h
1545212340.554 * [misc]taylor:  Taking taylor expansion of +nan.0 in h
1545212340.554 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.554 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212340.554 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.554 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.555 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.555 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.555 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.555 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in w
1545212340.555 * [misc]taylor:  Taking taylor expansion of +nan.0 in w
1545212340.555 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.555 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212340.555 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.555 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.555 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.555 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.555 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.555 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in d
1545212340.555 * [misc]taylor:  Taking taylor expansion of +nan.0 in d
1545212340.556 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.556 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212340.556 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.556 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.556 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.556 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.556 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.556 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.556 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.556 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.556 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.556 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.556 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.556 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.557 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.557 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.557 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.557 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212340.557 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.557 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.557 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.557 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.557 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.558 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.558 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.558 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212340.558 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.558 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.558 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.559 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))
1545212340.560 * [misc]backup-simplify:  Simplify (+ (* -1 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212340.561 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212340.562 * [misc]backup-simplify:  Simplify (/ (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) (+ (* 2 (* (* +nan.0 (sqrt -1)) (* +nan.0 (pow (sqrt -1) 2)))))) (* 2 0)) into (* +nan.0 (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) (* +nan.0 (pow (sqrt -1) 3))))
1545212340.562 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) (* +nan.0 (pow (sqrt -1) 3)))) in c0
1545212340.562 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.562 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.563 * [misc]taylor:  Taking taylor expansion of (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) (* +nan.0 (pow (sqrt -1) 3))) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212340.563 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212340.563 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.563 * [misc]backup-simplify:  Simplify D into D
1545212340.563 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.563 * [misc]backup-simplify:  Simplify h into h
1545212340.563 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.563 * [misc]backup-simplify:  Simplify w into w
1545212340.563 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.563 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.563 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.563 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.563 * [misc]backup-simplify:  Simplify d into d
1545212340.563 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.563 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.563 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.563 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.563 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.563 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.563 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.563 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.563 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.563 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212340.564 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212340.564 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.564 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.564 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.564 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212340.564 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212340.564 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212340.564 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (pow (sqrt -1) 3)) in c0
1545212340.564 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.564 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.564 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212340.564 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.564 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.564 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.565 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.565 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.565 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.565 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.565 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212340.565 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.565 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.565 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212340.565 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.565 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.565 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212340.566 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.566 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212340.566 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.567 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212340.567 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.567 * [misc]backup-simplify:  Simplify (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))
1545212340.568 * [misc]backup-simplify:  Simplify (+ (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))) 0) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))
1545212340.568 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212340.568 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.568 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.568 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.568 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.568 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.568 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.568 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212340.569 * [misc]backup-simplify:  Simplify (* +nan.0 -1) into +nan.0
1545212340.569 * [misc]taylor:  Taking taylor expansion of +nan.0 in h
1545212340.569 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.569 * [misc]taylor:  Taking taylor expansion of +nan.0 in w
1545212340.569 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.569 * [misc]taylor:  Taking taylor expansion of +nan.0 in d
1545212340.569 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.569 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (sqrt -1))) into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (sqrt -1))) into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.569 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.569 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.570 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (sqrt -1))) into 0
1545212340.570 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.570 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.570 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.570 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.570 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.570 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.570 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.570 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.570 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.570 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in D
1545212340.570 * [misc]taylor:  Taking taylor expansion of +nan.0 in D
1545212340.570 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.570 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212340.570 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.570 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.570 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.570 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.571 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.571 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.571 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.571 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.571 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.571 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.571 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.572 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.572 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.572 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.572 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.572 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.572 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212340.573 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.573 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.573 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.573 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.573 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.573 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.574 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.574 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212340.574 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.574 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.574 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.575 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212340.575 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1)))) into 0
1545212340.576 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212340.578 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* +nan.0 (pow (sqrt -1) 2)) 2) (+ (* 2 (* (* +nan.0 (sqrt -1)) (* +nan.0 (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) (* +nan.0 (pow (sqrt -1) 3)))))))) (* 2 0)) into (* +nan.0 (+ (* +nan.0 (pow (sqrt -1) 4)) (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))))))
1545212340.578 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (+ (* +nan.0 (pow (sqrt -1) 4)) (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))))) in c0
1545212340.578 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.578 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.578 * [misc]taylor:  Taking taylor expansion of (+ (* +nan.0 (pow (sqrt -1) 4)) (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))))) in c0
1545212340.578 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (pow (sqrt -1) 4)) in c0
1545212340.578 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.578 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.578 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 4) in c0
1545212340.578 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.578 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.578 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.579 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.579 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.579 * [misc]taylor:  Taking taylor expansion of (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.579 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.579 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.579 * [misc]backup-simplify:  Simplify D into D
1545212340.579 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.579 * [misc]backup-simplify:  Simplify h into h
1545212340.579 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.579 * [misc]backup-simplify:  Simplify w into w
1545212340.579 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (pow d 4)) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.579 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.579 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.579 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212340.579 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.579 * [misc]backup-simplify:  Simplify d into d
1545212340.579 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.579 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.579 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.579 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.579 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212340.579 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212340.580 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.580 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.580 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.580 * [misc]backup-simplify:  Simplify (* 1 (pow d 4)) into (pow d 4)
1545212340.580 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212340.580 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.580 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.580 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212340.580 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.580 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.580 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212340.580 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.580 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.581 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.581 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow d 4))) into 0
1545212340.581 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 4)) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)) (/ 0 (pow d 4))))) into 0
1545212340.581 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into 0
1545212340.581 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.581 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.582 * [misc]backup-simplify:  Simplify (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212340.582 * [misc]backup-simplify:  Simplify (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))
1545212340.582 * [misc]backup-simplify:  Simplify (+ 0 (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))
1545212340.583 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))))) into 0
1545212340.583 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.583 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.583 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.583 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.583 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.583 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212340.583 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212340.583 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.584 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212340.584 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212340.585 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.585 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.585 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.585 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.585 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.586 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212340.586 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.587 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212340.587 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212340.587 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212340.587 * [misc]backup-simplify:  Simplify (* +nan.0 (* -1 (sqrt -1))) into (* +nan.0 (sqrt -1))
1545212340.588 * [misc]backup-simplify:  Simplify (- (* +nan.0 (sqrt -1))) into (- (* +nan.0 (sqrt -1)))
1545212340.588 * [misc]backup-simplify:  Simplify (+ 0 (- (* +nan.0 (sqrt -1)))) into (- (* +nan.0 (sqrt -1)))
1545212340.589 * [misc]backup-simplify:  Simplify (+ (* +nan.0 (- (* +nan.0 (sqrt -1)))) (+ (* 0 0) (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into (- (* +nan.0 (sqrt -1)))
1545212340.589 * [misc]taylor:  Taking taylor expansion of (- (* +nan.0 (sqrt -1))) in h
1545212340.589 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in h
1545212340.589 * [misc]taylor:  Taking taylor expansion of +nan.0 in h
1545212340.589 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.589 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212340.589 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.589 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.589 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.590 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.590 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.590 * [misc]backup-simplify:  Simplify (- (* +nan.0 (sqrt -1))) into (- (* +nan.0 (sqrt -1)))
1545212340.590 * [misc]taylor:  Taking taylor expansion of (- (* +nan.0 (sqrt -1))) in w
1545212340.590 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in w
1545212340.590 * [misc]taylor:  Taking taylor expansion of +nan.0 in w
1545212340.590 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.590 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212340.590 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.590 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.590 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.590 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.591 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.591 * [misc]backup-simplify:  Simplify (- (* +nan.0 (sqrt -1))) into (- (* +nan.0 (sqrt -1)))
1545212340.591 * [misc]taylor:  Taking taylor expansion of (- (* +nan.0 (sqrt -1))) in d
1545212340.591 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in d
1545212340.591 * [misc]taylor:  Taking taylor expansion of +nan.0 in d
1545212340.591 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.591 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212340.591 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.591 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.591 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.591 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.591 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212340.592 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 -1)) into 0
1545212340.592 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.592 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.592 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.592 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.592 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.592 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.593 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.593 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.593 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.594 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.595 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.595 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.595 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.596 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.596 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.596 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.596 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.596 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.596 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.596 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.596 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.596 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.596 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.596 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.596 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.597 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.597 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.597 * * * * [misc]progress:  [ 3 / 4 ] generating series at (2 2 1 1)
1545212340.597 * [misc]backup-simplify:  Simplify (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) into (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4)
1545212340.597 * [misc]approximate:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in (M c0 h w d D) around 0
1545212340.597 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in D
1545212340.597 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in D
1545212340.597 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in D
1545212340.597 * [misc]taylor:  Taking taylor expansion of 1/4 in D
1545212340.597 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.597 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in D
1545212340.597 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.598 * [misc]backup-simplify:  Simplify M into M
1545212340.598 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.598 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.598 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.598 * [misc]backup-simplify:  Simplify d into d
1545212340.598 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.598 * [misc]backup-simplify:  Simplify w into w
1545212340.598 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.598 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.598 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.598 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.598 * [misc]backup-simplify:  Simplify h into h
1545212340.598 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.598 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.598 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.598 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212340.598 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212340.598 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212340.598 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.598 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.598 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.598 * [misc]backup-simplify:  Simplify d into d
1545212340.598 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.598 * [misc]backup-simplify:  Simplify w into w
1545212340.598 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.598 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.598 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.598 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.598 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.599 * [misc]backup-simplify:  Simplify h into h
1545212340.599 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.599 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.599 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.599 * [misc]backup-simplify:  Simplify (* 1 h) into h
1545212340.599 * [misc]backup-simplify:  Simplify (* w h) into (* h w)
1545212340.599 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212340.599 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.599 * [misc]backup-simplify:  Simplify M into M
1545212340.599 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w h))) into (/ (* c0 (pow d 2)) (* w h))
1545212340.599 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w h)) 0) into (/ (* c0 (pow d 2)) (* w h))
1545212340.599 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* w h)) (/ (* c0 (pow d 2)) (* w h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))
1545212340.599 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2))))
1545212340.600 * [misc]backup-simplify:  Simplify (+ (* (- 4) (log D)) (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2))))) into (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D)))
1545212340.600 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D)))) into (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D))))
1545212340.600 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D))))) into (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow h 2)))) (* 4 (log D)))))
1545212340.600 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in d
1545212340.600 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in d
1545212340.600 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in d
1545212340.600 * [misc]taylor:  Taking taylor expansion of 1/4 in d
1545212340.600 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.600 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in d
1545212340.600 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in d
1545212340.600 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in d
1545212340.600 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.600 * [misc]backup-simplify:  Simplify M into M
1545212340.600 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212340.600 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.600 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.600 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.600 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.600 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.600 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.601 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.601 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.601 * [misc]backup-simplify:  Simplify w into w
1545212340.601 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.601 * [misc]backup-simplify:  Simplify D into D
1545212340.601 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.601 * [misc]backup-simplify:  Simplify h into h
1545212340.601 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.601 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.601 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.601 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.601 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.601 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212340.601 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.601 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.601 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.601 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.601 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.601 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.601 * [misc]backup-simplify:  Simplify w into w
1545212340.601 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.601 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.601 * [misc]backup-simplify:  Simplify D into D
1545212340.601 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.601 * [misc]backup-simplify:  Simplify h into h
1545212340.601 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.601 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.602 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.602 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.602 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.602 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212340.602 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.602 * [misc]backup-simplify:  Simplify M into M
1545212340.602 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212340.602 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212340.602 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212340.602 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212340.602 * [misc]backup-simplify:  Simplify (log (* -1 (pow M 2))) into (log (* -1 (pow M 2)))
1545212340.602 * [misc]backup-simplify:  Simplify (* 1/4 (log (* -1 (pow M 2)))) into (* 1/4 (log (* -1 (pow M 2))))
1545212340.602 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (* -1 (pow M 2))))) into (pow (* -1 (pow M 2)) 1/4)
1545212340.602 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in w
1545212340.602 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in w
1545212340.602 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in w
1545212340.602 * [misc]taylor:  Taking taylor expansion of 1/4 in w
1545212340.602 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.602 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in w
1545212340.602 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in w
1545212340.602 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in w
1545212340.602 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.602 * [misc]backup-simplify:  Simplify M into M
1545212340.602 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212340.602 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.602 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.602 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.602 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.603 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.603 * [misc]backup-simplify:  Simplify d into d
1545212340.603 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212340.603 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.603 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.603 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.603 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212340.603 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.603 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.603 * [misc]backup-simplify:  Simplify D into D
1545212340.603 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.603 * [misc]backup-simplify:  Simplify h into h
1545212340.603 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.603 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.603 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.603 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.603 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212340.604 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.604 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212340.604 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212340.604 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212340.604 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in w
1545212340.604 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in w
1545212340.604 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.604 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.604 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.604 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.604 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.604 * [misc]backup-simplify:  Simplify d into d
1545212340.604 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in w
1545212340.604 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.604 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.604 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.604 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in w
1545212340.604 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.604 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.604 * [misc]backup-simplify:  Simplify D into D
1545212340.604 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.604 * [misc]backup-simplify:  Simplify h into h
1545212340.604 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.604 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.604 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.604 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.605 * [misc]backup-simplify:  Simplify (* 0 (* (pow D 2) h)) into 0
1545212340.605 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.605 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212340.605 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (* (pow D 2) h))) into (* (pow D 2) h)
1545212340.605 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212340.605 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.605 * [misc]backup-simplify:  Simplify M into M
1545212340.605 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212340.605 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* (pow D 2) h)) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212340.605 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) h)) (/ (* c0 (pow d 2)) (* (pow D 2) h))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))
1545212340.606 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2))))
1545212340.606 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log w)) (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2))))) into (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w)))
1545212340.606 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w)))) into (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w))))
1545212340.606 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w))))) into (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow h 2)))) (* 2 (log w)))))
1545212340.606 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in h
1545212340.606 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in h
1545212340.606 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in h
1545212340.606 * [misc]taylor:  Taking taylor expansion of 1/4 in h
1545212340.606 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.606 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in h
1545212340.606 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in h
1545212340.606 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in h
1545212340.607 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.607 * [misc]backup-simplify:  Simplify M into M
1545212340.607 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212340.607 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.607 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.607 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.607 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.607 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.607 * [misc]backup-simplify:  Simplify d into d
1545212340.607 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212340.607 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.607 * [misc]backup-simplify:  Simplify w into w
1545212340.607 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212340.607 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.607 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.607 * [misc]backup-simplify:  Simplify D into D
1545212340.607 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.607 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.607 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.607 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.607 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.607 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.607 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.607 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212340.607 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.607 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212340.608 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212340.608 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212340.608 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in h
1545212340.608 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in h
1545212340.608 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.608 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.608 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.608 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.608 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.608 * [misc]backup-simplify:  Simplify d into d
1545212340.608 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212340.608 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.608 * [misc]backup-simplify:  Simplify w into w
1545212340.608 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212340.608 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.608 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.608 * [misc]backup-simplify:  Simplify D into D
1545212340.608 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.608 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.608 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.608 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.608 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.608 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.609 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.609 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212340.609 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.609 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212340.609 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212340.609 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212340.609 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.610 * [misc]backup-simplify:  Simplify M into M
1545212340.610 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (pow D 2)))) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212340.610 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (pow D 2))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) w))
1545212340.610 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) w)) (/ (* c0 (pow d 2)) (* (pow D 2) w))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))
1545212340.611 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (pow w 2)))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4))))
1545212340.611 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log h)) (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4))))) into (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h)))
1545212340.612 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h)))) into (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h))))
1545212340.612 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h))))) into (exp (* 1/4 (- (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (pow D 4)))) (* 2 (log h)))))
1545212340.612 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in c0
1545212340.612 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in c0
1545212340.612 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in c0
1545212340.612 * [misc]taylor:  Taking taylor expansion of 1/4 in c0
1545212340.612 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.612 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in c0
1545212340.612 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in c0
1545212340.612 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in c0
1545212340.612 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.612 * [misc]backup-simplify:  Simplify M into M
1545212340.612 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212340.612 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.612 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.612 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.612 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.612 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.612 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.612 * [misc]backup-simplify:  Simplify d into d
1545212340.613 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212340.613 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.613 * [misc]backup-simplify:  Simplify w into w
1545212340.613 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212340.613 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.613 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.613 * [misc]backup-simplify:  Simplify D into D
1545212340.613 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.613 * [misc]backup-simplify:  Simplify h into h
1545212340.613 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.613 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.613 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.613 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.613 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.613 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.613 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.614 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212340.614 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in c0
1545212340.614 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in c0
1545212340.614 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.614 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.614 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.614 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.614 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.614 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.614 * [misc]backup-simplify:  Simplify d into d
1545212340.614 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in c0
1545212340.614 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.614 * [misc]backup-simplify:  Simplify w into w
1545212340.614 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in c0
1545212340.614 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.614 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.614 * [misc]backup-simplify:  Simplify D into D
1545212340.614 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.614 * [misc]backup-simplify:  Simplify h into h
1545212340.614 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.614 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.614 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.615 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.615 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.615 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.615 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.615 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212340.615 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.615 * [misc]backup-simplify:  Simplify M into M
1545212340.615 * [misc]backup-simplify:  Simplify (+ M 0) into M
1545212340.615 * [misc]backup-simplify:  Simplify (- M) into (- M)
1545212340.615 * [misc]backup-simplify:  Simplify (+ 0 (- M)) into (- M)
1545212340.615 * [misc]backup-simplify:  Simplify (* M (- M)) into (* -1 (pow M 2))
1545212340.615 * [misc]backup-simplify:  Simplify (log (* -1 (pow M 2))) into (log (* -1 (pow M 2)))
1545212340.616 * [misc]backup-simplify:  Simplify (* 1/4 (log (* -1 (pow M 2)))) into (* 1/4 (log (* -1 (pow M 2))))
1545212340.616 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (* -1 (pow M 2))))) into (pow (* -1 (pow M 2)) 1/4)
1545212340.616 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of 1/4 in M
1545212340.616 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.616 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.616 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.616 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.616 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.616 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.616 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.616 * [misc]backup-simplify:  Simplify d into d
1545212340.616 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.616 * [misc]backup-simplify:  Simplify w into w
1545212340.616 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.616 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.616 * [misc]backup-simplify:  Simplify D into D
1545212340.616 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.616 * [misc]backup-simplify:  Simplify h into h
1545212340.617 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.617 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.617 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.617 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.617 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.617 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212340.617 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212340.617 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212340.617 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.617 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.617 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.617 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.617 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.617 * [misc]backup-simplify:  Simplify d into d
1545212340.617 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212340.617 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.617 * [misc]backup-simplify:  Simplify w into w
1545212340.617 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212340.617 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.617 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.618 * [misc]backup-simplify:  Simplify D into D
1545212340.618 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.618 * [misc]backup-simplify:  Simplify h into h
1545212340.618 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.618 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.618 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.618 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.618 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.618 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212340.618 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.618 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.618 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.619 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.619 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.619 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.620 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212340.620 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))
1545212340.620 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))) into (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))
1545212340.621 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) into (pow (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))) 1/4)
1545212340.621 * [misc]taylor:  Taking taylor expansion of (pow (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) 1/4) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))))) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)))) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of 1/4 in M
1545212340.621 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.621 * [misc]taylor:  Taking taylor expansion of (log (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M))) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of (* (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M)) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of (+ M (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.621 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.621 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.621 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.621 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.621 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.621 * [misc]backup-simplify:  Simplify d into d
1545212340.621 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.621 * [misc]backup-simplify:  Simplify w into w
1545212340.621 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.621 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.621 * [misc]backup-simplify:  Simplify D into D
1545212340.621 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.621 * [misc]backup-simplify:  Simplify h into h
1545212340.622 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.622 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.622 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.622 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.622 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.622 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212340.622 * [misc]taylor:  Taking taylor expansion of (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) M) in M
1545212340.622 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) in M
1545212340.622 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.622 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.622 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.622 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.622 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.622 * [misc]backup-simplify:  Simplify d into d
1545212340.622 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in M
1545212340.622 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.622 * [misc]backup-simplify:  Simplify w into w
1545212340.622 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in M
1545212340.622 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.622 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.622 * [misc]backup-simplify:  Simplify D into D
1545212340.622 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.623 * [misc]backup-simplify:  Simplify h into h
1545212340.623 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.623 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.623 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.623 * [misc]backup-simplify:  Simplify (* (pow D 2) h) into (* (pow D 2) h)
1545212340.623 * [misc]backup-simplify:  Simplify (* w (* (pow D 2) h)) into (* (pow D 2) (* h w))
1545212340.623 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) into (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))
1545212340.623 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.623 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.623 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.623 * [misc]backup-simplify:  Simplify (+ 0 (/ (* c0 (pow d 2)) (* w (* (pow D 2) h)))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.624 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.624 * [misc]backup-simplify:  Simplify (+ (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) 0) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.624 * [misc]backup-simplify:  Simplify (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))) into (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))
1545212340.625 * [misc]backup-simplify:  Simplify (log (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2))))) into (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))
1545212340.625 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))) into (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))
1545212340.626 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) into (pow (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))) 1/4)
1545212340.626 * [misc]taylor:  Taking taylor expansion of (pow (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))) 1/4) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))))) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of 1/4 in c0
1545212340.626 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.626 * [misc]taylor:  Taking taylor expansion of (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2)))) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (pow d 4)) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.626 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.626 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.626 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.626 * [misc]backup-simplify:  Simplify d into d
1545212340.626 * [misc]taylor:  Taking taylor expansion of (* (pow w 2) (* (pow D 4) (pow h 2))) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.626 * [misc]backup-simplify:  Simplify w into w
1545212340.626 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (pow h 2)) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.626 * [misc]backup-simplify:  Simplify D into D
1545212340.626 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212340.626 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.626 * [misc]backup-simplify:  Simplify h into h
1545212340.627 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.627 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.627 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.627 * [misc]backup-simplify:  Simplify (* 1 (pow d 4)) into (pow d 4)
1545212340.627 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.627 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.627 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.627 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.627 * [misc]backup-simplify:  Simplify (* (pow D 4) (pow h 2)) into (* (pow D 4) (pow h 2))
1545212340.628 * [misc]backup-simplify:  Simplify (* (pow w 2) (* (pow D 4) (pow h 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212340.628 * [misc]backup-simplify:  Simplify (/ (pow d 4) (* (pow D 4) (* (pow h 2) (pow w 2)))) into (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))
1545212340.628 * [misc]backup-simplify:  Simplify (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))) into (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))
1545212340.629 * [misc]backup-simplify:  Simplify (+ (* (- -2) (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))) into (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))
1545212340.629 * [misc]backup-simplify:  Simplify (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))) into (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))
1545212340.629 * [misc]backup-simplify:  Simplify (exp (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))) into (exp (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))))
1545212340.629 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))) in h
1545212340.629 * [misc]taylor:  Taking taylor expansion of (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))) in h
1545212340.629 * [misc]taylor:  Taking taylor expansion of 1/4 in h
1545212340.629 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.630 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of (* 2 (log c0)) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of 2 in h
1545212340.630 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.630 * [misc]taylor:  Taking taylor expansion of (log c0) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.630 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.630 * [misc]backup-simplify:  Simplify (log c0) into (log c0)
1545212340.630 * [misc]taylor:  Taking taylor expansion of (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of (pow d 4) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.630 * [misc]backup-simplify:  Simplify d into d
1545212340.630 * [misc]taylor:  Taking taylor expansion of (* (pow w 2) (* (pow D 4) (pow h 2))) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of (pow w 2) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.630 * [misc]backup-simplify:  Simplify w into w
1545212340.630 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (pow h 2)) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of (pow D 4) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.630 * [misc]backup-simplify:  Simplify D into D
1545212340.630 * [misc]taylor:  Taking taylor expansion of (pow h 2) in h
1545212340.630 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.630 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.630 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.630 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.630 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.630 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.631 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.631 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.631 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.631 * [misc]backup-simplify:  Simplify (* (pow D 4) 1) into (pow D 4)
1545212340.631 * [misc]backup-simplify:  Simplify (* (pow w 2) (pow D 4)) into (* (pow D 4) (pow w 2))
1545212340.631 * [misc]backup-simplify:  Simplify (/ (pow d 4) (* (pow D 4) (pow w 2))) into (/ (pow d 4) (* (pow w 2) (pow D 4)))
1545212340.631 * [misc]backup-simplify:  Simplify (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) into (log (/ (pow d 4) (* (pow w 2) (pow D 4))))
1545212340.632 * [misc]backup-simplify:  Simplify (* 2 (log c0)) into (* 2 (log c0))
1545212340.632 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log h)) (log (/ (pow d 4) (* (pow w 2) (pow D 4))))) into (- (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log h)))
1545212340.632 * [misc]backup-simplify:  Simplify (+ (* 2 (log c0)) (- (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log h)))) into (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h)))
1545212340.633 * [misc]backup-simplify:  Simplify (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h)))) into (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))
1545212340.633 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))) into (exp (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h)))))
1545212340.633 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))) in w
1545212340.633 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h)))) in w
1545212340.633 * [misc]taylor:  Taking taylor expansion of 1/4 in w
1545212340.633 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.633 * [misc]taylor:  Taking taylor expansion of (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))) in w
1545212340.633 * [misc]taylor:  Taking taylor expansion of (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) in w
1545212340.633 * [misc]taylor:  Taking taylor expansion of (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) in w
1545212340.633 * [misc]taylor:  Taking taylor expansion of (/ (pow d 4) (* (pow w 2) (pow D 4))) in w
1545212340.633 * [misc]taylor:  Taking taylor expansion of (pow d 4) in w
1545212340.633 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.633 * [misc]backup-simplify:  Simplify d into d
1545212340.633 * [misc]taylor:  Taking taylor expansion of (* (pow w 2) (pow D 4)) in w
1545212340.634 * [misc]taylor:  Taking taylor expansion of (pow w 2) in w
1545212340.634 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.634 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.634 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.634 * [misc]taylor:  Taking taylor expansion of (pow D 4) in w
1545212340.634 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.634 * [misc]backup-simplify:  Simplify D into D
1545212340.634 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.634 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.634 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.634 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.634 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.634 * [misc]backup-simplify:  Simplify (* 1 (pow D 4)) into (pow D 4)
1545212340.634 * [misc]backup-simplify:  Simplify (/ (pow d 4) (pow D 4)) into (/ (pow d 4) (pow D 4))
1545212340.635 * [misc]backup-simplify:  Simplify (log (/ (pow d 4) (pow D 4))) into (log (/ (pow d 4) (pow D 4)))
1545212340.635 * [misc]taylor:  Taking taylor expansion of (* 2 (log c0)) in w
1545212340.635 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212340.635 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.635 * [misc]taylor:  Taking taylor expansion of (log c0) in w
1545212340.635 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.635 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.635 * [misc]backup-simplify:  Simplify (log c0) into (log c0)
1545212340.635 * [misc]taylor:  Taking taylor expansion of (* 2 (log h)) in w
1545212340.635 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212340.635 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.635 * [misc]taylor:  Taking taylor expansion of (log h) in w
1545212340.635 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.635 * [misc]backup-simplify:  Simplify h into h
1545212340.635 * [misc]backup-simplify:  Simplify (log h) into (log h)
1545212340.635 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log w)) (log (/ (pow d 4) (pow D 4)))) into (- (log (/ (pow d 4) (pow D 4))) (* 2 (log w)))
1545212340.636 * [misc]backup-simplify:  Simplify (* 2 (log c0)) into (* 2 (log c0))
1545212340.636 * [misc]backup-simplify:  Simplify (+ (- (log (/ (pow d 4) (pow D 4))) (* 2 (log w))) (* 2 (log c0))) into (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (* 2 (log w)))
1545212340.636 * [misc]backup-simplify:  Simplify (* 2 (log h)) into (* 2 (log h))
1545212340.636 * [misc]backup-simplify:  Simplify (- (* 2 (log h))) into (- (* 2 (log h)))
1545212340.636 * [misc]backup-simplify:  Simplify (+ (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (* 2 (log w))) (- (* 2 (log h)))) into (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w))))
1545212340.637 * [misc]backup-simplify:  Simplify (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w))))) into (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))
1545212340.637 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w))))))
1545212340.637 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))) in d
1545212340.637 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w))))) in d
1545212340.637 * [misc]taylor:  Taking taylor expansion of 1/4 in d
1545212340.637 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.637 * [misc]taylor:  Taking taylor expansion of (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))) in d
1545212340.637 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) in d
1545212340.637 * [misc]taylor:  Taking taylor expansion of (* 2 (log c0)) in d
1545212340.637 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212340.638 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.638 * [misc]taylor:  Taking taylor expansion of (log c0) in d
1545212340.638 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.638 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.638 * [misc]backup-simplify:  Simplify (log c0) into (log c0)
1545212340.638 * [misc]taylor:  Taking taylor expansion of (log (/ (pow d 4) (pow D 4))) in d
1545212340.638 * [misc]taylor:  Taking taylor expansion of (/ (pow d 4) (pow D 4)) in d
1545212340.638 * [misc]taylor:  Taking taylor expansion of (pow d 4) in d
1545212340.638 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.638 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.638 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.638 * [misc]taylor:  Taking taylor expansion of (pow D 4) in d
1545212340.638 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.638 * [misc]backup-simplify:  Simplify D into D
1545212340.638 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.638 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.638 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.639 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.639 * [misc]backup-simplify:  Simplify (/ 1 (pow D 4)) into (/ 1 (pow D 4))
1545212340.639 * [misc]backup-simplify:  Simplify (log (/ 1 (pow D 4))) into (log (/ 1 (pow D 4)))
1545212340.639 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log h)) (* 2 (log w))) in d
1545212340.639 * [misc]taylor:  Taking taylor expansion of (* 2 (log h)) in d
1545212340.639 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212340.639 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.639 * [misc]taylor:  Taking taylor expansion of (log h) in d
1545212340.639 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.639 * [misc]backup-simplify:  Simplify h into h
1545212340.639 * [misc]backup-simplify:  Simplify (log h) into (log h)
1545212340.639 * [misc]taylor:  Taking taylor expansion of (* 2 (log w)) in d
1545212340.639 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212340.639 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.639 * [misc]taylor:  Taking taylor expansion of (log w) in d
1545212340.639 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.639 * [misc]backup-simplify:  Simplify w into w
1545212340.639 * [misc]backup-simplify:  Simplify (log w) into (log w)
1545212340.639 * [misc]backup-simplify:  Simplify (* 2 (log c0)) into (* 2 (log c0))
1545212340.640 * [misc]backup-simplify:  Simplify (+ (* (- -4) (log d)) (log (/ 1 (pow D 4)))) into (+ (* 4 (log d)) (log (/ 1 (pow D 4))))
1545212340.640 * [misc]backup-simplify:  Simplify (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) into (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4)))))
1545212340.640 * [misc]backup-simplify:  Simplify (* 2 (log h)) into (* 2 (log h))
1545212340.640 * [misc]backup-simplify:  Simplify (* 2 (log w)) into (* 2 (log w))
1545212340.640 * [misc]backup-simplify:  Simplify (+ (* 2 (log h)) (* 2 (log w))) into (+ (* 2 (log h)) (* 2 (log w)))
1545212340.640 * [misc]backup-simplify:  Simplify (- (+ (* 2 (log h)) (* 2 (log w)))) into (- (+ (* 2 (log h)) (* 2 (log w))))
1545212340.641 * [misc]backup-simplify:  Simplify (+ (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (- (+ (* 2 (log h)) (* 2 (log w))))) into (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h))))
1545212340.641 * [misc]backup-simplify:  Simplify (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h))))) into (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))
1545212340.642 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h))))))
1545212340.642 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))) in D
1545212340.642 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h))))) in D
1545212340.642 * [misc]taylor:  Taking taylor expansion of 1/4 in D
1545212340.642 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.642 * [misc]taylor:  Taking taylor expansion of (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))) in D
1545212340.642 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) in D
1545212340.642 * [misc]taylor:  Taking taylor expansion of (* 2 (log c0)) in D
1545212340.642 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212340.642 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.642 * [misc]taylor:  Taking taylor expansion of (log c0) in D
1545212340.642 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.642 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.642 * [misc]backup-simplify:  Simplify (log c0) into (log c0)
1545212340.642 * [misc]taylor:  Taking taylor expansion of (+ (* 4 (log d)) (log (/ 1 (pow D 4)))) in D
1545212340.642 * [misc]taylor:  Taking taylor expansion of (* 4 (log d)) in D
1545212340.642 * [misc]taylor:  Taking taylor expansion of 4 in D
1545212340.642 * [misc]backup-simplify:  Simplify 4 into 4
1545212340.642 * [misc]taylor:  Taking taylor expansion of (log d) in D
1545212340.642 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.642 * [misc]backup-simplify:  Simplify d into d
1545212340.642 * [misc]backup-simplify:  Simplify (log d) into (log d)
1545212340.643 * [misc]taylor:  Taking taylor expansion of (log (/ 1 (pow D 4))) in D
1545212340.643 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 4)) in D
1545212340.643 * [misc]taylor:  Taking taylor expansion of (pow D 4) in D
1545212340.643 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.643 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.643 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.643 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.643 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.643 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.643 * [misc]backup-simplify:  Simplify (log 1) into 0
1545212340.643 * [misc]taylor:  Taking taylor expansion of (+ (* 2 (log w)) (* 2 (log h))) in D
1545212340.644 * [misc]taylor:  Taking taylor expansion of (* 2 (log w)) in D
1545212340.644 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212340.644 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.644 * [misc]taylor:  Taking taylor expansion of (log w) in D
1545212340.644 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.644 * [misc]backup-simplify:  Simplify w into w
1545212340.644 * [misc]backup-simplify:  Simplify (log w) into (log w)
1545212340.644 * [misc]taylor:  Taking taylor expansion of (* 2 (log h)) in D
1545212340.644 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212340.644 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.644 * [misc]taylor:  Taking taylor expansion of (log h) in D
1545212340.644 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.644 * [misc]backup-simplify:  Simplify h into h
1545212340.644 * [misc]backup-simplify:  Simplify (log h) into (log h)
1545212340.644 * [misc]backup-simplify:  Simplify (* 2 (log c0)) into (* 2 (log c0))
1545212340.644 * [misc]backup-simplify:  Simplify (* 4 (log d)) into (* 4 (log d))
1545212340.644 * [misc]backup-simplify:  Simplify (+ (* (- 4) (log D)) 0) into (- (* 4 (log D)))
1545212340.644 * [misc]backup-simplify:  Simplify (+ (* 4 (log d)) (- (* 4 (log D)))) into (- (* 4 (log d)) (* 4 (log D)))
1545212340.645 * [misc]backup-simplify:  Simplify (+ (* 2 (log c0)) (- (* 4 (log d)) (* 4 (log D)))) into (- (+ (* 2 (log c0)) (* 4 (log d))) (* 4 (log D)))
1545212340.645 * [misc]backup-simplify:  Simplify (* 2 (log w)) into (* 2 (log w))
1545212340.645 * [misc]backup-simplify:  Simplify (* 2 (log h)) into (* 2 (log h))
1545212340.645 * [misc]backup-simplify:  Simplify (+ (* 2 (log w)) (* 2 (log h))) into (+ (* 2 (log h)) (* 2 (log w)))
1545212340.645 * [misc]backup-simplify:  Simplify (- (+ (* 2 (log h)) (* 2 (log w)))) into (- (+ (* 2 (log h)) (* 2 (log w))))
1545212340.646 * [misc]backup-simplify:  Simplify (+ (- (+ (* 2 (log c0)) (* 4 (log d))) (* 4 (log D))) (- (+ (* 2 (log h)) (* 2 (log w))))) into (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))
1545212340.646 * [misc]backup-simplify:  Simplify (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))) into (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))
1545212340.646 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))))
1545212340.647 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))))
1545212340.647 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.648 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212340.648 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.648 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212340.648 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212340.648 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.649 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212340.649 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212340.649 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.649 * [misc]backup-simplify:  Simplify (+ (* c0 0) (* 0 (pow d 2))) into 0
1545212340.649 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.649 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 h)) into 0
1545212340.649 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 (* (pow D 2) h))) into 0
1545212340.650 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.650 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.651 * [misc]backup-simplify:  Simplify (+ (* (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) -1) (* 1 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) into (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212340.652 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 (- (/ (* c0 (pow d 2)) (* w (* (pow D 2) h))) (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) 1)) (pow (/ (* (pow c0 2) (pow d 4)) (* (pow D 4) (* (pow w 2) (pow h 2)))) 1)))) 1) into 0
1545212340.653 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) into 0
1545212340.655 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (log (/ (* (pow c0 2) (pow d 4)) (* (pow w 2) (* (pow D 4) (pow h 2))))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.655 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212340.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.655 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.655 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.655 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.655 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.655 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.655 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.655 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.656 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.656 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow d 4))) into 0
1545212340.656 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.656 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.656 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.656 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (pow h 2))) into 0
1545212340.656 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.657 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (* (pow D 4) (pow h 2)))) into 0
1545212340.657 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 4) (* (pow h 2) (pow w 2)))) (+ (* (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))) (/ 0 (* (pow D 4) (* (pow h 2) (pow w 2))))))) into 0
1545212340.659 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))) 1)))) 1) into 0
1545212340.659 * [misc]backup-simplify:  Simplify (+ (* (- -2) (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))) into (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2))))))
1545212340.660 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))) into 0
1545212340.661 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (+ (* 2 (log c0)) (log (/ (pow d 4) (* (pow w 2) (* (pow D 4) (pow h 2)))))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.661 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.661 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.661 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.661 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.661 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.661 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.661 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.661 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.661 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.662 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow c0 1)))) 1) into 0
1545212340.662 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log c0))) into 0
1545212340.663 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.663 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.663 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.663 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.663 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.663 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 1)) into 0
1545212340.663 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.664 * [misc]backup-simplify:  Simplify (+ (* (pow w 2) 0) (* 0 (pow D 4))) into 0
1545212340.664 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 4) (pow w 2))) (+ (* (/ (pow d 4) (* (pow w 2) (pow D 4))) (/ 0 (* (pow D 4) (pow w 2)))))) into 0
1545212340.665 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ (pow d 4) (* (pow w 2) (pow D 4))) 1)))) 1) into 0
1545212340.665 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.666 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))) into 0
1545212340.667 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (+ (log (/ (pow d 4) (* (pow w 2) (pow D 4)))) (* 2 (log c0))) (* 2 (log h))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.667 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.667 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.667 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.667 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.667 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.667 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.667 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.668 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.668 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.668 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.668 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.668 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.668 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow D 4))) into 0
1545212340.669 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 4)) (+ (* (/ (pow d 4) (pow D 4)) (/ 0 (pow D 4))))) into 0
1545212340.670 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ (pow d 4) (pow D 4)) 1)))) 1) into 0
1545212340.671 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow c0 1)))) 1) into 0
1545212340.671 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log c0))) into 0
1545212340.671 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.672 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow h 1)))) 1) into 0
1545212340.672 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log h))) into 0
1545212340.672 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.672 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.673 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))) into 0
1545212340.674 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (+ (* 2 (log c0)) (log (/ (pow d 4) (pow D 4)))) (+ (* 2 (log h)) (* 2 (log w)))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.675 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.675 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.675 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.675 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.675 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.676 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow c0 1)))) 1) into 0
1545212340.676 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log c0))) into 0
1545212340.676 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.676 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.676 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.677 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.677 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 4)) (+ (* (/ 1 (pow D 4)) (/ 0 (pow D 4))))) into 0
1545212340.678 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow D 4)) 1)))) 1) into 0
1545212340.678 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.679 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow h 1)))) 1) into 0
1545212340.679 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log h))) into 0
1545212340.680 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow w 1)))) 1) into 0
1545212340.680 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log w))) into 0
1545212340.680 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.680 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.680 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.681 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))) into 0
1545212340.683 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (+ (* 2 (log c0)) (+ (* 4 (log d)) (log (/ 1 (pow D 4))))) (+ (* 2 (log w)) (* 2 (log h)))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.683 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.683 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.683 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.684 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow c0 1)))) 1) into 0
1545212340.684 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log c0))) into 0
1545212340.685 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow d 1)))) 1) into 0
1545212340.685 * [misc]backup-simplify:  Simplify (+ (* 4 0) (* 0 (log d))) into 0
1545212340.685 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.686 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.686 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.688 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
1545212340.688 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.689 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.689 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow w 1)))) 1) into 0
1545212340.690 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log w))) into 0
1545212340.690 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow h 1)))) 1) into 0
1545212340.691 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log h))) into 0
1545212340.691 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.691 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.691 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.692 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) into 0
1545212340.693 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.693 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.694 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) into (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))))
1545212340.695 * [misc]backup-simplify:  Simplify (sqrt (sqrt (* (+ (/ 1 M) (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D))))) (- (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) (/ 1 M))))) into (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4)
1545212340.695 * [misc]approximate:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in (M c0 h w d D) around 0
1545212340.695 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in D
1545212340.695 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in D
1545212340.695 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in D
1545212340.695 * [misc]taylor:  Taking taylor expansion of 1/4 in D
1545212340.695 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.695 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in D
1545212340.695 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in D
1545212340.695 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212340.696 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212340.696 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.696 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.696 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.696 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.696 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.696 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.696 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.696 * [misc]backup-simplify:  Simplify h into h
1545212340.696 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.696 * [misc]backup-simplify:  Simplify w into w
1545212340.696 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.696 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.696 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.696 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.696 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.696 * [misc]backup-simplify:  Simplify d into d
1545212340.696 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.696 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.696 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.696 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.697 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.697 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.697 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.697 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.697 * [misc]backup-simplify:  Simplify M into M
1545212340.697 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.697 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in D
1545212340.697 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in D
1545212340.697 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.697 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.697 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.697 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.697 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.697 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.697 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.697 * [misc]backup-simplify:  Simplify h into h
1545212340.697 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.697 * [misc]backup-simplify:  Simplify w into w
1545212340.697 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.697 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.697 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.697 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.697 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.697 * [misc]backup-simplify:  Simplify d into d
1545212340.698 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.698 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.698 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.698 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.698 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.698 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.698 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.698 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.698 * [misc]backup-simplify:  Simplify M into M
1545212340.698 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.698 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.698 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.698 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.699 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212340.699 * [misc]backup-simplify:  Simplify (log (/ -1 (pow M 2))) into (log (/ -1 (pow M 2)))
1545212340.699 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ -1 (pow M 2)))) into (* 1/4 (log (/ -1 (pow M 2))))
1545212340.699 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ -1 (pow M 2))))) into (pow (/ -1 (pow M 2)) 1/4)
1545212340.699 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of 1/4 in d
1545212340.699 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.699 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.699 * [misc]backup-simplify:  Simplify D into D
1545212340.699 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.699 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.700 * [misc]backup-simplify:  Simplify h into h
1545212340.700 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.700 * [misc]backup-simplify:  Simplify w into w
1545212340.700 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.700 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.700 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.700 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.700 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.700 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.700 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.700 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.700 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.700 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.700 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.700 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.700 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.700 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.700 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.700 * [misc]backup-simplify:  Simplify M into M
1545212340.701 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.701 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in d
1545212340.701 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in d
1545212340.701 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.701 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.701 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.701 * [misc]backup-simplify:  Simplify D into D
1545212340.701 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.701 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.701 * [misc]backup-simplify:  Simplify h into h
1545212340.701 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.701 * [misc]backup-simplify:  Simplify w into w
1545212340.701 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.701 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.701 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.701 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.701 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.701 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.701 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.701 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.701 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.701 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.702 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.702 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.702 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.702 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.702 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.702 * [misc]backup-simplify:  Simplify M into M
1545212340.702 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.702 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.702 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) c0) 0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.703 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) c0) (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212340.703 * [misc]backup-simplify:  Simplify (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))
1545212340.704 * [misc]backup-simplify:  Simplify (+ (* (- 4) (log d)) (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))) into (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d)))
1545212340.704 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d)))) into (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d))))
1545212340.704 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d))))) into (exp (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) (* 4 (log d)))))
1545212340.704 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in w
1545212340.704 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in w
1545212340.704 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in w
1545212340.704 * [misc]taylor:  Taking taylor expansion of 1/4 in w
1545212340.704 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.704 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in w
1545212340.704 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in w
1545212340.705 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212340.705 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212340.705 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.705 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.705 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.705 * [misc]backup-simplify:  Simplify D into D
1545212340.705 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.705 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.705 * [misc]backup-simplify:  Simplify h into h
1545212340.705 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.705 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.705 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.705 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.705 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.705 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.705 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.705 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.705 * [misc]backup-simplify:  Simplify d into d
1545212340.705 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.705 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.705 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.705 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.705 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.706 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.706 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.706 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.706 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.706 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.706 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.706 * [misc]backup-simplify:  Simplify M into M
1545212340.706 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.706 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in w
1545212340.706 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in w
1545212340.706 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.706 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.706 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.706 * [misc]backup-simplify:  Simplify D into D
1545212340.706 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.706 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.706 * [misc]backup-simplify:  Simplify h into h
1545212340.706 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.706 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.706 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.706 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.707 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.707 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.707 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.707 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.707 * [misc]backup-simplify:  Simplify d into d
1545212340.707 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.707 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.707 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.707 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.707 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.707 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.707 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.707 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.708 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.708 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.708 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.708 * [misc]backup-simplify:  Simplify M into M
1545212340.708 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.708 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.708 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.708 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.708 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212340.708 * [misc]backup-simplify:  Simplify (log (/ -1 (pow M 2))) into (log (/ -1 (pow M 2)))
1545212340.708 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ -1 (pow M 2)))) into (* 1/4 (log (/ -1 (pow M 2))))
1545212340.708 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ -1 (pow M 2))))) into (pow (/ -1 (pow M 2)) 1/4)
1545212340.708 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of 1/4 in h
1545212340.709 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.709 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.709 * [misc]backup-simplify:  Simplify D into D
1545212340.709 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.709 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.709 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.709 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.709 * [misc]backup-simplify:  Simplify w into w
1545212340.709 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.709 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.709 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.709 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.709 * [misc]backup-simplify:  Simplify d into d
1545212340.709 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.709 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.709 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.710 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.710 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.710 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.710 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.710 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.710 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.710 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.710 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.710 * [misc]backup-simplify:  Simplify M into M
1545212340.710 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.710 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in h
1545212340.710 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in h
1545212340.710 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.710 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.711 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.711 * [misc]backup-simplify:  Simplify D into D
1545212340.711 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.711 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.711 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.711 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.711 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.711 * [misc]backup-simplify:  Simplify w into w
1545212340.711 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.711 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.711 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.711 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.711 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.711 * [misc]backup-simplify:  Simplify d into d
1545212340.711 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.711 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.711 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.711 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.711 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.712 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.712 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.712 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.712 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.712 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.712 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.712 * [misc]backup-simplify:  Simplify M into M
1545212340.712 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.712 * [misc]backup-simplify:  Simplify (- (/ 1 M)) into (- (/ 1 M))
1545212340.712 * [misc]backup-simplify:  Simplify (+ 0 (- (/ 1 M))) into (- (/ 1 M))
1545212340.712 * [misc]backup-simplify:  Simplify (+ 0 (/ 1 M)) into (/ 1 M)
1545212340.712 * [misc]backup-simplify:  Simplify (* (- (/ 1 M)) (/ 1 M)) into (/ -1 (pow M 2))
1545212340.712 * [misc]backup-simplify:  Simplify (log (/ -1 (pow M 2))) into (log (/ -1 (pow M 2)))
1545212340.713 * [misc]backup-simplify:  Simplify (* 1/4 (log (/ -1 (pow M 2)))) into (* 1/4 (log (/ -1 (pow M 2))))
1545212340.713 * [misc]backup-simplify:  Simplify (exp (* 1/4 (log (/ -1 (pow M 2))))) into (pow (/ -1 (pow M 2)) 1/4)
1545212340.713 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of 1/4 in c0
1545212340.713 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.713 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.713 * [misc]backup-simplify:  Simplify D into D
1545212340.713 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.713 * [misc]backup-simplify:  Simplify h into h
1545212340.713 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.713 * [misc]backup-simplify:  Simplify w into w
1545212340.713 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.713 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.713 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.713 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.713 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.713 * [misc]backup-simplify:  Simplify d into d
1545212340.713 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.713 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.714 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.714 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.714 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.714 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.714 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.714 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.714 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.714 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.714 * [misc]backup-simplify:  Simplify M into M
1545212340.714 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.715 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in c0
1545212340.715 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in c0
1545212340.715 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.715 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.715 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.715 * [misc]backup-simplify:  Simplify D into D
1545212340.715 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.715 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.715 * [misc]backup-simplify:  Simplify h into h
1545212340.715 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.715 * [misc]backup-simplify:  Simplify w into w
1545212340.715 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.715 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.715 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.715 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.715 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.715 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.715 * [misc]backup-simplify:  Simplify d into d
1545212340.715 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.715 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.715 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.715 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.715 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.715 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.716 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.716 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.716 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.716 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.716 * [misc]backup-simplify:  Simplify M into M
1545212340.716 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.716 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.716 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (pow d 2)) 0) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.717 * [misc]backup-simplify:  Simplify (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212340.717 * [misc]backup-simplify:  Simplify (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212340.717 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log c0)) (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0)))
1545212340.718 * [misc]backup-simplify:  Simplify (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0)))) into (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0))))
1545212340.718 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0))))) into (exp (* 1/4 (- (log (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) (* 2 (log c0)))))
1545212340.718 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in M
1545212340.718 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in M
1545212340.718 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212340.718 * [misc]taylor:  Taking taylor expansion of 1/4 in M
1545212340.718 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.718 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212340.718 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212340.718 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.718 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.719 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.719 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.719 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.719 * [misc]backup-simplify:  Simplify D into D
1545212340.719 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.719 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.719 * [misc]backup-simplify:  Simplify h into h
1545212340.719 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.719 * [misc]backup-simplify:  Simplify w into w
1545212340.719 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.719 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.719 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.719 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.719 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.719 * [misc]backup-simplify:  Simplify d into d
1545212340.719 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.719 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.719 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.719 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.719 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.719 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.719 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.719 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.719 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.719 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.720 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.720 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.720 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.720 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.720 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.720 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.720 * [misc]backup-simplify:  Simplify D into D
1545212340.720 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.720 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.720 * [misc]backup-simplify:  Simplify h into h
1545212340.720 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.720 * [misc]backup-simplify:  Simplify w into w
1545212340.720 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.720 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.720 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.720 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.720 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.720 * [misc]backup-simplify:  Simplify d into d
1545212340.720 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.720 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.720 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.720 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.720 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.720 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.720 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.720 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.720 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.720 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.720 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.721 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212340.721 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212340.721 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212340.721 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.721 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.721 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log M)) (log -1)) into (- (log -1) (* 2 (log M)))
1545212340.721 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.722 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.722 * [misc]taylor:  Taking taylor expansion of (pow (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) 1/4) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))))) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of (* 1/4 (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))))) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of 1/4 in M
1545212340.722 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.722 * [misc]taylor:  Taking taylor expansion of (log (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)))) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of (* (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M))) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.722 * [misc]backup-simplify:  Simplify D into D
1545212340.722 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.722 * [misc]backup-simplify:  Simplify h into h
1545212340.722 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.722 * [misc]backup-simplify:  Simplify w into w
1545212340.722 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.722 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.722 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.722 * [misc]backup-simplify:  Simplify d into d
1545212340.722 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.722 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.722 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.722 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.722 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.722 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.722 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.722 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.722 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.722 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.723 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.723 * [misc]taylor:  Taking taylor expansion of (+ (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) (/ 1 M)) in M
1545212340.723 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) in M
1545212340.723 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.723 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.723 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.723 * [misc]backup-simplify:  Simplify D into D
1545212340.723 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.723 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.723 * [misc]backup-simplify:  Simplify h into h
1545212340.723 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.723 * [misc]backup-simplify:  Simplify w into w
1545212340.723 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in M
1545212340.723 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.723 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.723 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.723 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.723 * [misc]backup-simplify:  Simplify d into d
1545212340.723 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.723 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.723 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.723 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.723 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.723 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.723 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.723 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.723 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.723 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.723 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.724 * [misc]backup-simplify:  Simplify (- 1) into -1
1545212340.724 * [misc]backup-simplify:  Simplify (+ 0 -1) into -1
1545212340.724 * [misc]backup-simplify:  Simplify (+ 0 1) into 1
1545212340.724 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.724 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.724 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log M)) (log -1)) into (- (log -1) (* 2 (log M)))
1545212340.724 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.724 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.725 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in c0
1545212340.725 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in c0
1545212340.725 * [misc]taylor:  Taking taylor expansion of 1/4 in c0
1545212340.725 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.725 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in c0
1545212340.725 * [misc]taylor:  Taking taylor expansion of (log -1) in c0
1545212340.725 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.725 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.725 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.725 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in c0
1545212340.725 * [misc]taylor:  Taking taylor expansion of 2 in c0
1545212340.725 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.725 * [misc]taylor:  Taking taylor expansion of (log M) in c0
1545212340.725 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.725 * [misc]backup-simplify:  Simplify M into M
1545212340.725 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.725 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.725 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.725 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.725 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.726 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.726 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in h
1545212340.726 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in h
1545212340.726 * [misc]taylor:  Taking taylor expansion of 1/4 in h
1545212340.726 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.726 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in h
1545212340.726 * [misc]taylor:  Taking taylor expansion of (log -1) in h
1545212340.726 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.726 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.726 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.726 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in h
1545212340.726 * [misc]taylor:  Taking taylor expansion of 2 in h
1545212340.726 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.726 * [misc]taylor:  Taking taylor expansion of (log M) in h
1545212340.726 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.726 * [misc]backup-simplify:  Simplify M into M
1545212340.726 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.726 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.726 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.726 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.726 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.727 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.727 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in w
1545212340.727 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in w
1545212340.727 * [misc]taylor:  Taking taylor expansion of 1/4 in w
1545212340.727 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.727 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in w
1545212340.727 * [misc]taylor:  Taking taylor expansion of (log -1) in w
1545212340.727 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.727 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.727 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.727 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in w
1545212340.727 * [misc]taylor:  Taking taylor expansion of 2 in w
1545212340.727 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.727 * [misc]taylor:  Taking taylor expansion of (log M) in w
1545212340.727 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.727 * [misc]backup-simplify:  Simplify M into M
1545212340.727 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.727 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.727 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.727 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.727 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.728 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.728 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in d
1545212340.728 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in d
1545212340.728 * [misc]taylor:  Taking taylor expansion of 1/4 in d
1545212340.728 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.728 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in d
1545212340.728 * [misc]taylor:  Taking taylor expansion of (log -1) in d
1545212340.728 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.728 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.728 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.728 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in d
1545212340.728 * [misc]taylor:  Taking taylor expansion of 2 in d
1545212340.728 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.728 * [misc]taylor:  Taking taylor expansion of (log M) in d
1545212340.728 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.728 * [misc]backup-simplify:  Simplify M into M
1545212340.728 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.728 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.728 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.728 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.728 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.729 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.729 * [misc]taylor:  Taking taylor expansion of (exp (* 1/4 (- (log -1) (* 2 (log M))))) in D
1545212340.729 * [misc]taylor:  Taking taylor expansion of (* 1/4 (- (log -1) (* 2 (log M)))) in D
1545212340.729 * [misc]taylor:  Taking taylor expansion of 1/4 in D
1545212340.729 * [misc]backup-simplify:  Simplify 1/4 into 1/4
1545212340.729 * [misc]taylor:  Taking taylor expansion of (- (log -1) (* 2 (log M))) in D
1545212340.729 * [misc]taylor:  Taking taylor expansion of (log -1) in D
1545212340.729 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.729 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.729 * [misc]backup-simplify:  Simplify (log -1) into (log -1)
1545212340.729 * [misc]taylor:  Taking taylor expansion of (* 2 (log M)) in D
1545212340.729 * [misc]taylor:  Taking taylor expansion of 2 in D
1545212340.729 * [misc]backup-simplify:  Simplify 2 into 2
1545212340.729 * [misc]taylor:  Taking taylor expansion of (log M) in D
1545212340.729 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.729 * [misc]backup-simplify:  Simplify M into M
1545212340.729 * [misc]backup-simplify:  Simplify (log M) into (log M)
1545212340.729 * [misc]backup-simplify:  Simplify (* 2 (log M)) into (* 2 (log M))
1545212340.729 * [misc]backup-simplify:  Simplify (- (* 2 (log M))) into (- (* 2 (log M)))
1545212340.729 * [misc]backup-simplify:  Simplify (+ (log -1) (- (* 2 (log M)))) into (- (log -1) (* 2 (log M)))
1545212340.729 * [misc]backup-simplify:  Simplify (* 1/4 (- (log -1) (* 2 (log M)))) into (* 1/4 (- (log -1) (* 2 (log M))))
1545212340.730 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.730 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log M))))) into (exp (* 1/4 (- (log -1) (* 2 (log M)))))
1545212340.730 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.730 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.730 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.731 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.731 * [misc]backup-simplify:  Simplify (+ (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) 0) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.731 * [misc]backup-simplify:  Simplify (+ (* -1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) 1)) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.732 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) 1)) (pow -1 1)))) 1) into 0
1545212340.732 * [misc]backup-simplify:  Simplify (+ (* (- 2) (log M)) (log -1)) into (- (log -1) (* 2 (log M)))
1545212340.732 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.733 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.733 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212340.733 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.733 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.733 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.733 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.733 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.733 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.733 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.733 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.733 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.733 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.735 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.735 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.736 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.736 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.736 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.736 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.737 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.737 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.737 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.737 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.737 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.737 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.737 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.737 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.737 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.737 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.738 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.739 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.739 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.739 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.739 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.739 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.740 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.740 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.740 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.740 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.740 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.740 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.740 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.740 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.742 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.742 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.742 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.743 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.743 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.743 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.744 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.744 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.744 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.744 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.744 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.744 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.746 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.746 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.746 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.746 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.746 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.747 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.747 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.748 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.748 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.749 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow -1 1)))) 1) into 0
1545212340.750 * [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow M 1)))) 1) into 0
1545212340.750 * [misc]backup-simplify:  Simplify (+ (* 2 0) (* 0 (log M))) into 0
1545212340.750 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.750 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.750 * [misc]backup-simplify:  Simplify (+ (* 1/4 0) (* 0 (- (log -1) (* 2 (log M))))) into 0
1545212340.751 * [misc]backup-simplify:  Simplify (* (exp (* 1/4 (- (log -1) (* 2 (log M))))) (+ (* (/ (pow 0 1) 1)))) into 0
1545212340.751 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.751 * [misc]backup-simplify:  Simplify (exp (* 1/4 (- (log -1) (* 2 (log (/ 1 M)))))) into (exp (* 1/4 (- (log -1) (* 2 (log (/ 1 M))))))
1545212340.753 * [misc]backup-simplify:  Simplify (sqrt (sqrt (* (+ (/ 1 (- M)) (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D)))))) (- (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) (/ 1 (- M)))))) into (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))))
1545212340.753 * [misc]approximate:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in (M c0 h w d D) around 0
1545212340.753 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in D
1545212340.753 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in D
1545212340.753 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in D
1545212340.753 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.753 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.753 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in D
1545212340.753 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212340.753 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.753 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.753 * [misc]backup-simplify:  Simplify M into M
1545212340.753 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.753 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212340.753 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.754 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.754 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.754 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.754 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.754 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.754 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.754 * [misc]backup-simplify:  Simplify h into h
1545212340.754 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.754 * [misc]backup-simplify:  Simplify w into w
1545212340.754 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212340.754 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.754 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.754 * [misc]backup-simplify:  Simplify d into d
1545212340.754 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.754 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.754 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.754 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.754 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.754 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.754 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.754 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.755 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212340.755 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in D
1545212340.755 * [misc]taylor:  Taking taylor expansion of M in D
1545212340.755 * [misc]backup-simplify:  Simplify M into M
1545212340.755 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.755 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212340.755 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.755 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.755 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.755 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.755 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.755 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.755 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.755 * [misc]backup-simplify:  Simplify h into h
1545212340.755 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.755 * [misc]backup-simplify:  Simplify w into w
1545212340.755 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212340.755 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.755 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.755 * [misc]backup-simplify:  Simplify d into d
1545212340.755 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.755 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.755 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.755 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.755 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.756 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.756 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.756 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.756 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.756 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.756 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212340.756 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212340.756 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.756 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.757 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.757 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.757 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.757 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) 0) (* 0 (/ 1 M))) into 0
1545212340.758 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212340.759 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.759 * [misc]backup-simplify:  Simplify (sqrt (sqrt (/ -1 (pow M 2)))) into (sqrt (sqrt (/ -1 (pow M 2))))
1545212340.759 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (sqrt (/ -1 (pow M 2)))))) into 0
1545212340.759 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.759 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.759 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.759 * [misc]backup-simplify:  Simplify M into M
1545212340.759 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.759 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.759 * [misc]backup-simplify:  Simplify D into D
1545212340.759 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.759 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.759 * [misc]backup-simplify:  Simplify h into h
1545212340.759 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.760 * [misc]backup-simplify:  Simplify w into w
1545212340.760 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212340.760 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.760 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.760 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.760 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.760 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.760 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.760 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.760 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.760 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.760 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.760 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212340.760 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.760 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212340.760 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in d
1545212340.760 * [misc]taylor:  Taking taylor expansion of M in d
1545212340.761 * [misc]backup-simplify:  Simplify M into M
1545212340.761 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.761 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212340.761 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.761 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.761 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.761 * [misc]backup-simplify:  Simplify D into D
1545212340.761 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.761 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.761 * [misc]backup-simplify:  Simplify h into h
1545212340.761 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.761 * [misc]backup-simplify:  Simplify w into w
1545212340.761 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212340.761 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.761 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.761 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.761 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.761 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.761 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.761 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.761 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.761 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.761 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.761 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212340.762 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.762 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) c0)) into (- (/ (* (pow D 2) (* h w)) c0))
1545212340.762 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) c0))) into (- (/ (* (pow D 2) (* h w)) c0))
1545212340.762 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) c0)) into (/ (* (pow D 2) (* h w)) c0)
1545212340.763 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) c0)) (/ (* (pow D 2) (* h w)) c0)) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))
1545212340.763 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))
1545212340.764 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))) into (/ (* (pow D 2) (* h w)) c0)
1545212340.764 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.764 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.764 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.764 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.764 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212340.765 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212340.765 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.765 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.765 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.765 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.765 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.766 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 c0)) into 0
1545212340.766 * [misc]backup-simplify:  Simplify (- (/ 0 c0) (+ (* (/ (* (pow D 2) (* h w)) c0) (/ 0 c0)))) into 0
1545212340.766 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.766 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.767 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) c0)) 0) (* 0 (/ (* (pow D 2) (* h w)) c0))) into 0
1545212340.767 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212340.768 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow c0 2))))) into 0
1545212340.768 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 2) (* h w)) c0)) into (* (sqrt (/ (* h w) c0)) D)
1545212340.768 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 2) (* h w)) c0)))) into 0
1545212340.768 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in w
1545212340.768 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in w
1545212340.768 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in w
1545212340.768 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.768 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.768 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in w
1545212340.768 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212340.768 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.768 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.768 * [misc]backup-simplify:  Simplify M into M
1545212340.768 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.769 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212340.769 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.769 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.769 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.769 * [misc]backup-simplify:  Simplify D into D
1545212340.769 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.769 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.769 * [misc]backup-simplify:  Simplify h into h
1545212340.769 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.769 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.769 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.769 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212340.769 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.769 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.769 * [misc]backup-simplify:  Simplify d into d
1545212340.769 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.769 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.769 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.769 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.769 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.769 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.769 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.770 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.770 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.770 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.770 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.770 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212340.770 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in w
1545212340.770 * [misc]taylor:  Taking taylor expansion of M in w
1545212340.770 * [misc]backup-simplify:  Simplify M into M
1545212340.770 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.770 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212340.770 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.770 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.770 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.770 * [misc]backup-simplify:  Simplify D into D
1545212340.770 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.770 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.771 * [misc]backup-simplify:  Simplify h into h
1545212340.771 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.771 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.771 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.771 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212340.771 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.771 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.771 * [misc]backup-simplify:  Simplify d into d
1545212340.771 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.771 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.771 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.771 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.771 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.771 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.771 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.772 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.772 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.772 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.772 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.772 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.772 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.772 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212340.772 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212340.772 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.773 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.773 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.773 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.773 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212340.773 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) h) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) h) (* c0 (pow d 2))))
1545212340.774 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) h) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) h) (* c0 (pow d 2)))) (/ 1 M))) into 0
1545212340.775 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212340.775 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.775 * [misc]backup-simplify:  Simplify (sqrt (sqrt (/ -1 (pow M 2)))) into (sqrt (sqrt (/ -1 (pow M 2))))
1545212340.775 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (sqrt (/ -1 (pow M 2)))))) into 0
1545212340.775 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in h
1545212340.775 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in h
1545212340.775 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in h
1545212340.775 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.775 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.775 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in h
1545212340.775 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212340.775 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.775 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.775 * [misc]backup-simplify:  Simplify M into M
1545212340.775 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.776 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212340.776 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.776 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.776 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.776 * [misc]backup-simplify:  Simplify D into D
1545212340.776 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.776 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.776 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.776 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.776 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.776 * [misc]backup-simplify:  Simplify w into w
1545212340.776 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212340.776 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.776 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.776 * [misc]backup-simplify:  Simplify d into d
1545212340.776 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.776 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.776 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.776 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.776 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.776 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.777 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.777 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.777 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.777 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.777 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.777 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212340.777 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in h
1545212340.777 * [misc]taylor:  Taking taylor expansion of M in h
1545212340.777 * [misc]backup-simplify:  Simplify M into M
1545212340.777 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.777 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212340.777 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.777 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.778 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.778 * [misc]backup-simplify:  Simplify D into D
1545212340.778 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.778 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.778 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.778 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.778 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.778 * [misc]backup-simplify:  Simplify w into w
1545212340.778 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212340.778 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.778 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.778 * [misc]backup-simplify:  Simplify d into d
1545212340.778 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.778 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.778 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.778 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.778 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.778 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.779 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.779 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.779 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.779 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.779 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.779 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.779 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.779 * [misc]backup-simplify:  Simplify (* (/ 1 M) (/ 1 M)) into (/ 1 (pow M 2))
1545212340.779 * [misc]backup-simplify:  Simplify (* -1 (/ 1 (pow M 2))) into (/ -1 (pow M 2))
1545212340.780 * [misc]backup-simplify:  Simplify (sqrt (/ -1 (pow M 2))) into (sqrt (/ -1 (pow M 2)))
1545212340.780 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.780 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) w) (* (pow d 2) c0))) into (/ (* (pow D 2) w) (* c0 (pow d 2)))
1545212340.780 * [misc]backup-simplify:  Simplify (- (+ (* (/ 1 M) (/ 0 M)))) into 0
1545212340.780 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) w) (* (pow d 2) c0))) into (- (/ (* (pow D 2) w) (* c0 (pow d 2))))
1545212340.780 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) w) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) w) (* (pow d 2) c0)))
1545212340.781 * [misc]backup-simplify:  Simplify (+ (* (/ 1 M) (/ (* (pow D 2) w) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) w) (* (pow d 2) c0))) (/ 1 M))) into 0
1545212340.781 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ 1 (pow M 2)))) into 0
1545212340.781 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ -1 (pow M 2))))) into 0
1545212340.781 * [misc]backup-simplify:  Simplify (sqrt (sqrt (/ -1 (pow M 2)))) into (sqrt (sqrt (/ -1 (pow M 2))))
1545212340.781 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (sqrt (/ -1 (pow M 2)))))) into 0
1545212340.781 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in c0
1545212340.781 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in c0
1545212340.781 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in c0
1545212340.781 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.781 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.781 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in c0
1545212340.781 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212340.781 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.781 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.781 * [misc]backup-simplify:  Simplify M into M
1545212340.781 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.781 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.782 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.782 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.782 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.782 * [misc]backup-simplify:  Simplify D into D
1545212340.782 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.782 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.782 * [misc]backup-simplify:  Simplify h into h
1545212340.782 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.782 * [misc]backup-simplify:  Simplify w into w
1545212340.782 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.782 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.782 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.782 * [misc]backup-simplify:  Simplify d into d
1545212340.782 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.782 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.782 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.782 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.782 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.782 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.782 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.782 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.782 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.782 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.782 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.782 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212340.782 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in c0
1545212340.782 * [misc]taylor:  Taking taylor expansion of M in c0
1545212340.782 * [misc]backup-simplify:  Simplify M into M
1545212340.782 * [misc]backup-simplify:  Simplify (/ 1 M) into (/ 1 M)
1545212340.782 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.782 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.783 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.783 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.783 * [misc]backup-simplify:  Simplify D into D
1545212340.783 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.783 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.783 * [misc]backup-simplify:  Simplify h into h
1545212340.783 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.783 * [misc]backup-simplify:  Simplify w into w
1545212340.783 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.783 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.783 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.783 * [misc]backup-simplify:  Simplify d into d
1545212340.783 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.783 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.783 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.783 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.783 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.783 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.783 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.783 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.783 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.783 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.783 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.783 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (pow d 2))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.784 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (pow d 2)))) into (- (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.784 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (pow d 2))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.784 * [misc]backup-simplify:  Simplify (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212340.784 * [misc]backup-simplify:  Simplify (* -1 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212340.784 * [misc]backup-simplify:  Simplify (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.784 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.785 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.785 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.785 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.785 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.785 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.785 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.785 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.785 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.785 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.786 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.786 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.786 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.786 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.786 * [misc]backup-simplify:  Simplify (+ (/ 1 M) 0) into (/ 1 M)
1545212340.787 * [misc]backup-simplify:  Simplify (+ (* (- (/ (* (pow D 2) (* h w)) (pow d 2))) (/ 1 M)) (* (/ 1 M) (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212340.787 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (* -1 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212340.787 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into 0
1545212340.787 * [misc]backup-simplify:  Simplify (sqrt 0) into 0
1545212340.787 * [misc]backup-simplify:  Simplify (/ (/ (* (pow D 2) (* h w)) (pow d 2)) (* 2 (sqrt 0))) into (* +nan.0 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.788 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212340.788 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.788 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.788 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.788 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.788 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.788 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.788 * [misc]backup-simplify:  Simplify D into D
1545212340.788 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.788 * [misc]backup-simplify:  Simplify h into h
1545212340.788 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.788 * [misc]backup-simplify:  Simplify w into w
1545212340.788 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.788 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.788 * [misc]backup-simplify:  Simplify d into d
1545212340.788 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.788 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.788 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.788 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.788 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.788 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.788 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.788 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.788 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.789 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.789 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.789 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.789 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.789 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.789 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.789 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.789 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.789 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.789 * [misc]backup-simplify:  Simplify D into D
1545212340.789 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.789 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.789 * [misc]backup-simplify:  Simplify h into h
1545212340.789 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.789 * [misc]backup-simplify:  Simplify w into w
1545212340.789 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.789 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.789 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.789 * [misc]backup-simplify:  Simplify d into d
1545212340.789 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.789 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.789 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.789 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.789 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.789 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.789 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.789 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.789 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.790 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.790 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.790 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.790 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.790 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.790 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.790 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.790 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.791 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212340.791 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212340.791 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212340.791 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.792 * [misc]backup-simplify:  Simplify (sqrt 0) into 0
1545212340.792 * [misc]backup-simplify:  Simplify (/ (sqrt -1) (* 2 (sqrt 0))) into (* +nan.0 (sqrt -1))
1545212340.792 * [misc]taylor:  Taking taylor expansion of (sqrt (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))))) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of (sqrt (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))))) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of (* -1 (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))))) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of -1 in M
1545212340.792 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.792 * [misc]taylor:  Taking taylor expansion of (* (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of (- (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.792 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.792 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.792 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.792 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.792 * [misc]backup-simplify:  Simplify D into D
1545212340.792 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.792 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.792 * [misc]backup-simplify:  Simplify h into h
1545212340.793 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.793 * [misc]backup-simplify:  Simplify w into w
1545212340.793 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.793 * [misc]backup-simplify:  Simplify d into d
1545212340.793 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.793 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.793 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.793 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.793 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.793 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.793 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.793 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.793 * [misc]taylor:  Taking taylor expansion of (+ (/ 1 M) (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of (/ 1 M) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of M in M
1545212340.793 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.793 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.793 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.793 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of (pow D 2) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of D in M
1545212340.793 * [misc]backup-simplify:  Simplify D into D
1545212340.793 * [misc]taylor:  Taking taylor expansion of (* h w) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of h in M
1545212340.793 * [misc]backup-simplify:  Simplify h into h
1545212340.793 * [misc]taylor:  Taking taylor expansion of w in M
1545212340.793 * [misc]backup-simplify:  Simplify w into w
1545212340.793 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of (pow d 2) in M
1545212340.793 * [misc]taylor:  Taking taylor expansion of d in M
1545212340.793 * [misc]backup-simplify:  Simplify d into d
1545212340.793 * [misc]taylor:  Taking taylor expansion of c0 in M
1545212340.793 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.793 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.794 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.794 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.794 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.794 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.794 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.794 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.794 * [misc]backup-simplify:  Simplify (+ 1 0) into 1
1545212340.794 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.794 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.794 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.794 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.795 * [misc]backup-simplify:  Simplify (+ 0 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))
1545212340.795 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.795 * [misc]backup-simplify:  Simplify (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) into (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))
1545212340.795 * [misc]backup-simplify:  Simplify (+ 0 (- (/ (* (pow D 2) (* h w)) (* c0 (pow d 2))))) into (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212340.796 * [misc]backup-simplify:  Simplify (+ (* 1 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 1)) into 0
1545212340.796 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212340.796 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.796 * [misc]backup-simplify:  Simplify (sqrt 0) into 0
1545212340.796 * [misc]backup-simplify:  Simplify (/ (sqrt -1) (* 2 (sqrt 0))) into (* +nan.0 (sqrt -1))
1545212340.797 * [misc]taylor:  Taking taylor expansion of 0 in c0
1545212340.797 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.797 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in c0
1545212340.797 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.797 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.797 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.797 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.797 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.797 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.797 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.797 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.797 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.797 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.797 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.797 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.797 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.798 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* +nan.0 (sqrt -1)) 2) (+)) (* 2 0)) into (* +nan.0 (pow (sqrt -1) 2))
1545212340.798 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (pow (sqrt -1) 2)) in c0
1545212340.798 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.798 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.798 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 2) in c0
1545212340.798 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.798 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.798 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.798 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.798 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.799 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.799 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in h
1545212340.799 * [misc]taylor:  Taking taylor expansion of +nan.0 in h
1545212340.799 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.799 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212340.799 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.799 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.799 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.799 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.799 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.799 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in w
1545212340.799 * [misc]taylor:  Taking taylor expansion of +nan.0 in w
1545212340.799 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.799 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212340.799 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.799 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.799 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.800 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.800 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.800 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in d
1545212340.800 * [misc]taylor:  Taking taylor expansion of +nan.0 in d
1545212340.800 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.800 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212340.800 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.800 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.800 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.800 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.800 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.800 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.800 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.800 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.800 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.800 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.800 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.800 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.800 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.800 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.800 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.800 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.800 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.800 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.801 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.801 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.801 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.801 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.801 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.801 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.801 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212340.801 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.801 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.802 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.802 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.802 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.802 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.802 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.802 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 c0)) into 0
1545212340.802 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.802 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.802 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.803 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1))) into (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))
1545212340.804 * [misc]backup-simplify:  Simplify (+ (* -1 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))
1545212340.804 * [misc]backup-simplify:  Simplify (/ (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) (pow 0 2) (+)) (* 2 (sqrt -1))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1)))))
1545212340.806 * [misc]backup-simplify:  Simplify (/ (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))) (+ (* 2 (* (* +nan.0 (sqrt -1)) (* +nan.0 (pow (sqrt -1) 2)))))) (* 2 0)) into (* +nan.0 (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) (* +nan.0 (pow (sqrt -1) 3))))
1545212340.806 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) (* +nan.0 (pow (sqrt -1) 3)))) in c0
1545212340.806 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.806 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.806 * [misc]taylor:  Taking taylor expansion of (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) (* +nan.0 (pow (sqrt -1) 3))) in c0
1545212340.806 * [misc]taylor:  Taking taylor expansion of (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) in c0
1545212340.806 * [misc]taylor:  Taking taylor expansion of 1/2 in c0
1545212340.806 * [misc]backup-simplify:  Simplify 1/2 into 1/2
1545212340.806 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1)))) in c0
1545212340.806 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212340.806 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212340.806 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.806 * [misc]backup-simplify:  Simplify D into D
1545212340.806 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212340.806 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212340.807 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.807 * [misc]backup-simplify:  Simplify h into h
1545212340.807 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212340.807 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.807 * [misc]backup-simplify:  Simplify w into w
1545212340.807 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (* (pow d 4) (sqrt -1))) in c0
1545212340.807 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212340.807 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.807 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.807 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.807 * [misc]taylor:  Taking taylor expansion of (* (pow d 4) (sqrt -1)) in c0
1545212340.807 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212340.807 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.807 * [misc]backup-simplify:  Simplify d into d
1545212340.807 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.807 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.807 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.807 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.807 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.807 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.807 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.807 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.807 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.807 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212340.807 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212340.807 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.808 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.808 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.808 * [misc]backup-simplify:  Simplify (* (pow d 4) (sqrt -1)) into (* (sqrt -1) (pow d 4))
1545212340.808 * [misc]backup-simplify:  Simplify (* 1 (* (sqrt -1) (pow d 4))) into (* (sqrt -1) (pow d 4))
1545212340.808 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (sqrt -1) (pow d 4))) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))
1545212340.808 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (pow (sqrt -1) 3)) in c0
1545212340.808 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.808 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.808 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 3) in c0
1545212340.808 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.808 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.808 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.809 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.809 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.809 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.809 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.809 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212340.809 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.809 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.809 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212340.809 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.809 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.810 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (* 0 (sqrt -1))) into 0
1545212340.810 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.810 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (* (sqrt -1) (pow d 4)))) into 0
1545212340.810 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.811 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))) into 0
1545212340.811 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.811 * [misc]backup-simplify:  Simplify (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))
1545212340.812 * [misc]backup-simplify:  Simplify (+ (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))) 0) into (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))
1545212340.813 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212340.813 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.813 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.813 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.813 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.813 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.813 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.813 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212340.813 * [misc]backup-simplify:  Simplify (* +nan.0 -1) into +nan.0
1545212340.813 * [misc]taylor:  Taking taylor expansion of +nan.0 in h
1545212340.813 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.813 * [misc]taylor:  Taking taylor expansion of +nan.0 in w
1545212340.813 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.814 * [misc]taylor:  Taking taylor expansion of +nan.0 in d
1545212340.814 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.814 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (sqrt -1))) into 0
1545212340.814 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.814 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.814 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.814 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.814 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.814 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.814 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.814 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.814 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.814 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.814 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.814 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.815 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (sqrt -1))) into 0
1545212340.815 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.815 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.815 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.815 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.815 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.815 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.815 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.815 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.815 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.815 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.815 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.815 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.815 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (sqrt -1))) into 0
1545212340.815 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.815 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.815 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.815 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.816 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.816 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.816 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.816 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.816 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.816 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in D
1545212340.816 * [misc]taylor:  Taking taylor expansion of +nan.0 in D
1545212340.816 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.816 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in D
1545212340.816 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.816 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.816 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.817 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.817 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.817 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.817 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.817 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.818 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.818 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.818 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.818 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.819 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.819 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.819 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.819 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.820 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.820 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212340.821 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.821 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.821 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.821 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.822 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.822 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.822 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.822 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 c0))) into 0
1545212340.823 * [misc]backup-simplify:  Simplify (- (/ 0 (* c0 (pow d 2))) (+ (* (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) (/ 0 (* c0 (pow d 2)))) (* 0 (/ 0 (* c0 (pow d 2)))))) into 0
1545212340.823 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.823 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.824 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* (- (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) 0) (+ (* 0 (/ (* (pow D 2) (* h w)) (* c0 (pow d 2)))) (* 0 1)))) into 0
1545212340.825 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 (- (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) (+ (* 0 0) (* 0 1)))) into 0
1545212340.826 * [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (* (pow c0 2) (sqrt -1))))))))) (* 2 (sqrt -1))) into 0
1545212340.830 * [misc]backup-simplify:  Simplify (/ (- 0 (pow (* +nan.0 (pow (sqrt -1) 2)) 2) (+ (* 2 (* (* +nan.0 (sqrt -1)) (* +nan.0 (- (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (* (pow d 4) (sqrt -1))))) (* +nan.0 (pow (sqrt -1) 3)))))))) (* 2 0)) into (* +nan.0 (+ (* +nan.0 (pow (sqrt -1) 4)) (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))))))
1545212340.830 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (+ (* +nan.0 (pow (sqrt -1) 4)) (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))))) in c0
1545212340.831 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.831 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.831 * [misc]taylor:  Taking taylor expansion of (+ (* +nan.0 (pow (sqrt -1) 4)) (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))))) in c0
1545212340.831 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (pow (sqrt -1) 4)) in c0
1545212340.831 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.831 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.831 * [misc]taylor:  Taking taylor expansion of (pow (sqrt -1) 4) in c0
1545212340.831 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in c0
1545212340.831 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.831 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.831 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.831 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.831 * [misc]taylor:  Taking taylor expansion of (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))))) in c0
1545212340.831 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4)))) in c0
1545212340.831 * [misc]taylor:  Taking taylor expansion of +nan.0 in c0
1545212340.831 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.831 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow c0 2) (pow d 4))) in c0
1545212340.832 * [misc]taylor:  Taking taylor expansion of (* (pow D 4) (* (pow h 2) (pow w 2))) in c0
1545212340.832 * [misc]taylor:  Taking taylor expansion of (pow D 4) in c0
1545212340.832 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.832 * [misc]backup-simplify:  Simplify D into D
1545212340.832 * [misc]taylor:  Taking taylor expansion of (* (pow h 2) (pow w 2)) in c0
1545212340.832 * [misc]taylor:  Taking taylor expansion of (pow h 2) in c0
1545212340.832 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.832 * [misc]backup-simplify:  Simplify h into h
1545212340.832 * [misc]taylor:  Taking taylor expansion of (pow w 2) in c0
1545212340.832 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.832 * [misc]backup-simplify:  Simplify w into w
1545212340.832 * [misc]taylor:  Taking taylor expansion of (* (pow c0 2) (pow d 4)) in c0
1545212340.832 * [misc]taylor:  Taking taylor expansion of (pow c0 2) in c0
1545212340.832 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.832 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.832 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.832 * [misc]taylor:  Taking taylor expansion of (pow d 4) in c0
1545212340.832 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.832 * [misc]backup-simplify:  Simplify d into d
1545212340.832 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.832 * [misc]backup-simplify:  Simplify (* (pow D 2) (pow D 2)) into (pow D 4)
1545212340.832 * [misc]backup-simplify:  Simplify (* h h) into (pow h 2)
1545212340.832 * [misc]backup-simplify:  Simplify (* w w) into (pow w 2)
1545212340.833 * [misc]backup-simplify:  Simplify (* (pow h 2) (pow w 2)) into (* (pow h 2) (pow w 2))
1545212340.833 * [misc]backup-simplify:  Simplify (* (pow D 4) (* (pow h 2) (pow w 2))) into (* (pow D 4) (* (pow h 2) (pow w 2)))
1545212340.833 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.833 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.833 * [misc]backup-simplify:  Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
1545212340.833 * [misc]backup-simplify:  Simplify (* 1 (pow d 4)) into (pow d 4)
1545212340.833 * [misc]backup-simplify:  Simplify (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)) into (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))
1545212340.834 * [misc]backup-simplify:  Simplify (+ (* w 0) (* 0 w)) into 0
1545212340.834 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 h)) into 0
1545212340.834 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (* 0 (pow w 2))) into 0
1545212340.834 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.834 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (pow D 2))) into 0
1545212340.834 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (* 0 (* (pow h 2) (pow w 2)))) into 0
1545212340.834 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.835 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
1545212340.835 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.835 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 (pow d 4))) into 0
1545212340.836 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 4)) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)) (/ 0 (pow d 4))))) into 0
1545212340.836 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into 0
1545212340.836 * [misc]backup-simplify:  Simplify (- 0) into 0
1545212340.836 * [misc]backup-simplify:  Simplify (+ 0 0) into 0
1545212340.837 * [misc]backup-simplify:  Simplify (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))) into (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))
1545212340.837 * [misc]backup-simplify:  Simplify (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))) into (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))
1545212340.838 * [misc]backup-simplify:  Simplify (+ 0 (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))) into (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4))))
1545212340.839 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 (- (* +nan.0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (pow d 4)))))) into 0
1545212340.839 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.839 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.839 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.839 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.839 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.839 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.839 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.839 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 h))) into 0
1545212340.840 * [misc]backup-simplify:  Simplify (+ (* (pow h 2) 0) (+ (* 0 0) (* 0 (pow w 2)))) into 0
1545212340.840 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.840 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212340.841 * [misc]backup-simplify:  Simplify (+ (* (pow D 4) 0) (+ (* 0 0) (* 0 (* (pow h 2) (pow w 2))))) into 0
1545212340.842 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.842 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.843 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
1545212340.843 * [misc]backup-simplify:  Simplify (+ (* (pow d 4) 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.843 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.844 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (* (sqrt -1) (pow d 4))))) into 0
1545212340.845 * [misc]backup-simplify:  Simplify (- (/ 0 (* (sqrt -1) (pow d 4))) (+ (* (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))) (/ 0 (* (sqrt -1) (pow d 4)))) (* 0 (/ 0 (* (sqrt -1) (pow d 4)))))) into 0
1545212340.846 * [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1)))))) into 0
1545212340.846 * [misc]backup-simplify:  Simplify (* (sqrt -1) (sqrt -1)) into -1
1545212340.846 * [misc]backup-simplify:  Simplify (* (sqrt -1) -1) into (* -1 (sqrt -1))
1545212340.847 * [misc]backup-simplify:  Simplify (* +nan.0 (* -1 (sqrt -1))) into (* +nan.0 (sqrt -1))
1545212340.847 * [misc]backup-simplify:  Simplify (- (* +nan.0 (sqrt -1))) into (- (* +nan.0 (sqrt -1)))
1545212340.848 * [misc]backup-simplify:  Simplify (+ 0 (- (* +nan.0 (sqrt -1)))) into (- (* +nan.0 (sqrt -1)))
1545212340.849 * [misc]backup-simplify:  Simplify (+ (* +nan.0 (- (* +nan.0 (sqrt -1)))) (+ (* 0 0) (* 0 (* 1/2 (/ (* (pow D 4) (* (pow h 2) (pow w 2))) (* (pow d 4) (sqrt -1))))))) into (- (* +nan.0 (sqrt -1)))
1545212340.849 * [misc]taylor:  Taking taylor expansion of (- (* +nan.0 (sqrt -1))) in h
1545212340.849 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in h
1545212340.850 * [misc]taylor:  Taking taylor expansion of +nan.0 in h
1545212340.850 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.850 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in h
1545212340.850 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.850 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.850 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.850 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.850 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.851 * [misc]backup-simplify:  Simplify (- (* +nan.0 (sqrt -1))) into (- (* +nan.0 (sqrt -1)))
1545212340.851 * [misc]taylor:  Taking taylor expansion of (- (* +nan.0 (sqrt -1))) in w
1545212340.851 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in w
1545212340.851 * [misc]taylor:  Taking taylor expansion of +nan.0 in w
1545212340.851 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.851 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in w
1545212340.851 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.851 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.851 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.851 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.852 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.852 * [misc]backup-simplify:  Simplify (- (* +nan.0 (sqrt -1))) into (- (* +nan.0 (sqrt -1)))
1545212340.852 * [misc]taylor:  Taking taylor expansion of (- (* +nan.0 (sqrt -1))) in d
1545212340.852 * [misc]taylor:  Taking taylor expansion of (* +nan.0 (sqrt -1)) in d
1545212340.852 * [misc]taylor:  Taking taylor expansion of +nan.0 in d
1545212340.852 * [misc]backup-simplify:  Simplify +nan.0 into +nan.0
1545212340.852 * [misc]taylor:  Taking taylor expansion of (sqrt -1) in d
1545212340.852 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.852 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.853 * [misc]backup-simplify:  Simplify (sqrt -1) into (sqrt -1)
1545212340.853 * [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt -1))) into 0
1545212340.853 * [misc]backup-simplify:  Simplify (+ (* (sqrt -1) 0) (* 0 (sqrt -1))) into 0
1545212340.853 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (* 0 -1)) into 0
1545212340.853 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.853 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.853 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.853 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.853 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.853 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.855 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.855 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.855 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.855 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.855 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.855 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.855 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.855 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.855 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.855 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.855 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.855 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.855 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.855 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.856 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.856 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.856 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.856 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.856 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.856 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.856 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.856 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.856 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.856 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.856 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.856 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.856 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.856 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.856 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.856 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.857 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.858 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.858 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.858 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.859 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.859 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.860 * [misc]backup-simplify:  Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt -1))) into 0
1545212340.861 * [misc]backup-simplify:  Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (sqrt -1)))) into 0
1545212340.861 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.861 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.861 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.861 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.861 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.861 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.861 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.861 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.861 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.861 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.861 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.862 * [misc]backup-simplify:  Simplify (* +nan.0 (sqrt -1)) into (* +nan.0 (sqrt -1))
1545212340.862 * * * * [misc]progress:  [ 4 / 4 ] generating series at (2 2 1 2 1 1 2 1)
1545212340.862 * [misc]backup-simplify:  Simplify (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* h w)))
1545212340.862 * [misc]approximate:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in (c0 h w d D) around 0
1545212340.862 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in D
1545212340.862 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in D
1545212340.862 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.862 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.862 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.862 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.862 * [misc]backup-simplify:  Simplify d into d
1545212340.862 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.862 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.862 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.862 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.862 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.863 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.863 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.863 * [misc]backup-simplify:  Simplify h into h
1545212340.863 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.863 * [misc]backup-simplify:  Simplify w into w
1545212340.863 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.863 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.863 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.863 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.863 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.863 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* h w)) into (/ (* c0 (pow d 2)) (* w h))
1545212340.863 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in d
1545212340.863 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in d
1545212340.863 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.863 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.863 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.863 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.864 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.864 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.864 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.864 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.864 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.864 * [misc]backup-simplify:  Simplify D into D
1545212340.864 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.864 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.864 * [misc]backup-simplify:  Simplify h into h
1545212340.864 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.864 * [misc]backup-simplify:  Simplify w into w
1545212340.864 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.864 * [misc]backup-simplify:  Simplify (* c0 1) into c0
1545212340.864 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.864 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.864 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.864 * [misc]backup-simplify:  Simplify (/ c0 (* (pow D 2) (* h w))) into (/ c0 (* (pow D 2) (* h w)))
1545212340.864 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in w
1545212340.864 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in w
1545212340.865 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.865 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.865 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.865 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.865 * [misc]backup-simplify:  Simplify d into d
1545212340.865 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.865 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.865 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.865 * [misc]backup-simplify:  Simplify D into D
1545212340.865 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.865 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.865 * [misc]backup-simplify:  Simplify h into h
1545212340.865 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.865 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.865 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.865 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.865 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.865 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.865 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.865 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.866 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.866 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.866 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.866 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) h)) into (/ (* c0 (pow d 2)) (* (pow D 2) h))
1545212340.866 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in h
1545212340.866 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in h
1545212340.866 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.866 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.866 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.866 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.866 * [misc]backup-simplify:  Simplify d into d
1545212340.867 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.867 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.867 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.867 * [misc]backup-simplify:  Simplify D into D
1545212340.867 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.867 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.867 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.867 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.867 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.867 * [misc]backup-simplify:  Simplify w into w
1545212340.867 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.867 * [misc]backup-simplify:  Simplify (* c0 (pow d 2)) into (* c0 (pow d 2))
1545212340.867 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.867 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.867 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.867 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.867 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.868 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.868 * [misc]backup-simplify:  Simplify (/ (* c0 (pow d 2)) (* (pow D 2) w)) into (/ (* c0 (pow d 2)) (* w (pow D 2)))
1545212340.868 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212340.868 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.868 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.868 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.868 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.868 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.868 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.868 * [misc]backup-simplify:  Simplify d into d
1545212340.868 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.868 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.868 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.868 * [misc]backup-simplify:  Simplify D into D
1545212340.868 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.868 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.868 * [misc]backup-simplify:  Simplify h into h
1545212340.868 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.868 * [misc]backup-simplify:  Simplify w into w
1545212340.868 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.868 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.868 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.868 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.868 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.868 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.868 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.869 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212340.869 * [misc]taylor:  Taking taylor expansion of (/ (* c0 (pow d 2)) (* (pow D 2) (* h w))) in c0
1545212340.869 * [misc]taylor:  Taking taylor expansion of (* c0 (pow d 2)) in c0
1545212340.869 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.869 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.869 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.869 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.869 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.869 * [misc]backup-simplify:  Simplify d into d
1545212340.869 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.869 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.869 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.869 * [misc]backup-simplify:  Simplify D into D
1545212340.869 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.869 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.869 * [misc]backup-simplify:  Simplify h into h
1545212340.869 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.869 * [misc]backup-simplify:  Simplify w into w
1545212340.869 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.869 * [misc]backup-simplify:  Simplify (* 0 (pow d 2)) into 0
1545212340.869 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.869 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow d 2))) into (pow d 2)
1545212340.869 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.869 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.869 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.869 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) (* h w))) into (/ (pow d 2) (* w (* (pow D 2) h)))
1545212340.869 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (* (pow D 2) h))) in h
1545212340.869 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.869 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.869 * [misc]backup-simplify:  Simplify d into d
1545212340.869 * [misc]taylor:  Taking taylor expansion of (* w (* (pow D 2) h)) in h
1545212340.870 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.870 * [misc]backup-simplify:  Simplify w into w
1545212340.870 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) h) in h
1545212340.870 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.870 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.870 * [misc]backup-simplify:  Simplify D into D
1545212340.870 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.870 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.870 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.870 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.870 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.870 * [misc]backup-simplify:  Simplify (* w 0) into 0
1545212340.870 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.870 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212340.870 * [misc]backup-simplify:  Simplify (+ (* w (pow D 2)) (* 0 0)) into (* (pow D 2) w)
1545212340.870 * [misc]backup-simplify:  Simplify (/ (pow d 2) (* (pow D 2) w)) into (/ (pow d 2) (* w (pow D 2)))
1545212340.870 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (* w (pow D 2))) in w
1545212340.870 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.870 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.870 * [misc]backup-simplify:  Simplify d into d
1545212340.870 * [misc]taylor:  Taking taylor expansion of (* w (pow D 2)) in w
1545212340.870 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.870 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.870 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.870 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.870 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.870 * [misc]backup-simplify:  Simplify D into D
1545212340.871 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.871 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.871 * [misc]backup-simplify:  Simplify (* 0 (pow D 2)) into 0
1545212340.871 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.871 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 (pow D 2))) into (pow D 2)
1545212340.871 * [misc]backup-simplify:  Simplify (/ (pow d 2) (pow D 2)) into (/ (pow d 2) (pow D 2))
1545212340.871 * [misc]taylor:  Taking taylor expansion of (/ (pow d 2) (pow D 2)) in d
1545212340.871 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.871 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.871 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.871 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.871 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.871 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.871 * [misc]backup-simplify:  Simplify D into D
1545212340.871 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.871 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.871 * [misc]backup-simplify:  Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
1545212340.871 * [misc]taylor:  Taking taylor expansion of (/ 1 (pow D 2)) in D
1545212340.871 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.871 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.871 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.871 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.871 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.872 * [misc]backup-simplify:  Simplify (/ 1 1) into 1
1545212340.872 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.872 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.872 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow d 2)))) into 0
1545212340.872 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.872 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.872 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.872 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.872 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.872 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.873 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.873 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.873 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.873 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
1545212340.873 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))))) into 0
1545212340.873 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.873 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.873 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.874 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.874 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 (pow D 2)))) into 0
1545212340.874 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212340.874 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.874 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.874 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.874 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.874 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.874 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.874 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
1545212340.874 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.874 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.875 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.875 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)))) into 0
1545212340.875 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.875 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.875 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
1545212340.875 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.876 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.876 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.876 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.876 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.876 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.876 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.876 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.876 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.877 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.877 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212340.877 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
1545212340.877 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212340.877 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.877 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.877 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.877 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.877 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.877 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.878 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.878 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.878 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
1545212340.878 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212340.878 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.878 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.878 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.878 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.878 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.878 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.879 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.879 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.879 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212340.879 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.879 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.879 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.879 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.879 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.880 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.880 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2)))))) into 0
1545212340.880 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.881 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.881 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.881 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.881 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.881 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.881 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.881 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.881 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.881 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.882 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.882 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.882 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212340.883 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
1545212340.883 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212340.883 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.883 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.883 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.883 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.883 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.883 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.883 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.883 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.883 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.883 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.883 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.883 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.883 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.883 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.883 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.884 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.884 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
1545212340.884 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212340.884 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.884 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.884 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.885 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.885 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.885 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.885 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.885 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.885 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.885 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.885 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.885 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.885 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212340.885 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.885 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.886 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.886 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.886 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
1545212340.886 * [misc]backup-simplify:  Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.886 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.886 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))))) into 0
1545212340.887 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))))) into 0
1545212340.887 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212340.888 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.888 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w)))))) into 0
1545212340.888 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) (* h w))) (+ (* (/ (pow d 2) (* w (* (pow D 2) h))) (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))) (* 0 (/ 0 (* (pow D 2) (* h w)))))) into 0
1545212340.888 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.888 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.888 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.888 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.888 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.889 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.889 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.889 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.889 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212340.890 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
1545212340.891 * [misc]backup-simplify:  Simplify (+ (* w 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
1545212340.891 * [misc]backup-simplify:  Simplify (- (/ 0 (* (pow D 2) w)) (+ (* (/ (pow d 2) (* w (pow D 2))) (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))) (* 0 (/ 0 (* (pow D 2) w))))) into 0
1545212340.891 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.891 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.891 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.891 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.891 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.891 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.891 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.891 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.891 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.891 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.892 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.892 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.892 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.892 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.892 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.892 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
1545212340.893 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
1545212340.893 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ (pow d 2) (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212340.893 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.893 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.893 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.893 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.893 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.893 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.893 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.893 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.893 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.894 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.894 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.894 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
1545212340.894 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.894 * [misc]backup-simplify:  Simplify (- (/ 0 (pow D 2)) (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
1545212340.894 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.894 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.895 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.895 * [misc]backup-simplify:  Simplify (* 1 (* (pow D -2) (* (pow d 2) (* (/ 1 w) (* (/ 1 h) c0))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.895 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 c0) (/ 1 h)) (/ 1 w)) (* (/ (/ 1 d) (/ 1 D)) (/ (/ 1 d) (/ 1 D)))) into (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))
1545212340.895 * [misc]approximate:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in (c0 h w d D) around 0
1545212340.895 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212340.895 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.895 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.895 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.895 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.895 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.895 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.895 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.895 * [misc]backup-simplify:  Simplify h into h
1545212340.895 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.895 * [misc]backup-simplify:  Simplify w into w
1545212340.895 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212340.895 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.895 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.895 * [misc]backup-simplify:  Simplify d into d
1545212340.895 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.895 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.895 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.895 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.895 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.895 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.896 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.896 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.896 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212340.896 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.896 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.896 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.896 * [misc]backup-simplify:  Simplify D into D
1545212340.896 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.896 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.896 * [misc]backup-simplify:  Simplify h into h
1545212340.896 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.896 * [misc]backup-simplify:  Simplify w into w
1545212340.896 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212340.896 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.896 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.896 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.896 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.896 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.896 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.896 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.896 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.896 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.896 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212340.896 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.896 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212340.896 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.896 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.896 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.896 * [misc]backup-simplify:  Simplify D into D
1545212340.896 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.896 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.896 * [misc]backup-simplify:  Simplify h into h
1545212340.896 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.896 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.896 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.896 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212340.896 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.897 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.897 * [misc]backup-simplify:  Simplify d into d
1545212340.897 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.897 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.897 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.897 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.897 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.897 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.897 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.897 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.897 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.897 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.897 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.897 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212340.897 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.897 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.897 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.897 * [misc]backup-simplify:  Simplify D into D
1545212340.897 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.897 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.897 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.897 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.897 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.897 * [misc]backup-simplify:  Simplify w into w
1545212340.897 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212340.897 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.897 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.897 * [misc]backup-simplify:  Simplify d into d
1545212340.898 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.898 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.898 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.898 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.898 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.898 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.898 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.898 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.898 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.898 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.898 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.898 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.898 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.898 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.898 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.898 * [misc]backup-simplify:  Simplify D into D
1545212340.898 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.898 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.898 * [misc]backup-simplify:  Simplify h into h
1545212340.898 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.898 * [misc]backup-simplify:  Simplify w into w
1545212340.898 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.898 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.898 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.898 * [misc]backup-simplify:  Simplify d into d
1545212340.898 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.898 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.898 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.899 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.899 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.899 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.899 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.899 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.899 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.899 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.899 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.899 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.899 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.899 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.899 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.899 * [misc]backup-simplify:  Simplify D into D
1545212340.899 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.899 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.899 * [misc]backup-simplify:  Simplify h into h
1545212340.899 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.899 * [misc]backup-simplify:  Simplify w into w
1545212340.899 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.899 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.899 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.899 * [misc]backup-simplify:  Simplify d into d
1545212340.899 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.899 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.899 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.899 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.899 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.899 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.899 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.900 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.900 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.900 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.900 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.900 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212340.900 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.900 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.900 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.900 * [misc]backup-simplify:  Simplify D into D
1545212340.900 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.900 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.900 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.900 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.900 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.900 * [misc]backup-simplify:  Simplify w into w
1545212340.900 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.900 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.900 * [misc]backup-simplify:  Simplify d into d
1545212340.900 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.900 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.900 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.900 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.900 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.901 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.901 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.901 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212340.901 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212340.901 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212340.901 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.901 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.901 * [misc]backup-simplify:  Simplify D into D
1545212340.901 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.901 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.901 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.901 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.901 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.901 * [misc]backup-simplify:  Simplify d into d
1545212340.901 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.901 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.901 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.901 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212340.901 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.901 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212340.901 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212340.901 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.901 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.901 * [misc]backup-simplify:  Simplify D into D
1545212340.901 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.901 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.901 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.902 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.902 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.902 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.902 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212340.902 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.902 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.902 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.902 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.902 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.902 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.902 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.902 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.902 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.902 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.902 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.903 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.903 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.903 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.903 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.903 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.903 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.903 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.903 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212340.903 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.903 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212340.903 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.904 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.904 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.904 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.904 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.904 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.904 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.904 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.904 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.904 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.904 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.904 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.904 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.904 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.905 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212340.905 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.905 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.905 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.905 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.905 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.905 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.905 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.905 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.906 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.906 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212340.906 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.906 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.906 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.906 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.906 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.906 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.906 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.906 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.906 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.906 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.906 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.907 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.907 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.907 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212340.907 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.907 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.907 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.907 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.908 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.908 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.908 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.908 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.908 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.908 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.908 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.908 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212340.908 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.908 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.908 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.908 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.909 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.909 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.909 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.909 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.909 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.909 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.909 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.910 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.910 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.910 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.910 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.910 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.911 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.911 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212340.911 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.911 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.911 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.911 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.911 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.911 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.911 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.911 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.911 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.912 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.912 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.912 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.912 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.912 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.912 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.912 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212340.913 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.913 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212340.913 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.914 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.914 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.914 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.914 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.915 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.915 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212340.915 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.916 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.916 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.916 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.916 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.916 * [misc]backup-simplify:  Simplify (* 1 (* (pow (/ 1 D) 2) (* (pow (/ 1 d) -2) (* (/ 1 w) (* (/ 1 h) (/ 1 (/ 1 c0))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.917 * [misc]backup-simplify:  Simplify (* (/ (/ (/ 1 (- c0)) (/ 1 (- h))) (/ 1 (- w))) (* (/ (/ 1 (- d)) (/ 1 (- D))) (/ (/ 1 (- d)) (/ 1 (- D))))) into (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)))
1545212340.917 * [misc]approximate:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in (c0 h w d D) around 0
1545212340.917 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in D
1545212340.917 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.917 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.917 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in D
1545212340.917 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in D
1545212340.917 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.917 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.917 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.917 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.917 * [misc]taylor:  Taking taylor expansion of (* h w) in D
1545212340.917 * [misc]taylor:  Taking taylor expansion of h in D
1545212340.917 * [misc]backup-simplify:  Simplify h into h
1545212340.917 * [misc]taylor:  Taking taylor expansion of w in D
1545212340.917 * [misc]backup-simplify:  Simplify w into w
1545212340.917 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in D
1545212340.917 * [misc]taylor:  Taking taylor expansion of (pow d 2) in D
1545212340.917 * [misc]taylor:  Taking taylor expansion of d in D
1545212340.917 * [misc]backup-simplify:  Simplify d into d
1545212340.917 * [misc]taylor:  Taking taylor expansion of c0 in D
1545212340.917 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.917 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.917 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.918 * [misc]backup-simplify:  Simplify (* 1 (* h w)) into (* h w)
1545212340.918 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.918 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.918 * [misc]backup-simplify:  Simplify (/ (* h w) (* c0 (pow d 2))) into (/ (* h w) (* c0 (pow d 2)))
1545212340.918 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in d
1545212340.918 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.918 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.918 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in d
1545212340.918 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in d
1545212340.918 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.918 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.918 * [misc]backup-simplify:  Simplify D into D
1545212340.918 * [misc]taylor:  Taking taylor expansion of (* h w) in d
1545212340.918 * [misc]taylor:  Taking taylor expansion of h in d
1545212340.918 * [misc]backup-simplify:  Simplify h into h
1545212340.918 * [misc]taylor:  Taking taylor expansion of w in d
1545212340.918 * [misc]backup-simplify:  Simplify w into w
1545212340.918 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in d
1545212340.918 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.918 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.918 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.918 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.918 * [misc]taylor:  Taking taylor expansion of c0 in d
1545212340.918 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.918 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.918 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.918 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.919 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.919 * [misc]backup-simplify:  Simplify (* 1 c0) into c0
1545212340.919 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) c0) into (/ (* (pow D 2) (* h w)) c0)
1545212340.919 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in w
1545212340.919 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.919 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.919 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in w
1545212340.919 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in w
1545212340.919 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.919 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.919 * [misc]backup-simplify:  Simplify D into D
1545212340.919 * [misc]taylor:  Taking taylor expansion of (* h w) in w
1545212340.919 * [misc]taylor:  Taking taylor expansion of h in w
1545212340.919 * [misc]backup-simplify:  Simplify h into h
1545212340.919 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.919 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.919 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.919 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in w
1545212340.919 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.919 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.919 * [misc]backup-simplify:  Simplify d into d
1545212340.919 * [misc]taylor:  Taking taylor expansion of c0 in w
1545212340.919 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.919 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.920 * [misc]backup-simplify:  Simplify (* h 0) into 0
1545212340.920 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.920 * [misc]backup-simplify:  Simplify (+ (* h 1) (* 0 0)) into h
1545212340.920 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.920 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) h) (* 0 0)) into (* (pow D 2) h)
1545212340.920 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.920 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.921 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) h) (* c0 (pow d 2))) into (/ (* (pow D 2) h) (* c0 (pow d 2)))
1545212340.921 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in h
1545212340.921 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.921 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.921 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in h
1545212340.921 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.921 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.921 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.921 * [misc]backup-simplify:  Simplify D into D
1545212340.921 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.921 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.921 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.921 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.921 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.921 * [misc]backup-simplify:  Simplify w into w
1545212340.921 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in h
1545212340.921 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.921 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.921 * [misc]backup-simplify:  Simplify d into d
1545212340.921 * [misc]taylor:  Taking taylor expansion of c0 in h
1545212340.921 * [misc]backup-simplify:  Simplify c0 into c0
1545212340.921 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.921 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.921 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.922 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.922 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.922 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.922 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.922 * [misc]backup-simplify:  Simplify (* (pow d 2) c0) into (* c0 (pow d 2))
1545212340.922 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (* c0 (pow d 2))) into (/ (* (pow D 2) w) (* (pow d 2) c0))
1545212340.922 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212340.922 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.922 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.922 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.923 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.923 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.923 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.923 * [misc]backup-simplify:  Simplify D into D
1545212340.923 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.923 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.923 * [misc]backup-simplify:  Simplify h into h
1545212340.923 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.923 * [misc]backup-simplify:  Simplify w into w
1545212340.923 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.923 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.923 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.923 * [misc]backup-simplify:  Simplify d into d
1545212340.923 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.923 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.923 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.923 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.923 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.923 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.923 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.923 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.923 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.924 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.924 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.924 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (* (pow d 2) c0))) in c0
1545212340.924 * [misc]taylor:  Taking taylor expansion of -1 in c0
1545212340.924 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.924 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (* (pow d 2) c0)) in c0
1545212340.924 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in c0
1545212340.924 * [misc]taylor:  Taking taylor expansion of (pow D 2) in c0
1545212340.924 * [misc]taylor:  Taking taylor expansion of D in c0
1545212340.924 * [misc]backup-simplify:  Simplify D into D
1545212340.924 * [misc]taylor:  Taking taylor expansion of (* h w) in c0
1545212340.924 * [misc]taylor:  Taking taylor expansion of h in c0
1545212340.924 * [misc]backup-simplify:  Simplify h into h
1545212340.924 * [misc]taylor:  Taking taylor expansion of w in c0
1545212340.924 * [misc]backup-simplify:  Simplify w into w
1545212340.924 * [misc]taylor:  Taking taylor expansion of (* (pow d 2) c0) in c0
1545212340.924 * [misc]taylor:  Taking taylor expansion of (pow d 2) in c0
1545212340.924 * [misc]taylor:  Taking taylor expansion of d in c0
1545212340.924 * [misc]backup-simplify:  Simplify d into d
1545212340.925 * [misc]taylor:  Taking taylor expansion of c0 in c0
1545212340.925 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.925 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.925 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.925 * [misc]backup-simplify:  Simplify (* h w) into (* h w)
1545212340.925 * [misc]backup-simplify:  Simplify (* (pow D 2) (* h w)) into (* (pow D 2) (* h w))
1545212340.925 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.925 * [misc]backup-simplify:  Simplify (* (pow d 2) 0) into 0
1545212340.925 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.925 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 1) (* 0 0)) into (pow d 2)
1545212340.925 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) (* h w)) (pow d 2)) into (/ (* (pow D 2) (* h w)) (pow d 2))
1545212340.926 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) into (* -1 (/ (* (pow D 2) (* h w)) (pow d 2)))
1545212340.926 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) (* h w)) (pow d 2))) in h
1545212340.926 * [misc]taylor:  Taking taylor expansion of -1 in h
1545212340.926 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.926 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) (* h w)) (pow d 2)) in h
1545212340.926 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) (* h w)) in h
1545212340.926 * [misc]taylor:  Taking taylor expansion of (pow D 2) in h
1545212340.926 * [misc]taylor:  Taking taylor expansion of D in h
1545212340.926 * [misc]backup-simplify:  Simplify D into D
1545212340.926 * [misc]taylor:  Taking taylor expansion of (* h w) in h
1545212340.926 * [misc]taylor:  Taking taylor expansion of h in h
1545212340.926 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.926 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.926 * [misc]taylor:  Taking taylor expansion of w in h
1545212340.926 * [misc]backup-simplify:  Simplify w into w
1545212340.926 * [misc]taylor:  Taking taylor expansion of (pow d 2) in h
1545212340.926 * [misc]taylor:  Taking taylor expansion of d in h
1545212340.926 * [misc]backup-simplify:  Simplify d into d
1545212340.926 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.926 * [misc]backup-simplify:  Simplify (* 0 w) into 0
1545212340.926 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.927 * [misc]backup-simplify:  Simplify (+ (* 0 0) (* 1 w)) into w
1545212340.927 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.927 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) w) (* 0 0)) into (* (pow D 2) w)
1545212340.927 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.927 * [misc]backup-simplify:  Simplify (/ (* (pow D 2) w) (pow d 2)) into (/ (* (pow D 2) w) (pow d 2))
1545212340.927 * [misc]backup-simplify:  Simplify (* -1 (/ (* (pow D 2) w) (pow d 2))) into (* -1 (/ (* (pow D 2) w) (pow d 2)))
1545212340.927 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (* (pow D 2) w) (pow d 2))) in w
1545212340.928 * [misc]taylor:  Taking taylor expansion of -1 in w
1545212340.928 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.928 * [misc]taylor:  Taking taylor expansion of (/ (* (pow D 2) w) (pow d 2)) in w
1545212340.928 * [misc]taylor:  Taking taylor expansion of (* (pow D 2) w) in w
1545212340.928 * [misc]taylor:  Taking taylor expansion of (pow D 2) in w
1545212340.928 * [misc]taylor:  Taking taylor expansion of D in w
1545212340.928 * [misc]backup-simplify:  Simplify D into D
1545212340.928 * [misc]taylor:  Taking taylor expansion of w in w
1545212340.928 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.928 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.928 * [misc]taylor:  Taking taylor expansion of (pow d 2) in w
1545212340.928 * [misc]taylor:  Taking taylor expansion of d in w
1545212340.928 * [misc]backup-simplify:  Simplify d into d
1545212340.928 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.928 * [misc]backup-simplify:  Simplify (* (pow D 2) 0) into 0
1545212340.928 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.928 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
1545212340.928 * [misc]backup-simplify:  Simplify (* d d) into (pow d 2)
1545212340.928 * [misc]backup-simplify:  Simplify (/ (pow D 2) (pow d 2)) into (/ (pow D 2) (pow d 2))
1545212340.929 * [misc]backup-simplify:  Simplify (* -1 (/ (pow D 2) (pow d 2))) into (* -1 (/ (pow D 2) (pow d 2)))
1545212340.929 * [misc]taylor:  Taking taylor expansion of (* -1 (/ (pow D 2) (pow d 2))) in d
1545212340.929 * [misc]taylor:  Taking taylor expansion of -1 in d
1545212340.929 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.929 * [misc]taylor:  Taking taylor expansion of (/ (pow D 2) (pow d 2)) in d
1545212340.929 * [misc]taylor:  Taking taylor expansion of (pow D 2) in d
1545212340.929 * [misc]taylor:  Taking taylor expansion of D in d
1545212340.929 * [misc]backup-simplify:  Simplify D into D
1545212340.929 * [misc]taylor:  Taking taylor expansion of (pow d 2) in d
1545212340.929 * [misc]taylor:  Taking taylor expansion of d in d
1545212340.929 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.929 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.929 * [misc]backup-simplify:  Simplify (* D D) into (pow D 2)
1545212340.929 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.929 * [misc]backup-simplify:  Simplify (/ (pow D 2) 1) into (pow D 2)
1545212340.929 * [misc]backup-simplify:  Simplify (* -1 (pow D 2)) into (* -1 (pow D 2))
1545212340.929 * [misc]taylor:  Taking taylor expansion of (* -1 (pow D 2)) in D
1545212340.929 * [misc]taylor:  Taking taylor expansion of -1 in D
1545212340.929 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.930 * [misc]taylor:  Taking taylor expansion of (pow D 2) in D
1545212340.930 * [misc]taylor:  Taking taylor expansion of D in D
1545212340.930 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.930 * [misc]backup-simplify:  Simplify 1 into 1
1545212340.930 * [misc]backup-simplify:  Simplify (* 1 1) into 1
1545212340.930 * [misc]backup-simplify:  Simplify (* -1 1) into -1
1545212340.930 * [misc]backup-simplify:  Simplify -1 into -1
1545212340.930 * [misc]backup-simplify:  Simplify (+ (* h 0) (* 0 w)) into 0
1545212340.930 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.930 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (* 0 (* h w))) into 0
1545212340.931 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.931 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.931 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.932 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))) into 0
1545212340.932 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.932 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.932 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.932 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.932 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.932 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.932 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (* 0 w))) into 0
1545212340.933 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.933 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 w) (* 0 0))) into 0
1545212340.933 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.933 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.934 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))) into 0
1545212340.934 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.934 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.934 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.934 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.934 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.934 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
1545212340.935 * [misc]backup-simplify:  Simplify (+ (* d 0) (* 0 d)) into 0
1545212340.935 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))))) into 0
1545212340.935 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (/ (pow D 2) (pow d 2)))) into 0
1545212340.935 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.935 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.935 * [misc]backup-simplify:  Simplify (+ (* D 0) (* 0 D)) into 0
1545212340.936 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.936 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)))) into 0
1545212340.936 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 (pow D 2))) into 0
1545212340.936 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.936 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.936 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.937 * [misc]backup-simplify:  Simplify (+ (* 1 0) (* 0 1)) into 0
1545212340.937 * [misc]backup-simplify:  Simplify (+ (* -1 0) (* 0 1)) into 0
1545212340.937 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.937 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (* 0 w))) into 0
1545212340.937 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.938 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (* h w)))) into 0
1545212340.938 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.938 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212340.939 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.939 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2))))) into 0
1545212340.939 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.939 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.939 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.940 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.940 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.940 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.940 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.940 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.940 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.940 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.940 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.941 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.941 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 w) (* 0 0)))) into 0
1545212340.941 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.942 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.942 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2))))) into 0
1545212340.942 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.942 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.942 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.942 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.942 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.942 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.942 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.942 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.943 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.943 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
1545212340.943 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
1545212340.944 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.944 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2))))) into 0
1545212340.944 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.944 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.944 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
1545212340.945 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.945 * [misc]backup-simplify:  Simplify (- (/ 0 1) (+ (* (pow D 2) (/ 0 1)) (* 0 (/ 0 1)))) into 0
1545212340.946 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
1545212340.946 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.946 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.946 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.946 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.946 * [misc]backup-simplify:  Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.946 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (* 0 1))) into 0
1545212340.946 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.947 * [misc]backup-simplify:  Simplify (+ (* h 0) (+ (* 0 0) (+ (* 0 0) (* 0 w)))) into 0
1545212340.947 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
1545212340.948 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* h w))))) into 0
1545212340.948 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 d))))) into 0
1545212340.949 * [misc]backup-simplify:  Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212340.949 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) (* h w)) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.950 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) (* h w)) (pow d 2)))))) into 0
1545212340.950 * [misc]taylor:  Taking taylor expansion of 0 in h
1545212340.950 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.950 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.950 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.950 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.950 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.950 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.950 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.950 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.950 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.950 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.950 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.950 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.950 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.951 * [misc]backup-simplify:  Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 w))))) into 0
1545212340.951 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.952 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 w) (* 0 0))))) into 0
1545212340.952 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.953 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (* (pow D 2) w) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.953 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (* (pow D 2) w) (pow d 2)))))) into 0
1545212340.953 * [misc]taylor:  Taking taylor expansion of 0 in w
1545212340.953 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.953 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.953 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.953 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.953 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.953 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.953 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.953 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.954 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.954 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.954 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.954 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.954 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.954 * [misc]backup-simplify:  Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
1545212340.955 * [misc]backup-simplify:  Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
1545212340.955 * [misc]backup-simplify:  Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
1545212340.955 * [misc]backup-simplify:  Simplify (- (/ 0 (pow d 2)) (+ (* (/ (pow D 2) (pow d 2)) (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))) (* 0 (/ 0 (pow d 2))))) into 0
1545212340.956 * [misc]backup-simplify:  Simplify (+ (* -1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ (pow D 2) (pow d 2)))))) into 0
1545212340.956 * [misc]taylor:  Taking taylor expansion of 0 in d
1545212340.956 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.956 * [misc]taylor:  Taking taylor expansion of 0 in D
1545212340.956 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.956 * [misc]backup-simplify:  Simplify 0 into 0
1545212340.957 * [misc]backup-simplify:  Simplify (* -1 (* (pow (/ 1 (- D)) 2) (* (pow (/ 1 (- d)) -2) (* (/ 1 (- w)) (* (/ 1 (- h)) (/ 1 (/ 1 (- c0)))))))) into (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212340.957 * * * [misc]progress:  simplifying candidates
1545212340.957 * * * * [misc]progress:  [ 1 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (* (exp (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (exp (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212340.957 * [enter]simplify:  Simplifying (* (exp (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (exp (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))
1545212340.958 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212340.965 * * [misc]simplify:  iters left: 5 (50 enodes)
1545212340.974 * * [misc]simplify:  iters left: 4 (136 enodes)
1545212341.013 * * [misc]simplify:  iters left: 3 (412 enodes)
1545212341.364 * [exit]simplify:  Simplified to (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))))
1545212341.364 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))
1545212341.364 * * * * [misc]progress:  [ 2 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (pow (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) 1)))>
1545212341.365 * * * * [misc]progress:  [ 3 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212341.365 * * * * [misc]progress:  [ 4 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212341.365 * * * * [misc]progress:  [ 5 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (* (cbrt (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))) (cbrt (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))) (cbrt (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212341.365 * * * * [misc]progress:  [ 6 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (cbrt (* (* (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212341.365 * * * * [misc]progress:  [ 7 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (sqrt (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))) (sqrt (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))))>
1545212341.365 * * * * [misc]progress:  [ 8 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212341.365 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212341.366 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212341.374 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212341.400 * * [misc]simplify:  iters left: 4 (429 enodes)
1545212341.670 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ c0 h) (* d d))))
1545212341.670 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ c0 h) (* d d)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212341.670 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212341.670 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212341.676 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212341.696 * * [misc]simplify:  iters left: 4 (302 enodes)
1545212341.970 * [exit]simplify:  Simplified to (* (* (* D D) w) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212341.970 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ c0 h) (* d d)))) (* (* (* D D) w) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212341.970 * * * * [misc]progress:  [ 9 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212341.971 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212341.971 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212341.986 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212342.036 * * [misc]simplify:  iters left: 4 (421 enodes)
1545212342.398 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (* d c0) (* w h)) d)))
1545212342.398 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (* d c0) (* w h)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212342.398 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212342.398 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212342.407 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212342.441 * * [misc]simplify:  iters left: 4 (288 enodes)
1545212342.740 * [exit]simplify:  Simplified to (* (* D D) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))
1545212342.740 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* D D)) (* (sqrt (* (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (* d c0) (* w h)) d))) (* (* D D) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212342.740 * * * * [misc]progress:  [ 10 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212342.740 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212342.741 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212342.752 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212342.788 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212343.197 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w)) (* (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ (/ (* d c0) D) (/ h d))))
1545212343.197 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w)) (* (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ (/ (* d c0) D) (/ h d)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212343.197 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212343.197 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212343.202 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212343.232 * * [misc]simplify:  iters left: 4 (295 enodes)
1545212343.476 * [exit]simplify:  Simplified to (* (* D w) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212343.476 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w)) (* (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ (/ (* d c0) D) (/ h d)))) (* (* D w) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212343.476 * * * * [misc]progress:  [ 11 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212343.476 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212343.477 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212343.484 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212343.515 * * [misc]simplify:  iters left: 4 (411 enodes)
1545212343.943 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (* (* (/ (* d c0) (* w h)) (/ d D)) (sqrt (* (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212343.944 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (* (* (/ (* d c0) (* w h)) (/ d D)) (sqrt (* (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212343.944 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212343.944 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212343.953 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212343.980 * * [misc]simplify:  iters left: 4 (280 enodes)
1545212344.230 * [exit]simplify:  Simplified to (* D (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212344.230 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (* (* (/ (* d c0) (* w h)) (/ d D)) (sqrt (* (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* D (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212344.231 * * * * [misc]progress:  [ 12 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212344.231 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212344.232 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212344.245 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212344.291 * * [misc]simplify:  iters left: 4 (440 enodes)
1545212344.713 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w)) (* (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* d (/ d D)) (/ c0 h))))
1545212344.713 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w)) (* (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* d (/ d D)) (/ c0 h)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212344.713 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212344.714 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212344.723 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212344.758 * * [misc]simplify:  iters left: 4 (295 enodes)
1545212345.027 * [exit]simplify:  Simplified to (* (* D w) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212345.027 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w)) (* (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* d (/ d D)) (/ c0 h)))) (* (* D w) (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212345.027 * * * * [misc]progress:  [ 13 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212345.027 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212345.028 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212345.035 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212345.079 * * [misc]simplify:  iters left: 4 (421 enodes)
1545212345.460 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (* (/ (/ c0 h) (* (/ D d) (/ w d))) (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212345.460 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (* (/ (/ c0 h) (* (/ D d) (/ w d))) (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212345.460 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212345.461 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212345.470 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212345.502 * * [misc]simplify:  iters left: 4 (280 enodes)
1545212345.837 * [exit]simplify:  Simplified to (* D (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212345.837 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D) (* (/ (/ c0 h) (* (/ D d) (/ w d))) (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* D (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212345.837 * * * * [misc]progress:  [ 14 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212345.837 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212345.838 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212345.853 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212345.905 * * [misc]simplify:  iters left: 4 (428 enodes)
1545212346.328 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212346.328 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212346.328 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212346.329 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212346.333 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212346.350 * * [misc]simplify:  iters left: 4 (280 enodes)
1545212346.670 * [exit]simplify:  Simplified to (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) w)
1545212346.671 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) w))))
1545212346.671 * * * * [misc]progress:  [ 15 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212346.671 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212346.672 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212346.687 * * [misc]simplify:  iters left: 5 (131 enodes)
1545212346.764 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D (* D w)))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212346.764 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D (* D w)))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212346.764 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212346.765 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212346.775 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212346.816 * * [misc]simplify:  iters left: 4 (354 enodes)
1545212347.181 * [exit]simplify:  Simplified to (* (* D (* D w)) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212347.182 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))))))
1545212347.182 * * * * [misc]progress:  [ 16 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212347.182 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212347.182 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212347.191 * * [misc]simplify:  iters left: 5 (126 enodes)
1545212347.245 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (/ (* c0 d) (* w h)) d)) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))
1545212347.245 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (/ (* c0 d) (* w h)) d)) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212347.245 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212347.246 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212347.258 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212347.298 * * [misc]simplify:  iters left: 4 (334 enodes)
1545212347.626 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212347.626 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (/ (* c0 d) (* w h)) d)) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))))))
1545212347.626 * * * * [misc]progress:  [ 17 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212347.627 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212347.627 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212347.637 * * [misc]simplify:  iters left: 5 (128 enodes)
1545212347.689 * [exit]simplify:  Simplified to (+ (* (* (* (/ d D) (* d (/ c0 h))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* D w)))
1545212347.689 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ d D) (* d (/ c0 h))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* D w))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212347.689 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212347.690 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212347.695 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212347.715 * * [misc]simplify:  iters left: 4 (341 enodes)
1545212348.053 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* w (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212348.053 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ d D) (* d (/ c0 h))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* D w))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* w (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))))))
1545212348.053 * * * * [misc]progress:  [ 18 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212348.053 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212348.057 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212348.066 * * [misc]simplify:  iters left: 5 (123 enodes)
1545212348.122 * * [misc]simplify:  iters left: 4 (493 enodes)
1545212348.618 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 w) h) (* d (/ d D))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D))
1545212348.618 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 w) h) (* d (/ d D))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212348.618 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212348.618 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212348.624 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212348.664 * * [misc]simplify:  iters left: 4 (324 enodes)
1545212349.054 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212349.054 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212349.054 * * * * [misc]progress:  [ 19 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212349.054 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212349.055 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212349.069 * * [misc]simplify:  iters left: 5 (128 enodes)
1545212349.116 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* d (* (/ c0 h) (/ d D))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D w)))
1545212349.116 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* d (* (/ c0 h) (/ d D))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D w))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212349.117 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212349.118 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212349.129 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212349.159 * * [misc]simplify:  iters left: 4 (341 enodes)
1545212349.472 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* w (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212349.472 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* d (* (/ c0 h) (/ d D))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D w))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* w (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))))))
1545212349.472 * * * * [misc]progress:  [ 20 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212349.472 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212349.473 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212349.482 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212349.513 * * [misc]simplify:  iters left: 4 (496 enodes)
1545212350.091 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (/ c0 (* w h))) (* (/ (* d d) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) D))
1545212350.091 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (/ c0 (* w h))) (* (/ (* d d) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212350.091 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212350.092 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212350.100 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212350.129 * * [misc]simplify:  iters left: 4 (324 enodes)
1545212350.469 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212350.469 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212350.469 * * * * [misc]progress:  [ 21 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212350.470 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212350.470 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212350.482 * * [misc]simplify:  iters left: 5 (125 enodes)
1545212350.569 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) w)))
1545212350.569 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) w))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212350.569 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212350.570 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212350.582 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212350.610 * * [misc]simplify:  iters left: 4 (324 enodes)
1545212350.931 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) w)
1545212350.931 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) w))))
1545212350.931 * * * * [misc]progress:  [ 22 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212350.932 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212350.933 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212350.950 * * [misc]simplify:  iters left: 5 (133 enodes)
1545212351.004 * [exit]simplify:  Simplified to (+ (* (* (* w (* D D)) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* d d) (/ c0 h)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212351.004 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* w (* D D)) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* d d) (/ c0 h)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212351.005 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212351.005 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212351.017 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212351.043 * * [misc]simplify:  iters left: 4 (383 enodes)
1545212351.407 * [exit]simplify:  Simplified to (* (* D (* D w)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212351.408 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* D (* D w)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))))))
1545212351.408 * * * * [misc]progress:  [ 23 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212351.408 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212351.409 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212351.427 * * [misc]simplify:  iters left: 5 (128 enodes)
1545212351.513 * [exit]simplify:  Simplified to (+ (* (* (/ (* (/ c0 h) (* d d)) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D D)))
1545212351.514 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (/ c0 h) (* d d)) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D D))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212351.514 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212351.515 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212351.526 * * [misc]simplify:  iters left: 5 (83 enodes)
1545212351.555 * * [misc]simplify:  iters left: 4 (363 enodes)
1545212351.994 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) D))
1545212351.994 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (/ c0 h) (* d d)) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D D))) (* (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) D)))))
1545212351.994 * * * * [misc]progress:  [ 24 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212351.995 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212351.996 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212352.011 * * [misc]simplify:  iters left: 5 (130 enodes)
1545212352.095 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ d D) (* d (/ c0 h))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D w)))
1545212352.095 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ d D) (* d (/ c0 h))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D w))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212352.095 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212352.096 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212352.107 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212352.149 * * [misc]simplify:  iters left: 4 (370 enodes)
1545212352.590 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))))))))
1545212352.590 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ d D) (* d (/ c0 h))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D w))) (* (* D (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))))))))
1545212352.590 * * * * [misc]progress:  [ 25 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212352.591 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212352.591 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212352.608 * * [misc]simplify:  iters left: 5 (125 enodes)
1545212352.690 * [exit]simplify:  Simplified to (+ (* (* (* (/ d D) (/ (* c0 d) (* w h))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) D))
1545212352.691 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ d D) (/ (* c0 d) (* w h))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212352.691 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212352.692 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212352.702 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212352.743 * * [misc]simplify:  iters left: 4 (353 enodes)
1545212353.182 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212353.182 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212353.182 * * * * [misc]progress:  [ 26 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212353.183 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212353.184 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212353.201 * * [misc]simplify:  iters left: 5 (130 enodes)
1545212353.249 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ c0 (/ h d)) (/ d D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* D w))))
1545212353.249 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ c0 (/ h d)) (/ d D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* D w)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212353.249 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212353.249 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212353.255 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212353.292 * * [misc]simplify:  iters left: 4 (370 enodes)
1545212354.095 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))))))))
1545212354.095 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ c0 (/ h d)) (/ d D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* D w)))) (* (* D (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))))))))
1545212354.095 * * * * [misc]progress:  [ 27 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212354.095 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212354.096 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212354.105 * * [misc]simplify:  iters left: 5 (126 enodes)
1545212354.161 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (/ d D) (/ (/ c0 h) (/ w d))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) D)))
1545212354.161 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (/ d D) (/ (/ c0 h) (/ w d))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) D))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212354.161 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212354.161 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212354.167 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212354.190 * * [misc]simplify:  iters left: 4 (353 enodes)
1545212354.577 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212354.577 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212354.577 * * * * [misc]progress:  [ 28 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212354.578 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212354.578 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212354.595 * * [misc]simplify:  iters left: 5 (127 enodes)
1545212354.661 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* w (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))))
1545212354.662 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* w (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212354.662 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212354.663 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212354.672 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212354.708 * * [misc]simplify:  iters left: 4 (353 enodes)
1545212355.178 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) w)
1545212355.178 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) w))))
1545212355.178 * * * * [misc]progress:  [ 29 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212355.179 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212355.179 * * [misc]simplify:  iters left: 6 (49 enodes)
1545212355.198 * * [misc]simplify:  iters left: 5 (137 enodes)
1545212355.268 * [exit]simplify:  Simplified to (+ (* (* (* (* D w) D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))))
1545212355.268 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* D w) D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212355.268 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212355.269 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212355.282 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212355.330 * * [misc]simplify:  iters left: 4 (359 enodes)
1545212355.703 * [exit]simplify:  Simplified to (* (* (* w (* D D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212355.703 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* D w) D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))) (* (* (* w (* D D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212355.703 * * * * [misc]progress:  [ 30 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212355.704 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212355.704 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212355.716 * * [misc]simplify:  iters left: 5 (132 enodes)
1545212355.778 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* (/ c0 h) (* d d)) w))) (* (* (* D D) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))
1545212355.778 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* (/ c0 h) (* d d)) w))) (* (* (* D D) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212355.779 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212355.779 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212355.790 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212355.815 * * [misc]simplify:  iters left: 4 (335 enodes)
1545212356.185 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212356.185 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212356.185 * * * * [misc]progress:  [ 31 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212356.186 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212356.186 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212356.206 * * [misc]simplify:  iters left: 5 (134 enodes)
1545212356.295 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* d (* (/ c0 h) (/ d D))))) (* (* (* D w) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))))
1545212356.295 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* d (* (/ c0 h) (/ d D))))) (* (* (* D w) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212356.296 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212356.296 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212356.304 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212356.325 * * [misc]simplify:  iters left: 4 (342 enodes)
1545212356.610 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212356.611 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212356.611 * * * * [misc]progress:  [ 32 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212356.611 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212356.612 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212356.629 * * [misc]simplify:  iters left: 5 (129 enodes)
1545212356.678 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) D)) (* (* (* (/ d D) (/ (* c0 d) (* w h))) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))))
1545212356.678 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) D)) (* (* (* (/ d D) (/ (* c0 d) (* w h))) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212356.679 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212356.679 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212356.690 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212356.715 * * [misc]simplify:  iters left: 4 (329 enodes)
1545212357.094 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))
1545212357.094 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))))))
1545212357.094 * * * * [misc]progress:  [ 33 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212357.094 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212357.095 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212357.104 * * [misc]simplify:  iters left: 5 (134 enodes)
1545212357.190 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* d (/ c0 h)) (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D w))))
1545212357.190 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* d (/ c0 h)) (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D w)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212357.191 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212357.191 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212357.204 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212357.244 * * [misc]simplify:  iters left: 4 (342 enodes)
1545212357.631 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212357.632 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212357.632 * * * * [misc]progress:  [ 34 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212357.632 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212357.633 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212357.652 * * [misc]simplify:  iters left: 5 (130 enodes)
1545212357.709 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (/ (/ (/ c0 h) (/ w d)) (/ D d)) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212357.709 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (/ (/ (/ c0 h) (/ w d)) (/ D d)) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212357.709 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212357.710 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212357.722 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212357.761 * * [misc]simplify:  iters left: 4 (329 enodes)
1545212358.053 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))
1545212358.053 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))))))
1545212358.054 * * * * [misc]progress:  [ 35 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212358.054 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212358.054 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212358.063 * * [misc]simplify:  iters left: 5 (131 enodes)
1545212358.108 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))))
1545212358.108 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212358.108 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212358.109 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212358.115 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212358.150 * * [misc]simplify:  iters left: 4 (329 enodes)
1545212358.526 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))
1545212358.526 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))))))
1545212358.526 * * * * [misc]progress:  [ 36 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212358.527 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212358.527 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212358.546 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212358.604 * * [misc]simplify:  iters left: 4 (458 enodes)
1545212358.968 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))))
1545212358.968 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212358.969 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212358.969 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212358.980 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212359.022 * * [misc]simplify:  iters left: 4 (316 enodes)
1545212359.342 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))) (* w (* D D))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212359.342 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))) (* w (* D D))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212359.342 * * * * [misc]progress:  [ 37 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212359.343 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212359.344 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212359.359 * * [misc]simplify:  iters left: 5 (114 enodes)
1545212359.407 * * [misc]simplify:  iters left: 4 (456 enodes)
1545212359.749 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* d d) (/ c0 (* w h))) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212359.749 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* d d) (/ c0 (* w h))) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212359.750 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212359.750 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212359.755 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212359.772 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212360.000 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212360.000 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212360.001 * * * * [misc]progress:  [ 38 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212360.001 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212360.001 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212360.010 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212360.045 * * [misc]simplify:  iters left: 4 (467 enodes)
1545212360.471 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* d (/ c0 h)) (/ D d)) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212360.471 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* d (/ c0 h)) (/ D d)) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212360.471 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212360.471 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212360.476 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212360.500 * * [misc]simplify:  iters left: 4 (299 enodes)
1545212360.772 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212360.772 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212360.772 * * * * [misc]progress:  [ 39 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212360.772 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212360.773 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212360.790 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212360.841 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212361.320 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212361.320 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212361.320 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212361.321 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212361.331 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212361.364 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212361.680 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212361.680 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212361.681 * * * * [misc]progress:  [ 40 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212361.681 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212361.682 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212361.703 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212361.746 * * [misc]simplify:  iters left: 4 (475 enodes)
1545212362.201 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* (/ c0 h) (* d d)) D) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212362.201 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* (/ c0 h) (* d d)) D) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212362.202 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212362.202 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212362.212 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212362.265 * * [misc]simplify:  iters left: 4 (299 enodes)
1545212362.528 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212362.528 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212362.529 * * * * [misc]progress:  [ 41 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212362.529 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212362.530 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212362.546 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212362.604 * * [misc]simplify:  iters left: 4 (448 enodes)
1545212363.050 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ D (* (* d d) (/ (/ c0 w) h))))))
1545212363.050 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ D (* (* d d) (/ (/ c0 w) h)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212363.050 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212363.050 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212363.056 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212363.074 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212363.352 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212363.352 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212363.352 * * * * [misc]progress:  [ 42 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212363.353 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212363.353 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212363.364 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212363.400 * * [misc]simplify:  iters left: 4 (455 enodes)
1545212363.865 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212363.865 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212363.865 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212363.865 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212363.871 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212363.888 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212364.084 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212364.084 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212364.085 * * * * [misc]progress:  [ 43 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212364.085 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212364.086 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212364.099 * * [misc]simplify:  iters left: 5 (123 enodes)
1545212364.129 * * [misc]simplify:  iters left: 4 (476 enodes)
1545212364.422 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))
1545212364.422 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212364.422 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212364.423 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212364.429 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212364.448 * * [misc]simplify:  iters left: 4 (310 enodes)
1545212364.698 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D D) w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212364.698 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D D) w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212364.698 * * * * [misc]progress:  [ 44 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212364.698 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212364.699 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212364.707 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212364.739 * * [misc]simplify:  iters left: 4 (457 enodes)
1545212365.093 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))) (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) D)))
1545212365.093 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))) (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) D))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212365.094 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212365.094 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212365.105 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212365.144 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212365.417 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212365.417 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212365.417 * * * * [misc]progress:  [ 45 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212365.417 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212365.418 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212365.428 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212365.464 * * [misc]simplify:  iters left: 4 (472 enodes)
1545212365.929 * [exit]simplify:  Simplified to (+ (* (* (* (* (/ c0 h) (/ d D)) d) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) D) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)))
1545212365.929 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* (/ c0 h) (/ d D)) d) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) D) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212365.929 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212365.930 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212365.941 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212365.968 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212366.220 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212366.220 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212366.221 * * * * [misc]progress:  [ 46 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212366.221 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212366.222 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212366.243 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212366.276 * * [misc]simplify:  iters left: 4 (462 enodes)
1545212366.764 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* (/ (* (/ c0 h) (/ d w)) (/ D d)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212366.764 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* (/ (* (/ c0 h) (/ d w)) (/ D d)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212366.764 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212366.764 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212366.770 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212366.787 * * [misc]simplify:  iters left: 4 (278 enodes)
1545212367.069 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212367.069 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212367.069 * * * * [misc]progress:  [ 47 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212367.069 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212367.070 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212367.087 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212367.120 * * [misc]simplify:  iters left: 4 (476 enodes)
1545212367.515 * [exit]simplify:  Simplified to (+ (* (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* w (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))))))
1545212367.516 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* w (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212367.516 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212367.516 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212367.521 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212367.553 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212367.841 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212367.841 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212367.841 * * * * [misc]progress:  [ 48 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212367.841 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212367.842 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212367.851 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212367.882 * * [misc]simplify:  iters left: 4 (464 enodes)
1545212368.322 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (* d (/ d D)) (/ (/ c0 w) h)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212368.322 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (* d (/ d D)) (/ (/ c0 w) h)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212368.322 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212368.323 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212368.333 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212368.361 * * [misc]simplify:  iters left: 4 (278 enodes)
1545212368.647 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212368.647 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212368.647 * * * * [misc]progress:  [ 49 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212368.648 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212368.648 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212368.665 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212368.703 * * [misc]simplify:  iters left: 4 (473 enodes)
1545212369.197 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212369.197 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212369.197 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212369.198 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212369.204 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212369.232 * * [misc]simplify:  iters left: 4 (278 enodes)
1545212369.561 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212369.561 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212369.562 * * * * [misc]progress:  [ 50 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))>
1545212369.562 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d)))
1545212369.563 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212369.580 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212369.626 * * [misc]simplify:  iters left: 4 (460 enodes)
1545212370.068 * [exit]simplify:  Simplified to (+ (* (* (/ (* d c0) (/ h d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))))
1545212370.068 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* d c0) (/ h d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))
1545212370.069 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D))
1545212370.069 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212370.079 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212370.110 * * [misc]simplify:  iters left: 4 (316 enodes)
1545212370.413 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* w (* D D))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212370.413 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* w (* D D))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212370.413 * * * * [misc]progress:  [ 51 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))>
1545212370.413 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212370.414 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212370.422 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212370.460 * * [misc]simplify:  iters left: 4 (458 enodes)
1545212371.398 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* d d) (/ (/ c0 w) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212371.398 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* d d) (/ (/ c0 w) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))
1545212371.399 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D))
1545212371.399 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212371.406 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212371.425 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212371.737 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212371.737 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212371.737 * * * * [misc]progress:  [ 52 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212371.737 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212371.738 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212371.746 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212371.778 * * [misc]simplify:  iters left: 4 (469 enodes)
1545212372.272 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* d (/ c0 h)) (/ D d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212372.272 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* d (/ c0 h)) (/ D d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212372.273 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212372.273 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212372.289 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212372.325 * * [misc]simplify:  iters left: 4 (299 enodes)
1545212372.590 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212372.590 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212372.590 * * * * [misc]progress:  [ 53 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212372.591 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212372.591 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212372.599 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212372.648 * * [misc]simplify:  iters left: 4 (444 enodes)
1545212373.064 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212373.064 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212373.064 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212373.065 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212373.075 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212373.097 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212373.388 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212373.388 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212373.388 * * * * [misc]progress:  [ 54 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212373.388 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D))))
1545212373.389 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212373.397 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212373.430 * * [misc]simplify:  iters left: 4 (477 enodes)
1545212373.841 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D w) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* (* d d) (/ c0 h)) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212373.841 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D w) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* (* d d) (/ c0 h)) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212373.842 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212373.842 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212373.850 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212373.867 * * [misc]simplify:  iters left: 4 (299 enodes)
1545212374.102 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212374.102 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212374.102 * * * * [misc]progress:  [ 55 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212374.103 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212374.103 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212374.124 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212374.166 * * [misc]simplify:  iters left: 4 (450 enodes)
1545212374.633 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ D (* (* d d) (/ (/ c0 w) h))))))
1545212374.633 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ D (* (* d d) (/ (/ c0 w) h)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212374.634 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212374.634 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212374.640 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212374.660 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212374.908 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212374.909 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212374.909 * * * * [misc]progress:  [ 56 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))>
1545212374.909 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212374.909 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212374.917 * * [misc]simplify:  iters left: 5 (114 enodes)
1545212374.946 * * [misc]simplify:  iters left: 4 (457 enodes)
1545212375.362 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212375.362 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))
1545212375.362 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w)
1545212375.363 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212375.373 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212375.405 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212375.629 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212375.629 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212375.629 * * * * [misc]progress:  [ 57 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))>
1545212375.630 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d)))
1545212375.631 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212375.649 * * [misc]simplify:  iters left: 5 (127 enodes)
1545212375.734 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212375.734 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))
1545212375.735 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D))
1545212375.735 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212375.743 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212375.762 * * [misc]simplify:  iters left: 4 (329 enodes)
1545212376.003 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (* D D) w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))
1545212376.003 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (* D D) w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))))))
1545212376.003 * * * * [misc]progress:  [ 58 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212376.003 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212376.004 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212376.018 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212376.054 * * [misc]simplify:  iters left: 4 (486 enodes)
1545212376.591 * [exit]simplify:  Simplified to (+ (* (* (/ (* (* d d) (/ c0 w)) h) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))) (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)))
1545212376.592 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (* d d) (/ c0 w)) h) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))) (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212376.592 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212376.592 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212376.597 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212376.614 * * [misc]simplify:  iters left: 4 (303 enodes)
1545212376.928 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212376.928 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212376.928 * * * * [misc]progress:  [ 59 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212376.928 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212376.929 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212376.947 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212376.996 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) (/ D d)) d) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* D w) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212376.996 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) (/ D d)) d) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* D w) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212376.996 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212376.997 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212377.007 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212377.026 * * [misc]simplify:  iters left: 4 (310 enodes)
1545212377.296 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))
1545212377.296 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))))))
1545212377.296 * * * * [misc]progress:  [ 60 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212377.296 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212377.297 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212377.305 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212377.353 * * [misc]simplify:  iters left: 4 (491 enodes)
1545212377.800 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (* (/ (/ (/ c0 h) (/ w d)) (/ D d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212377.800 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (* (/ (/ (/ c0 h) (/ w d)) (/ D d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212377.800 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212377.801 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212377.806 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212377.836 * * [misc]simplify:  iters left: 4 (297 enodes)
1545212378.112 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212378.112 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212378.113 * * * * [misc]progress:  [ 61 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212378.113 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D))))
1545212378.114 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212378.132 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212378.217 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (/ (* (* d c0) (/ d D)) h) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* D w) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))))
1545212378.217 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (/ (* (* d c0) (/ d D)) h) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* D w) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212378.218 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212378.218 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212378.230 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212378.267 * * [misc]simplify:  iters left: 4 (310 enodes)
1545212378.578 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))
1545212378.578 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))))))
1545212378.578 * * * * [misc]progress:  [ 62 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212378.579 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212378.579 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212378.588 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212378.626 * * [misc]simplify:  iters left: 4 (493 enodes)
1545212379.105 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (/ (* d d) D)))))
1545212379.105 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (/ (* d d) D))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212379.106 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212379.106 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212379.116 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212379.150 * * [misc]simplify:  iters left: 4 (297 enodes)
1545212379.453 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212379.453 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212379.453 * * * * [misc]progress:  [ 63 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212379.453 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212379.454 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212379.471 * * [misc]simplify:  iters left: 5 (121 enodes)
1545212379.520 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212379.520 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212379.520 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212379.521 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212379.526 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212379.555 * * [misc]simplify:  iters left: 4 (297 enodes)
1545212379.833 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212379.833 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) w) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212379.833 * * * * [misc]progress:  [ 64 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212379.834 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212379.835 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212379.853 * * [misc]simplify:  iters left: 5 (131 enodes)
1545212379.924 * [exit]simplify:  Simplified to (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))))))
1545212379.924 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212379.925 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212379.925 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212379.934 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212379.979 * * [misc]simplify:  iters left: 4 (354 enodes)
1545212380.419 * [exit]simplify:  Simplified to (* (* D (* D w)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212380.419 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* D (* D w)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))))))
1545212380.419 * * * * [misc]progress:  [ 65 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212380.420 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212380.421 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212380.438 * * [misc]simplify:  iters left: 5 (126 enodes)
1545212380.505 * [exit]simplify:  Simplified to (+ (* (* (* (/ (* c0 d) (* w h)) d) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212380.505 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (* c0 d) (* w h)) d) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212380.505 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212380.505 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212380.515 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212380.550 * * [misc]simplify:  iters left: 4 (334 enodes)
1545212380.954 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212380.954 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (* c0 d) (* w h)) d) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (* (* D D) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212380.954 * * * * [misc]progress:  [ 66 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212380.954 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212380.955 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212380.963 * * [misc]simplify:  iters left: 5 (128 enodes)
1545212381.041 * [exit]simplify:  Simplified to (+ (* (* (* (/ d D) (* d (/ c0 h))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))))
1545212381.041 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ d D) (* d (/ c0 h))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212381.042 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212381.042 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212381.053 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212381.094 * * [misc]simplify:  iters left: 4 (341 enodes)
1545212381.481 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212381.481 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ d D) (* d (/ c0 h))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))))) (* (* (* D w) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212381.482 * * * * [misc]progress:  [ 67 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212381.482 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212381.483 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212381.500 * * [misc]simplify:  iters left: 5 (123 enodes)
1545212381.561 * * [misc]simplify:  iters left: 4 (493 enodes)
1545212382.084 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 w) h) (* d (/ d D))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))))
1545212382.084 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 w) h) (* d (/ d D))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212382.084 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212382.085 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212382.095 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212382.134 * * [misc]simplify:  iters left: 4 (324 enodes)
1545212382.438 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212382.438 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212382.438 * * * * [misc]progress:  [ 68 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212382.439 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212382.439 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212382.453 * * [misc]simplify:  iters left: 5 (128 enodes)
1545212382.517 * [exit]simplify:  Simplified to (+ (* (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))))
1545212382.517 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212382.518 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212382.518 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212382.530 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212382.568 * * [misc]simplify:  iters left: 4 (341 enodes)
1545212382.896 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212382.896 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))) (sqrt (sqrt (* (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))) (* (* (* D w) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212382.896 * * * * [misc]progress:  [ 69 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212382.896 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212382.897 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212382.906 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212382.936 * * [misc]simplify:  iters left: 4 (496 enodes)
1545212383.436 * [exit]simplify:  Simplified to (+ (* (* (/ d D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (/ (* d c0) (* w h)))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) D))
1545212383.436 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ d D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (/ (* d c0) (* w h)))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212383.437 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212383.437 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212383.442 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212383.461 * * [misc]simplify:  iters left: 4 (324 enodes)
1545212383.802 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212383.802 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212383.802 * * * * [misc]progress:  [ 70 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212383.803 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212383.803 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212383.821 * * [misc]simplify:  iters left: 5 (125 enodes)
1545212383.907 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) w)))
1545212383.907 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) w))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212383.908 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212383.908 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212383.920 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212383.960 * * [misc]simplify:  iters left: 4 (324 enodes)
1545212384.316 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) w)
1545212384.316 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) w))))
1545212384.317 * * * * [misc]progress:  [ 71 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212384.317 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212384.318 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212384.332 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212384.356 * * [misc]simplify:  iters left: 4 (397 enodes)
1545212384.700 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (/ (* d c0) (/ h d)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))
1545212384.700 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (/ (* d c0) (/ h d)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212384.700 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212384.701 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212384.710 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212384.731 * * [misc]simplify:  iters left: 4 (261 enodes)
1545212384.911 * [exit]simplify:  Simplified to (* (* (* D D) w) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))
1545212384.911 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (/ (* d c0) (/ h d)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (* D D) w) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212384.911 * * * * [misc]progress:  [ 72 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212384.912 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212384.912 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212384.926 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212384.959 * * [misc]simplify:  iters left: 4 (381 enodes)
1545212385.241 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (/ c0 h) (/ w (* d d)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D)))
1545212385.241 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (/ c0 h) (/ w (* d d)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212385.242 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212385.242 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212385.251 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212385.266 * * [misc]simplify:  iters left: 4 (245 enodes)
1545212385.438 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D))
1545212385.438 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (/ c0 h) (/ w (* d d)))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)))))
1545212385.438 * * * * [misc]progress:  [ 73 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212385.438 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212385.439 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212385.446 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212385.473 * * [misc]simplify:  iters left: 4 (398 enodes)
1545212385.854 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (* d (/ c0 h)) (/ d D))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w)))
1545212385.854 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (* d (/ c0 h)) (/ d D))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212385.854 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212385.855 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212385.863 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212385.894 * * [misc]simplify:  iters left: 4 (252 enodes)
1545212386.073 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w))
1545212386.073 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (* d (/ c0 h)) (/ d D))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)))))
1545212386.073 * * * * [misc]progress:  [ 74 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212386.074 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212386.075 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212386.088 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212386.125 * * [misc]simplify:  iters left: 4 (386 enodes)
1545212386.555 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D) (* (/ (* d (/ c0 h)) (* (/ w d) D)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))
1545212386.555 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D) (* (/ (* d (/ c0 h)) (* (/ w d) D)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212386.556 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212386.556 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212386.564 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212386.591 * * [misc]simplify:  iters left: 4 (237 enodes)
1545212386.829 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D)
1545212386.829 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D) (* (/ (* d (/ c0 h)) (* (/ w d) D)) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D))))
1545212386.829 * * * * [misc]progress:  [ 75 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212386.830 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212386.830 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212386.844 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212386.893 * * [misc]simplify:  iters left: 4 (402 enodes)
1545212387.265 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (/ (* d c0) h) (/ D d))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))
1545212387.265 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (/ (* d c0) h) (/ D d))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212387.266 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212387.266 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212387.278 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212387.303 * * [misc]simplify:  iters left: 4 (252 enodes)
1545212387.474 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w))
1545212387.474 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (/ (* d c0) h) (/ D d))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)))))
1545212387.474 * * * * [misc]progress:  [ 76 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212387.474 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212387.474 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212387.481 * * [misc]simplify:  iters left: 5 (96 enodes)
1545212387.519 * * [misc]simplify:  iters left: 4 (391 enodes)
1545212387.859 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D) (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ D (* (* d d) (/ (/ c0 w) h)))))
1545212387.859 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D) (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ D (* (* d d) (/ (/ c0 w) h))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212387.860 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212387.860 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212387.864 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212388.257 * * [misc]simplify:  iters left: 4 (237 enodes)
1545212388.467 * [exit]simplify:  Simplified to (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D)
1545212388.467 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D) (/ (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ D (* (* d d) (/ (/ c0 w) h))))) (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D))))
1545212388.467 * * * * [misc]progress:  [ 77 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212388.468 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212388.468 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212388.482 * * [misc]simplify:  iters left: 5 (97 enodes)
1545212388.527 * * [misc]simplify:  iters left: 4 (394 enodes)
1545212388.937 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))
1545212388.937 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212388.937 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212388.937 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212388.941 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212388.955 * * [misc]simplify:  iters left: 4 (237 enodes)
1545212389.146 * [exit]simplify:  Simplified to (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212389.146 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212389.146 * * * * [misc]progress:  [ 78 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212389.146 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212389.147 * * [misc]simplify:  iters left: 6 (49 enodes)
1545212389.164 * * [misc]simplify:  iters left: 5 (138 enodes)
1545212389.255 * [exit]simplify:  Simplified to (+ (* (* (* D D) w) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* M M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212389.255 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* M M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212389.256 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212389.256 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212389.268 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212389.313 * * [misc]simplify:  iters left: 4 (367 enodes)
1545212389.727 * [exit]simplify:  Simplified to (* (* (* (* D D) w) (sqrt (sqrt (* (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212389.727 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* M M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (* D D) w) (sqrt (sqrt (* (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212389.727 * * * * [misc]progress:  [ 79 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212389.728 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212389.729 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212389.752 * * [misc]simplify:  iters left: 5 (133 enodes)
1545212389.838 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (/ (/ c0 w) h) (* d d)))) (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))))
1545212389.839 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (/ (/ c0 w) h) (* d d)))) (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212389.839 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212389.840 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212389.851 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212389.884 * * [misc]simplify:  iters left: 4 (343 enodes)
1545212390.200 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212390.200 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212390.200 * * * * [misc]progress:  [ 80 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212390.201 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212390.202 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212390.220 * * [misc]simplify:  iters left: 5 (135 enodes)
1545212390.303 * [exit]simplify:  Simplified to (+ (* (* d (* (/ c0 h) (/ d D))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))))
1545212390.303 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (* (/ c0 h) (/ d D))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212390.304 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212390.304 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212390.310 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212390.338 * * [misc]simplify:  iters left: 4 (350 enodes)
1545212390.653 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212390.653 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212390.654 * * * * [misc]progress:  [ 81 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212390.654 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212390.654 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212390.663 * * [misc]simplify:  iters left: 5 (130 enodes)
1545212390.706 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* (/ d D) (/ (* c0 d) (* w h))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212390.706 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* (/ d D) (/ (* c0 d) (* w h))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212390.706 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212390.706 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212390.712 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212390.738 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212391.060 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212391.060 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212391.060 * * * * [misc]progress:  [ 82 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212391.061 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212391.061 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212391.070 * * [misc]simplify:  iters left: 5 (135 enodes)
1545212391.123 * [exit]simplify:  Simplified to (+ (* (* (* (* d (/ c0 h)) (/ d D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w))))
1545212391.123 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* d (/ c0 h)) (/ d D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212391.123 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212391.123 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212391.130 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212391.166 * * [misc]simplify:  iters left: 4 (350 enodes)
1545212391.486 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212391.486 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212391.486 * * * * [misc]progress:  [ 83 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212391.486 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212391.487 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212391.505 * * [misc]simplify:  iters left: 5 (131 enodes)
1545212391.593 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (* (* (* (/ (/ c0 w) h) (* d (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212391.593 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (* (* (* (/ (/ c0 w) h) (* d (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212391.594 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212391.594 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212391.605 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212391.645 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212391.939 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212391.939 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212391.939 * * * * [misc]progress:  [ 84 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212391.939 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212391.940 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212391.950 * * [misc]simplify:  iters left: 5 (132 enodes)
1545212392.009 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212392.009 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212392.009 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212392.010 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212392.015 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212392.036 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212392.364 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212392.364 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212392.364 * * * * [misc]progress:  [ 85 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212392.364 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212392.365 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212392.373 * * [misc]simplify:  iters left: 5 (125 enodes)
1545212392.445 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* w (* D D)))))
1545212392.445 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* w (* D D))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212392.446 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212392.446 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212392.451 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212392.473 * * [misc]simplify:  iters left: 4 (324 enodes)
1545212392.804 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) w)))
1545212392.804 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) w))))))
1545212392.804 * * * * [misc]progress:  [ 86 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212392.805 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212392.805 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212392.822 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212392.862 * * [misc]simplify:  iters left: 4 (487 enodes)
1545212393.363 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D)) (* (* (/ (* c0 (* d d)) (* w h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212393.364 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D)) (* (* (/ (* c0 (* d d)) (* w h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212393.364 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212393.364 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212393.370 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212393.410 * * [misc]simplify:  iters left: 4 (302 enodes)
1545212393.671 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212393.671 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212393.672 * * * * [misc]progress:  [ 87 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212393.672 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212393.672 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212393.680 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212393.724 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w))) (* (* (* (/ c0 h) (* d (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212393.724 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w))) (* (* (* (/ c0 h) (* d (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212393.724 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212393.724 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212393.731 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212393.766 * * [misc]simplify:  iters left: 4 (309 enodes)
1545212394.072 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212394.072 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212394.072 * * * * [misc]progress:  [ 88 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212394.072 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212394.072 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212394.081 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212394.112 * * [misc]simplify:  iters left: 4 (487 enodes)
1545212394.606 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) D) (* (* (* (/ d D) (/ (* d c0) (* w h))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212394.606 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) D) (* (* (* (/ d D) (/ (* d c0) (* w h))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212394.607 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212394.607 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212394.616 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212394.650 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212394.936 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212394.936 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212394.936 * * * * [misc]progress:  [ 89 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212394.936 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212394.937 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212394.945 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212395.000 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w))) (* (* (* d (* (/ c0 h) (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212395.000 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w))) (* (* (* d (* (/ c0 h) (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212395.001 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212395.001 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212395.011 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212395.045 * * [misc]simplify:  iters left: 4 (309 enodes)
1545212395.265 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212395.265 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212395.265 * * * * [misc]progress:  [ 90 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212395.265 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212395.265 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212395.274 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212395.303 * * [misc]simplify:  iters left: 4 (491 enodes)
1545212395.714 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) D) (* (/ (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (/ D (* (/ (/ c0 w) h) (* d d)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212395.714 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) D) (* (/ (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (/ D (* (/ (/ c0 w) h) (* d d)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212395.715 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212395.715 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212395.724 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212395.753 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212396.008 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212396.008 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212396.008 * * * * [misc]progress:  [ 91 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212396.008 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212396.008 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212396.022 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212396.055 * * [misc]simplify:  iters left: 4 (498 enodes)
1545212396.551 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212396.551 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212396.551 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212396.551 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212396.556 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212396.580 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212396.851 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w))
1545212396.851 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w)))))
1545212396.851 * * * * [misc]progress:  [ 92 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212396.852 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212396.852 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212396.862 * * [misc]simplify:  iters left: 5 (123 enodes)
1545212396.897 * * [misc]simplify:  iters left: 4 (466 enodes)
1545212397.314 * [exit]simplify:  Simplified to (+ (* (* (* (* D w) D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212397.314 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* D w) D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212397.315 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212397.315 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212397.321 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212397.363 * * [misc]simplify:  iters left: 4 (302 enodes)
1545212397.610 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) w)))
1545212397.611 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) w))))))
1545212397.611 * * * * [misc]progress:  [ 93 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212397.611 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212397.611 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212397.620 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212397.672 * * [misc]simplify:  iters left: 4 (446 enodes)
1545212398.090 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) (* D D)) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))))
1545212398.090 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) (* D D)) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212398.090 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212398.091 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212398.101 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212398.133 * * [misc]simplify:  iters left: 4 (276 enodes)
1545212398.359 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212398.359 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212398.359 * * * * [misc]progress:  [ 94 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212398.360 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212398.360 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212398.378 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212398.408 * * [misc]simplify:  iters left: 4 (463 enodes)
1545212398.762 * [exit]simplify:  Simplified to (+ (* (* (/ (* (/ c0 h) (* d d)) D) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) D) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))))))
1545212398.762 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (/ c0 h) (* d d)) D) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) D) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212398.763 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212398.763 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212398.774 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212398.798 * * [misc]simplify:  iters left: 4 (283 enodes)
1545212399.063 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212399.063 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212399.063 * * * * [misc]progress:  [ 95 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212399.064 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212399.064 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212399.074 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212399.103 * * [misc]simplify:  iters left: 4 (452 enodes)
1545212399.508 * [exit]simplify:  Simplified to (+ (* D (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212399.508 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212399.508 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212399.509 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212399.519 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212399.551 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212399.740 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212399.740 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212399.743 * * * * [misc]progress:  [ 96 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212399.743 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212399.744 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212399.752 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212399.781 * * [misc]simplify:  iters left: 4 (465 enodes)
1545212400.155 * [exit]simplify:  Simplified to (+ (* (/ (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ D (/ (* d c0) (/ h d)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) (* D w))))
1545212400.155 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ D (/ (* d c0) (/ h d)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) (* D w)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212400.156 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212400.156 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212400.161 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212400.180 * * [misc]simplify:  iters left: 4 (283 enodes)
1545212400.425 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212400.425 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212400.425 * * * * [misc]progress:  [ 97 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212400.425 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212400.426 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212400.437 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212400.479 * * [misc]simplify:  iters left: 4 (454 enodes)
1545212400.857 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) D)) (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (/ c0 w) h) (* d (/ d D)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212400.857 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) D)) (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (/ c0 w) h) (* d (/ d D)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212400.857 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212400.858 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212400.863 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212400.879 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212401.110 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212401.110 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212401.110 * * * * [misc]progress:  [ 98 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212401.110 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212401.111 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212401.122 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212401.152 * * [misc]simplify:  iters left: 4 (463 enodes)
1545212401.604 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212401.604 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212401.604 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212401.605 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212401.615 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212401.634 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212401.849 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212401.849 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212401.850 * * * * [misc]progress:  [ 99 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212401.850 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212401.850 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212401.858 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212401.897 * * [misc]simplify:  iters left: 4 (424 enodes)
1545212402.232 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D D) w)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))))
1545212402.232 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D D) w)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212402.232 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212402.232 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212402.237 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212402.262 * * [misc]simplify:  iters left: 4 (273 enodes)
1545212402.513 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (* D D) w)))
1545212402.513 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (* D D) w))))))
1545212402.513 * * * * [misc]progress:  [ 100 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212402.513 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212402.513 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212402.522 * * [misc]simplify:  iters left: 5 (106 enodes)
1545212402.552 * * [misc]simplify:  iters left: 4 (416 enodes)
1545212402.906 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ c0 (/ (* w h) (* d d)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))))
1545212402.906 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ c0 (/ (* w h) (* d d)))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212402.907 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212402.907 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212402.916 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212402.945 * * [misc]simplify:  iters left: 4 (251 enodes)
1545212403.188 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212403.188 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212403.188 * * * * [misc]progress:  [ 101 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212403.188 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212403.189 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212403.204 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212403.258 * * [misc]simplify:  iters left: 4 (435 enodes)
1545212403.636 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ (* d c0) (* (/ h d) D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))))
1545212403.636 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ (* d c0) (* (/ h d) D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212403.636 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212403.637 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212403.646 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212403.669 * * [misc]simplify:  iters left: 4 (258 enodes)
1545212403.836 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212403.836 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212403.837 * * * * [misc]progress:  [ 102 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212403.837 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212403.838 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212403.856 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212403.904 * * [misc]simplify:  iters left: 4 (419 enodes)
1545212404.647 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (* (/ c0 (* w h)) (* d (/ d D)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212404.647 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (* (/ c0 (* w h)) (* d (/ d D)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212404.648 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212404.648 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212404.656 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212404.684 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212404.850 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212404.850 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212404.850 * * * * [misc]progress:  [ 103 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212404.850 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212404.850 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212404.858 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212404.900 * * [misc]simplify:  iters left: 4 (435 enodes)
1545212405.250 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ (* c0 (* d d)) (* D h))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))))
1545212405.250 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ (* c0 (* d d)) (* D h))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212405.251 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212405.251 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212405.262 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212405.292 * * [misc]simplify:  iters left: 4 (258 enodes)
1545212405.511 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212405.511 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212405.511 * * * * [misc]progress:  [ 104 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212405.511 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212405.511 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212405.519 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212405.547 * * [misc]simplify:  iters left: 4 (422 enodes)
1545212405.978 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) D) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ (/ (/ c0 w) h) (/ (/ D d) d)))))
1545212405.978 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) D) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ (/ (/ c0 w) h) (/ (/ D d) d))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212405.979 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212405.980 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212405.989 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212406.018 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212406.221 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212406.221 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212406.221 * * * * [misc]progress:  [ 105 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212406.221 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212406.221 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212406.234 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212406.268 * * [misc]simplify:  iters left: 4 (431 enodes)
1545212406.674 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212406.674 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212406.674 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212406.674 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212406.679 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212406.695 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212406.885 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212406.885 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212406.886 * * * * [misc]progress:  [ 106 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))>
1545212406.886 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d)))
1545212406.887 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212406.902 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212406.956 * * [misc]simplify:  iters left: 4 (435 enodes)
1545212407.311 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (/ (* d c0) (/ h d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D D) w)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212407.311 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (/ (* d c0) (/ h d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D D) w)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))
1545212407.312 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D))
1545212407.312 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212407.322 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212407.359 * * [misc]simplify:  iters left: 4 (273 enodes)
1545212407.598 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D D) w)))
1545212407.598 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D D) w))))))
1545212407.598 * * * * [misc]progress:  [ 107 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))>
1545212407.598 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212407.599 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212407.607 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212407.632 * * [misc]simplify:  iters left: 4 (423 enodes)
1545212408.024 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ (* d (* d c0)) (* w h)))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* D D)))
1545212408.025 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ (* d (* d c0)) (* w h)))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* D D))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))
1545212408.025 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D))
1545212408.025 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212408.035 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212408.064 * * [misc]simplify:  iters left: 4 (251 enodes)
1545212408.222 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212408.222 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212408.223 * * * * [misc]progress:  [ 108 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212408.223 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212408.223 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212408.231 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212408.257 * * [misc]simplify:  iters left: 4 (438 enodes)
1545212408.685 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ (* d c0) (* (/ h d) D)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))))
1545212408.685 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (/ (* d c0) (* (/ h d) D)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212408.685 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212408.686 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212408.693 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212408.708 * * [misc]simplify:  iters left: 4 (258 enodes)
1545212408.900 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212408.900 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212408.900 * * * * [misc]progress:  [ 109 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212408.901 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212408.902 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212408.916 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212408.967 * * [misc]simplify:  iters left: 4 (420 enodes)
1545212409.375 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) D) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* d (/ d D)) (/ (/ c0 w) h))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212409.375 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) D) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* d (/ d D)) (/ (/ c0 w) h))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212409.375 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212409.375 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212409.388 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212409.415 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212409.606 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212409.606 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212409.606 * * * * [misc]progress:  [ 110 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212409.606 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D))))
1545212409.607 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212409.623 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212409.649 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212410.025 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (/ (* (/ d D) (* d c0)) h))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* D w)))
1545212410.026 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (/ (* (/ d D) (* d c0)) h))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* D w))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212410.026 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212410.026 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212410.036 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212410.066 * * [misc]simplify:  iters left: 4 (258 enodes)
1545212410.314 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212410.314 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212410.314 * * * * [misc]progress:  [ 111 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212410.315 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212410.315 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212410.323 * * [misc]simplify:  iters left: 5 (106 enodes)
1545212410.356 * * [misc]simplify:  iters left: 4 (425 enodes)
1545212410.761 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (/ c0 (* w h)) (* d (/ d D)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212410.761 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (/ c0 (* w h)) (* d (/ d D)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212410.762 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212410.762 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212410.771 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212410.794 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212410.995 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212410.995 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212410.995 * * * * [misc]progress:  [ 112 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))>
1545212410.996 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212410.996 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212411.010 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212411.037 * * [misc]simplify:  iters left: 4 (432 enodes)
1545212411.401 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212411.401 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))
1545212411.401 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w)
1545212411.402 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212411.410 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212411.436 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212411.636 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212411.636 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212411.636 * * * * [misc]progress:  [ 113 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))>
1545212411.637 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d)))
1545212411.638 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212411.653 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212411.680 * * [misc]simplify:  iters left: 4 (463 enodes)
1545212412.136 * [exit]simplify:  Simplified to (+ (* (* (* (* D w) D) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212412.136 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* D w) D) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))
1545212412.137 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D))
1545212412.137 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212412.142 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212412.159 * * [misc]simplify:  iters left: 4 (287 enodes)
1545212412.389 * [exit]simplify:  Simplified to (* (* (* w (* D D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212412.389 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (* w (* D D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212412.389 * * * * [misc]progress:  [ 114 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212412.389 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212412.389 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212412.400 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212412.435 * * [misc]simplify:  iters left: 4 (449 enodes)
1545212412.906 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* D D)) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (* d (* (/ c0 h) (/ d w))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))
1545212412.906 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* D D)) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (* d (* (/ c0 h) (/ d w))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212412.906 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212412.907 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212412.916 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212412.943 * * [misc]simplify:  iters left: 4 (263 enodes)
1545212413.161 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212413.161 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212413.161 * * * * [misc]progress:  [ 115 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212413.162 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212413.162 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212413.178 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212413.233 * * [misc]simplify:  iters left: 4 (462 enodes)
1545212413.698 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (/ (* (/ c0 h) (* d d)) D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212413.699 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (/ (* (/ c0 h) (* d d)) D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212413.699 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212413.699 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212413.709 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212413.738 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212413.967 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212413.967 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212413.967 * * * * [misc]progress:  [ 116 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212413.967 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212413.967 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212413.982 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212414.014 * * [misc]simplify:  iters left: 4 (447 enodes)
1545212414.441 * [exit]simplify:  Simplified to (+ (* (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D)))
1545212414.441 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212414.441 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212414.441 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212414.450 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212414.468 * * [misc]simplify:  iters left: 4 (257 enodes)
1545212414.702 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212414.702 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212414.702 * * * * [misc]progress:  [ 117 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212414.703 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D))))
1545212414.703 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212414.720 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212414.761 * * [misc]simplify:  iters left: 4 (468 enodes)
1545212415.231 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (/ (/ (* d c0) D) (/ h d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212415.231 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (/ (/ (* d c0) D) (/ h d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212415.231 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212415.232 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212415.241 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212415.271 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212415.466 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212415.466 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212415.466 * * * * [misc]progress:  [ 118 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212415.466 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212415.467 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212415.474 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212415.514 * * [misc]simplify:  iters left: 4 (451 enodes)
1545212415.906 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (/ (* d c0) (* (/ D d) (* w h))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))
1545212415.907 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (/ (* d c0) (* (/ D d) (* w h))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212415.907 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212415.907 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212415.912 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212415.927 * * [misc]simplify:  iters left: 4 (257 enodes)
1545212416.111 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212416.111 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212416.111 * * * * [misc]progress:  [ 119 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212416.112 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212416.112 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212416.129 * * [misc]simplify:  iters left: 5 (114 enodes)
1545212416.180 * * [misc]simplify:  iters left: 4 (456 enodes)
1545212416.644 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))))
1545212416.644 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212416.645 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212416.645 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212416.653 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212416.668 * * [misc]simplify:  iters left: 4 (257 enodes)
1545212416.859 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) w))
1545212416.859 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) w)))))
1545212416.860 * * * * [misc]progress:  [ 120 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212416.860 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212416.860 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212416.876 * * [misc]simplify:  iters left: 5 (133 enodes)
1545212416.963 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* w (* D D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))))
1545212416.963 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* w (* D D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212416.964 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212416.964 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212416.974 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212416.998 * * [misc]simplify:  iters left: 4 (381 enodes)
1545212417.366 * [exit]simplify:  Simplified to (* (* D (* D w)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212417.366 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* D (* D w)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))))
1545212417.366 * * * * [misc]progress:  [ 121 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212417.367 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212417.367 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212417.384 * * [misc]simplify:  iters left: 5 (128 enodes)
1545212417.471 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ c0 h) (* d d)) w))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D D)))
1545212417.471 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ c0 h) (* d d)) w))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D D))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212417.472 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212417.472 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212417.477 * * [misc]simplify:  iters left: 5 (83 enodes)
1545212417.498 * * [misc]simplify:  iters left: 4 (363 enodes)
1545212417.806 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212417.806 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ c0 h) (* d d)) w))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D D))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212417.806 * * * * [misc]progress:  [ 122 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212417.806 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212417.806 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212417.817 * * [misc]simplify:  iters left: 5 (130 enodes)
1545212417.876 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* (/ d D) d)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D w)))
1545212417.876 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* (/ d D) d)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D w))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212417.877 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212417.877 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212417.882 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212417.904 * * [misc]simplify:  iters left: 4 (370 enodes)
1545212418.296 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212418.296 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* (/ d D) d)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D w))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212418.296 * * * * [misc]progress:  [ 123 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212418.296 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212418.297 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212418.306 * * [misc]simplify:  iters left: 5 (125 enodes)
1545212418.381 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (/ c0 (* h w)) (/ (* d d) D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) D)))
1545212418.381 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (/ c0 (* h w)) (/ (* d d) D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) D))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212418.381 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212418.382 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212418.392 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212418.430 * * [misc]simplify:  iters left: 4 (353 enodes)
1545212418.776 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))
1545212418.776 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)))))
1545212418.776 * * * * [misc]progress:  [ 124 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212418.776 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212418.777 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212418.785 * * [misc]simplify:  iters left: 5 (130 enodes)
1545212418.850 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ c0 h) (* d d)) D))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* D w))))
1545212418.850 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ c0 h) (* d d)) D))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* D w)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212418.850 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212418.851 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212418.863 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212418.888 * * [misc]simplify:  iters left: 4 (370 enodes)
1545212419.314 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212419.314 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ c0 h) (* d d)) D))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* D w)))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212419.315 * * * * [misc]progress:  [ 125 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212419.315 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212419.316 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212419.332 * * [misc]simplify:  iters left: 5 (126 enodes)
1545212419.415 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (/ c0 (* h w)) (* (/ d D) d)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))))))))) (* D (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212419.415 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (/ c0 (* h w)) (* (/ d D) d)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))))))))) (* D (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212419.416 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212419.416 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212419.426 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212419.451 * * [misc]simplify:  iters left: 4 (353 enodes)
1545212419.742 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))
1545212419.742 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)))))
1545212419.742 * * * * [misc]progress:  [ 126 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212419.742 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212419.743 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212419.751 * * [misc]simplify:  iters left: 5 (127 enodes)
1545212419.809 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))) (* (* (/ d D) (* (/ c0 h) (/ d D))) (sqrt (sqrt (* (- (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))))) (* (* w (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (- M) (* M M))) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))))) (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (- M) (* M M))) (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (pow M 3)))))))
1545212419.809 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))) (* (* (/ d D) (* (/ c0 h) (/ d D))) (sqrt (sqrt (* (- (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))))) (* (* w (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (- M) (* M M))) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))))) (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (- M) (* M M))) (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (pow M 3))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212419.810 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212419.810 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212419.819 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212419.854 * * [misc]simplify:  iters left: 4 (353 enodes)
1545212420.128 * [exit]simplify:  Simplified to (* w (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212420.128 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))))
1545212420.129 * * * * [misc]progress:  [ 127 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212420.129 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212420.129 * * [misc]simplify:  iters left: 6 (49 enodes)
1545212420.138 * * [misc]simplify:  iters left: 5 (138 enodes)
1545212420.186 * [exit]simplify:  Simplified to (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (+ (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (/ c0 h) (* d d)))))
1545212420.186 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (+ (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (/ c0 h) (* d d))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212420.186 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212420.187 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212420.192 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212420.213 * * [misc]simplify:  iters left: 4 (365 enodes)
1545212420.490 * [exit]simplify:  Simplified to (* (* (* (* D w) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212420.491 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (+ (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (/ c0 h) (* d d))))) (* (* (* (* D w) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212420.491 * * * * [misc]progress:  [ 128 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212420.492 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212420.492 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212420.510 * * [misc]simplify:  iters left: 5 (133 enodes)
1545212420.573 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (/ (* c0 (* d d)) (* h w)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))))))
1545212420.573 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (/ (* c0 (* d d)) (* h w)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212420.574 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212420.574 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212420.583 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212420.983 * * [misc]simplify:  iters left: 4 (343 enodes)
1545212421.294 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212421.294 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))))
1545212421.294 * * * * [misc]progress:  [ 129 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212421.294 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212421.295 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212421.314 * * [misc]simplify:  iters left: 5 (135 enodes)
1545212421.377 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (/ (/ c0 h) (/ D d)) d))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* D w))))
1545212421.377 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (/ (/ c0 h) (/ D d)) d))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* D w)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212421.377 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212421.378 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212421.385 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212421.406 * * [misc]simplify:  iters left: 4 (350 enodes)
1545212421.669 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))
1545212421.669 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))))
1545212421.669 * * * * [misc]progress:  [ 130 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212421.670 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212421.670 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212421.679 * * [misc]simplify:  iters left: 5 (130 enodes)
1545212421.727 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ (* c0 d) (* h w)) (/ d D)))))
1545212421.727 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ (* c0 d) (* h w)) (/ d D))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212421.727 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212421.728 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212421.739 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212421.765 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212422.063 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) D))
1545212422.063 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ (* c0 d) (* h w)) (/ d D))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) D)))))
1545212422.063 * * * * [misc]progress:  [ 131 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212422.064 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212422.064 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212422.082 * * [misc]simplify:  iters left: 5 (135 enodes)
1545212422.136 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (/ (* d d) D) (/ c0 h)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))))))
1545212422.136 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (/ (* d d) D) (/ c0 h)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212422.136 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212422.136 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212422.142 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212422.162 * * [misc]simplify:  iters left: 4 (350 enodes)
1545212422.399 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))
1545212422.399 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))))
1545212422.399 * * * * [misc]progress:  [ 132 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212422.399 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212422.400 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212422.409 * * [misc]simplify:  iters left: 5 (131 enodes)
1545212422.455 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* (/ (/ c0 w) h) (* (/ d D) d)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))))
1545212422.455 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* (/ (/ c0 w) h) (* (/ d D) d)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212422.455 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212422.455 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212422.466 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212422.502 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212422.735 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) D))
1545212422.735 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* (/ (/ c0 w) h) (* (/ d D) d)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) D)))))
1545212422.736 * * * * [misc]progress:  [ 133 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212422.736 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212422.736 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212422.745 * * [misc]simplify:  iters left: 5 (132 enodes)
1545212422.791 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) w) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (/ (/ (/ c0 h) (/ D d)) (/ D d)))))
1545212422.792 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) w) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (/ (/ (/ c0 h) (/ D d)) (/ D d))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212422.792 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212422.792 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212422.798 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212422.817 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212423.051 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) w)
1545212423.051 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) w) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (/ (/ (/ c0 h) (/ D d)) (/ D d))))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) w))))
1545212423.051 * * * * [misc]progress:  [ 134 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212423.051 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212423.051 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212423.058 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212423.085 * * [misc]simplify:  iters left: 4 (410 enodes)
1545212423.319 * [exit]simplify:  Simplified to (+ (* (* D (* D w)) (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* d d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212423.319 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (* D w)) (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* d d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212423.319 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212423.319 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212423.324 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212423.338 * * [misc]simplify:  iters left: 4 (259 enodes)
1545212423.553 * [exit]simplify:  Simplified to (* (* (* D w) D) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212423.554 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (* D w)) (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* d d) (/ c0 h)) (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* D w) D) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212423.554 * * * * [misc]progress:  [ 135 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212423.554 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212423.555 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212423.562 * * [misc]simplify:  iters left: 5 (99 enodes)
1545212423.598 * * [misc]simplify:  iters left: 4 (398 enodes)
1545212423.943 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (/ (* (* d c0) d) (* h w))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D D)))
1545212423.944 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (/ (* (* d c0) d) (* h w))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D D))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212423.944 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212423.944 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212423.949 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212423.965 * * [misc]simplify:  iters left: 4 (243 enodes)
1545212424.143 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D))
1545212424.143 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (/ (* (* d c0) d) (* h w))) (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D D))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)))))
1545212424.143 * * * * [misc]progress:  [ 136 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212424.144 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212424.145 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212424.158 * * [misc]simplify:  iters left: 5 (101 enodes)
1545212424.206 * * [misc]simplify:  iters left: 4 (415 enodes)
1545212424.496 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (/ d D) (* d (/ c0 h)))) (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)))
1545212424.496 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (/ d D) (* d (/ c0 h)))) (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212424.496 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212424.497 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212424.501 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212424.516 * * [misc]simplify:  iters left: 4 (250 enodes)
1545212424.687 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))
1545212424.687 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (/ d D) (* d (/ c0 h)))) (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))))
1545212424.687 * * * * [misc]progress:  [ 137 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212424.688 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212424.688 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212424.695 * * [misc]simplify:  iters left: 5 (96 enodes)
1545212424.725 * * [misc]simplify:  iters left: 4 (401 enodes)
1545212425.086 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))))))))
1545212425.086 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212425.086 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212425.087 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212425.091 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212425.104 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212425.249 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D)
1545212425.249 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))
1545212425.249 * * * * [misc]progress:  [ 138 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212425.250 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212425.250 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212425.257 * * [misc]simplify:  iters left: 5 (101 enodes)
1545212425.281 * * [misc]simplify:  iters left: 4 (415 enodes)
1545212425.627 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ c0 h) (* d d)) D)) (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)))
1545212425.627 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ c0 h) (* d d)) D)) (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212425.628 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212425.628 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212425.636 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212425.650 * * [misc]simplify:  iters left: 4 (250 enodes)
1545212425.862 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))
1545212425.862 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ c0 h) (* d d)) D)) (* (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))))
1545212425.862 * * * * [misc]progress:  [ 139 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212425.862 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212425.863 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212425.875 * * [misc]simplify:  iters left: 5 (97 enodes)
1545212425.922 * * [misc]simplify:  iters left: 4 (406 enodes)
1545212426.284 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* (* (/ (* d d) D) (/ (/ c0 w) h)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))))))))
1545212426.284 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* (* (/ (* d d) D) (/ (/ c0 w) h)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212426.284 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212426.284 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212426.288 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212426.301 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212426.448 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D)
1545212426.448 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* (* (/ (* d d) D) (/ (/ c0 w) h)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))
1545212426.448 * * * * [misc]progress:  [ 140 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212426.449 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212426.449 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212426.456 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212426.479 * * [misc]simplify:  iters left: 4 (413 enodes)
1545212426.831 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3)) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))))))))
1545212426.831 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3)) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212426.831 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212426.832 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212426.839 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212426.862 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212427.026 * [exit]simplify:  Simplified to (* w (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212427.026 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3)) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* w (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212427.026 * * * * [misc]progress:  [ 141 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212427.027 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212427.028 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212427.044 * * [misc]simplify:  iters left: 5 (125 enodes)
1545212427.077 * * [misc]simplify:  iters left: 4 (497 enodes)
1545212427.519 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* w (* D D))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212427.520 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* w (* D D))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212427.521 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212427.521 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212427.530 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212427.548 * * [misc]simplify:  iters left: 4 (300 enodes)
1545212427.732 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* D D) w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212427.732 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* D D) w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212427.733 * * * * [misc]progress:  [ 142 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212427.733 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212427.734 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212427.748 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212427.791 * * [misc]simplify:  iters left: 4 (483 enodes)
1545212428.154 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212428.154 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212428.155 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212428.155 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212428.160 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212428.181 * * [misc]simplify:  iters left: 4 (278 enodes)
1545212428.410 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212428.410 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212428.411 * * * * [misc]progress:  [ 143 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212428.411 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212428.412 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212428.429 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212428.485 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D w)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* d (* (/ c0 h) (/ d D))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212428.485 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D w)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* d (* (/ c0 h) (/ d D))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212428.486 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212428.486 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212428.497 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212428.530 * * [misc]simplify:  iters left: 4 (285 enodes)
1545212428.814 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212428.814 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212428.814 * * * * [misc]progress:  [ 144 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212428.815 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212428.815 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212428.836 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212428.892 * * [misc]simplify:  iters left: 4 (481 enodes)
1545212429.307 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (* (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212429.307 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (* (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212429.307 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212429.307 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212429.312 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212429.344 * * [misc]simplify:  iters left: 4 (268 enodes)
1545212429.545 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D))
1545212429.545 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D)))))
1545212429.545 * * * * [misc]progress:  [ 145 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212429.546 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212429.546 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212429.563 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212429.620 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D w)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (/ c0 h) (* (/ d D) d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212429.620 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D w)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (/ c0 h) (* (/ d D) d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212429.620 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212429.621 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212429.626 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212429.643 * * [misc]simplify:  iters left: 4 (285 enodes)
1545212429.844 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212429.845 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212429.845 * * * * [misc]progress:  [ 146 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212429.845 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212429.846 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212429.854 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212429.893 * * [misc]simplify:  iters left: 4 (487 enodes)
1545212430.290 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (/ (/ c0 h) w) (* (/ d D) d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))
1545212430.290 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (/ (/ c0 h) w) (* (/ d D) d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212430.290 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212430.290 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212430.295 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212430.311 * * [misc]simplify:  iters left: 4 (268 enodes)
1545212430.476 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D))
1545212430.476 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D)))))
1545212430.476 * * * * [misc]progress:  [ 147 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212430.476 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212430.477 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212430.488 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212430.523 * * [misc]simplify:  iters left: 4 (494 enodes)
1545212430.905 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (- (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* M M))))) w) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (- M) (* M M))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))))
1545212430.905 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (- (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* M M))))) w) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (- M) (* M M))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212430.905 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212430.906 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212430.914 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212430.947 * * [misc]simplify:  iters left: 4 (268 enodes)
1545212431.151 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) w))
1545212431.151 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) w)))))
1545212431.151 * * * * [misc]progress:  [ 148 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212431.151 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212431.151 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212431.164 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212431.199 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212431.564 * [exit]simplify:  Simplified to (+ (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* w (* D D))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212431.564 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* w (* D D))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212431.564 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212431.565 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212431.569 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212431.590 * * [misc]simplify:  iters left: 4 (271 enodes)
1545212431.824 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* D w) D)))
1545212431.825 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* D w) D))))))
1545212431.825 * * * * [misc]progress:  [ 149 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212431.825 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212431.826 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212431.841 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212431.894 * * [misc]simplify:  iters left: 4 (430 enodes)
1545212432.273 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (* (/ (/ c0 h) w) (* d d)))) (* (* (* D D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212432.273 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (* (/ (/ c0 h) w) (* d d)))) (* (* (* D D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212432.273 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212432.274 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212432.278 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212432.295 * * [misc]simplify:  iters left: 4 (249 enodes)
1545212432.510 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212432.510 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212432.510 * * * * [misc]progress:  [ 150 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212432.510 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212432.511 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212432.526 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212432.565 * * [misc]simplify:  iters left: 4 (443 enodes)
1545212432.947 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (* (/ (* d c0) h) (/ d D)))) (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w)))
1545212432.947 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (* (/ (* d c0) h) (/ d D)))) (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) w))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212432.947 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212432.948 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212432.957 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212432.986 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212433.179 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212433.179 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212433.179 * * * * [misc]progress:  [ 151 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212433.180 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212433.180 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212433.195 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212433.241 * * [misc]simplify:  iters left: 4 (426 enodes)
1545212433.629 * [exit]simplify:  Simplified to (+ (* D (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* (/ d D) (* d c0)) (* h w))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212433.629 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* (/ d D) (* d c0)) (* h w))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212433.629 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212433.630 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212433.637 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212433.651 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212433.818 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212433.818 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))))
1545212433.818 * * * * [misc]progress:  [ 152 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212433.818 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212433.819 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212433.827 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212433.854 * * [misc]simplify:  iters left: 4 (449 enodes)
1545212434.199 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (/ (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (/ D (/ (* d c0) (/ h d))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* D w)))
1545212434.199 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (/ (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))) (/ D (/ (* d c0) (/ h d))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* D w))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212434.199 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212434.200 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212434.204 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212434.232 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212434.417 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212434.417 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212434.417 * * * * [misc]progress:  [ 153 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212434.417 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212434.418 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212434.428 * * [misc]simplify:  iters left: 5 (106 enodes)
1545212434.453 * * [misc]simplify:  iters left: 4 (432 enodes)
1545212434.876 * [exit]simplify:  Simplified to (+ (* D (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ d h) (/ c0 w)) (/ D d))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212434.876 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (/ (* (/ d h) (/ c0 w)) (/ D d))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212434.876 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212434.877 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212434.886 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212434.913 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212435.083 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212435.083 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))))
1545212435.083 * * * * [misc]progress:  [ 154 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212435.084 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212435.084 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212435.091 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212435.116 * * [misc]simplify:  iters left: 4 (437 enodes)
1545212435.883 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (+ (pow (* (/ (/ d D) w) (* (/ c0 h) (/ d D))) 3) (* (- M) (* M M))) (+ M (* (/ (/ d D) w) (* (/ c0 h) (/ d D))))))) (sqrt (sqrt (* (+ (pow (* (/ (/ d D) w) (* (/ c0 h) (/ d D))) 3) (* (- M) (* M M))) (* (- M (* (/ (/ d D) w) (* (/ c0 h) (/ d D)))) (+ M (* (/ (/ d D) w) (* (/ c0 h) (/ d D)))))))))) (* (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (/ (/ d D) w) (* (/ c0 h) (/ d D))) (* (/ (/ d D) w) (* (/ c0 h) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (/ (/ d D) w) (* (/ c0 h) (/ d D))) (* (/ (/ d D) w) (* (/ c0 h) (/ d D))))) (- M (* (/ (/ d D) w) (* (/ c0 h) (/ d D)))))))))
1545212435.883 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (+ (pow (* (/ (/ d D) w) (* (/ c0 h) (/ d D))) 3) (* (- M) (* M M))) (+ M (* (/ (/ d D) w) (* (/ c0 h) (/ d D))))))) (sqrt (sqrt (* (+ (pow (* (/ (/ d D) w) (* (/ c0 h) (/ d D))) 3) (* (- M) (* M M))) (* (- M (* (/ (/ d D) w) (* (/ c0 h) (/ d D)))) (+ M (* (/ (/ d D) w) (* (/ c0 h) (/ d D)))))))))) (* (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (/ (/ d D) w) (* (/ c0 h) (/ d D))) (* (/ (/ d D) w) (* (/ c0 h) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (/ (/ d D) w) (* (/ c0 h) (/ d D))) (* (/ (/ d D) w) (* (/ c0 h) (/ d D))))) (- M (* (/ (/ d D) w) (* (/ c0 h) (/ d D))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212435.883 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212435.883 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212435.887 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212435.903 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212436.058 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212436.058 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))))
1545212436.058 * * * * [misc]progress:  [ 155 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212436.058 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212436.058 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212436.067 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212436.101 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212436.415 * [exit]simplify:  Simplified to (+ (* (* (* w (* D D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212436.415 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* w (* D D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212436.415 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212436.415 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212436.420 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212436.442 * * [misc]simplify:  iters left: 4 (263 enodes)
1545212436.622 * [exit]simplify:  Simplified to (* (* (* w (* D D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212436.622 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (* w (* D D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212436.622 * * * * [misc]progress:  [ 156 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212436.623 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212436.623 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212436.633 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212436.667 * * [misc]simplify:  iters left: 4 (428 enodes)
1545212437.015 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) D) (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212437.015 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) D) (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212437.015 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212437.016 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212437.020 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212437.035 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212437.198 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D D) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212437.198 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D D) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212437.198 * * * * [misc]progress:  [ 157 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212437.198 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212437.199 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212437.207 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212437.241 * * [misc]simplify:  iters left: 4 (443 enodes)
1545212437.550 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (/ (/ (* d c0) D) (/ h d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212437.550 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (/ (/ (* d c0) D) (/ h d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212437.550 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212437.550 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212437.555 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212437.574 * * [misc]simplify:  iters left: 4 (248 enodes)
1545212437.739 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212437.740 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212437.740 * * * * [misc]progress:  [ 158 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212437.740 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212437.741 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212437.757 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212437.812 * * [misc]simplify:  iters left: 4 (437 enodes)
1545212438.160 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ (/ c0 h) (/ w d)) (/ d D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))))))
1545212438.160 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ (/ c0 h) (/ w d)) (/ d D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212438.161 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212438.161 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212438.165 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212438.179 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212438.315 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D))
1545212438.315 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D)))))
1545212438.315 * * * * [misc]progress:  [ 159 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212438.316 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212438.316 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212438.324 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212438.351 * * [misc]simplify:  iters left: 4 (447 enodes)
1545212438.665 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* w (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (/ c0 (* (/ D d) (/ h d))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212438.665 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* w (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (/ c0 (* (/ D d) (/ h d))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212438.665 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212438.665 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212438.670 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212438.688 * * [misc]simplify:  iters left: 4 (248 enodes)
1545212438.843 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212438.843 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212438.843 * * * * [misc]progress:  [ 160 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212438.844 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212438.844 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212438.852 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212438.881 * * [misc]simplify:  iters left: 4 (441 enodes)
1545212439.199 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ D (* (/ (/ c0 w) h) (* d d))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)))
1545212439.199 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ D (* (/ (/ c0 w) h) (* d d))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212439.200 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212439.200 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212439.211 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212439.229 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212439.354 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D))
1545212439.354 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) D)))))
1545212439.354 * * * * [misc]progress:  [ 161 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212439.354 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212439.355 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212439.365 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212439.392 * * [misc]simplify:  iters left: 4 (446 enodes)
1545212439.723 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (* M M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) w))
1545212439.723 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (* M M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) w)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212439.723 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212439.724 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212439.729 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212439.743 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212439.912 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* w (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212439.912 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* w (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212439.912 * * * * [misc]progress:  [ 162 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))>
1545212439.912 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d)))
1545212439.913 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212439.930 * * [misc]simplify:  iters left: 5 (127 enodes)
1545212439.988 * * [misc]simplify:  iters left: 4 (498 enodes)
1545212440.427 * [exit]simplify:  Simplified to (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212440.427 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))
1545212440.427 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D))
1545212440.427 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212440.434 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212440.471 * * [misc]simplify:  iters left: 4 (323 enodes)
1545212440.687 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (* D w) D)))
1545212440.687 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (* D w) D))))))
1545212440.687 * * * * [misc]progress:  [ 163 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))>
1545212440.688 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212440.688 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212440.702 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212440.731 * * [misc]simplify:  iters left: 4 (477 enodes)
1545212441.092 * [exit]simplify:  Simplified to (+ (* (* (* d (* (/ c0 h) (/ d w))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212441.092 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* d (* (/ c0 h) (/ d w))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))
1545212441.093 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D))
1545212441.093 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212441.098 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212441.122 * * [misc]simplify:  iters left: 4 (299 enodes)
1545212441.328 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* D D)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212441.328 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* D D)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212441.328 * * * * [misc]progress:  [ 164 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212441.328 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212441.329 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212441.347 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212441.394 * * [misc]simplify:  iters left: 4 (494 enodes)
1545212441.755 * [exit]simplify:  Simplified to (+ (* (* (* (* (/ d D) d) (/ c0 h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D w))))
1545212441.755 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* (/ d D) d) (/ c0 h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D w)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212441.756 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212441.756 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212441.766 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212441.788 * * [misc]simplify:  iters left: 4 (306 enodes)
1545212441.999 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* D w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212441.999 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* D w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212441.999 * * * * [misc]progress:  [ 165 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212442.000 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212442.000 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212442.008 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212442.049 * * [misc]simplify:  iters left: 4 (483 enodes)
1545212442.461 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ (* d (/ c0 h)) (* (/ w d) D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212442.461 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ (* d (/ c0 h)) (* (/ w d) D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212442.462 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212442.462 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212442.467 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212442.489 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212442.690 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212442.690 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212442.691 * * * * [misc]progress:  [ 166 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212442.691 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D))))
1545212442.691 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212442.700 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212442.740 * * [misc]simplify:  iters left: 4 (496 enodes)
1545212443.151 * [exit]simplify:  Simplified to (+ (* (* (* (* (/ c0 h) (/ d D)) d) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212443.152 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* (/ c0 h) (/ d D)) d) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212443.152 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212443.152 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212443.157 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212443.176 * * [misc]simplify:  iters left: 4 (306 enodes)
1545212443.386 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* D w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212443.386 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* D w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212443.386 * * * * [misc]progress:  [ 167 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212443.386 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212443.386 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212443.397 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212443.433 * * [misc]simplify:  iters left: 4 (488 enodes)
1545212443.804 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (/ c0 w) h) (* (/ d D) d))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212443.804 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (/ c0 w) h) (* (/ d D) d))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212443.804 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212443.804 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212443.809 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212443.826 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212444.034 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212444.034 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212444.034 * * * * [misc]progress:  [ 168 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))>
1545212444.034 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212444.035 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212444.046 * * [misc]simplify:  iters left: 5 (121 enodes)
1545212444.089 * * [misc]simplify:  iters left: 4 (495 enodes)
1545212444.517 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (pow M 3)) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)))) (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (- M) (* M M))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) w) (* (sqrt (sqrt (* (+ (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (/ (/ c0 (/ D d)) (* (/ D d) h)) (sqrt (sqrt (- (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212444.518 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (pow M 3)) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)))) (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (- M) (* M M))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) w) (* (sqrt (sqrt (* (+ (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (/ (/ c0 (/ D d)) (* (/ D d) h)) (sqrt (sqrt (- (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))
1545212444.518 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w)
1545212444.518 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212444.528 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212444.553 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212444.773 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212444.773 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212444.773 * * * * [misc]progress:  [ 169 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))>
1545212444.773 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d)))
1545212444.774 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212444.788 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212444.819 * * [misc]simplify:  iters left: 4 (449 enodes)
1545212445.198 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* D D) w)) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))
1545212445.198 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* D D) w)) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))
1545212445.199 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D))
1545212445.199 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212445.209 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212445.231 * * [misc]simplify:  iters left: 4 (271 enodes)
1545212445.407 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D w) D)))
1545212445.407 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D w) D))))))
1545212445.407 * * * * [misc]progress:  [ 170 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212445.407 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212445.408 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212445.416 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212445.460 * * [misc]simplify:  iters left: 4 (431 enodes)
1545212445.827 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (/ c0 h) (/ (* d d) w))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* D D)))
1545212445.827 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (/ c0 h) (/ (* d d) w))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* D D))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212445.828 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212445.828 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212445.833 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212445.848 * * [misc]simplify:  iters left: 4 (249 enodes)
1545212445.990 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212445.990 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212445.990 * * * * [misc]progress:  [ 171 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212445.990 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212445.990 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212445.998 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212446.025 * * [misc]simplify:  iters left: 4 (452 enodes)
1545212446.373 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (/ (* d c0) D) (/ h d))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D w)))
1545212446.373 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (/ (* d c0) D) (/ h d))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D w))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212446.373 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212446.374 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212446.378 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212446.400 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212446.565 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212446.565 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212446.565 * * * * [misc]progress:  [ 172 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212446.565 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212446.566 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212446.576 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212446.611 * * [misc]simplify:  iters left: 4 (435 enodes)
1545212446.962 * [exit]simplify:  Simplified to (+ (* D (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ c0 h) (/ d D)) (/ w d))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212446.962 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ c0 h) (/ d D)) (/ w d))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212446.962 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212446.963 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212446.971 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212447.003 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212447.175 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212447.175 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))))
1545212447.175 * * * * [misc]progress:  [ 173 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212447.175 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D))))
1545212447.176 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212447.184 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212447.220 * * [misc]simplify:  iters left: 4 (450 enodes)
1545212447.562 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (* d (/ c0 h)) (/ D d))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D w)))
1545212447.562 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (* d (/ c0 h)) (/ D d))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* D w))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212447.562 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212447.562 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212447.567 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212447.582 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212447.728 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212447.728 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212447.729 * * * * [misc]progress:  [ 174 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212447.729 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212447.730 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212447.744 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212447.780 * * [misc]simplify:  iters left: 4 (439 enodes)
1545212448.155 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ d D) (* d c0)) (* h w))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212448.155 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ d D) (* d c0)) (* h w))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212448.155 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212448.156 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212448.164 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212448.189 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212448.329 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212448.329 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))))
1545212448.329 * * * * [misc]progress:  [ 175 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212448.329 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212448.330 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212448.337 * * [misc]simplify:  iters left: 5 (109 enodes)
1545212448.367 * * [misc]simplify:  iters left: 4 (446 enodes)
1545212448.726 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (* M M) (- M))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (* (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) w)) (* (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))))
1545212448.726 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (* M M) (- M))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (* (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) w)) (* (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212448.726 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212448.727 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212448.734 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212448.756 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212448.917 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212448.917 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))))
1545212448.917 * * * * [misc]progress:  [ 176 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212448.917 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212448.917 * * [misc]simplify:  iters left: 6 (49 enodes)
1545212448.927 * * [misc]simplify:  iters left: 5 (137 enodes)
1545212448.995 * [exit]simplify:  Simplified to (+ (* (* D (* D w)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* d d) (/ c0 h)))))
1545212448.995 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (* D w)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* d d) (/ c0 h))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212448.996 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212448.996 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212449.002 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212449.024 * * [misc]simplify:  iters left: 4 (347 enodes)
1545212449.657 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* D w) D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))))
1545212449.657 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (* D w)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* M M) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* d d) (/ c0 h))))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* D w) D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))))))))))
1545212449.658 * * * * [misc]progress:  [ 177 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212449.658 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212449.658 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212449.667 * * [misc]simplify:  iters left: 5 (132 enodes)
1545212449.711 * [exit]simplify:  Simplified to (+ (* (* (* (/ (/ c0 h) (/ w d)) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* M M)) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212449.711 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (/ c0 h) (/ w d)) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* M M)) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212449.711 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212449.712 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212449.717 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212449.746 * * [misc]simplify:  iters left: 4 (328 enodes)
1545212449.996 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212449.996 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (/ c0 h) (/ w d)) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* M M)) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212449.996 * * * * [misc]progress:  [ 178 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212449.997 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212449.997 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212450.017 * * [misc]simplify:  iters left: 5 (134 enodes)
1545212450.075 * [exit]simplify:  Simplified to (+ (* (* (* (/ (/ c0 h) (/ D d)) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* M M)) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212450.075 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (/ c0 h) (/ D d)) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* M M)) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212450.075 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212450.076 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212450.087 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212450.129 * * [misc]simplify:  iters left: 4 (335 enodes)
1545212450.370 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212450.370 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (/ c0 h) (/ D d)) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* M M)) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212450.370 * * * * [misc]progress:  [ 179 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212450.370 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212450.371 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212450.382 * * [misc]simplify:  iters left: 5 (129 enodes)
1545212450.435 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ d D) d) (/ (/ c0 w) h)))))
1545212450.435 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ d D) d) (/ (/ c0 w) h))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212450.435 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212450.435 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212450.441 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212450.464 * * [misc]simplify:  iters left: 4 (317 enodes)
1545212450.704 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))
1545212450.704 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D)))))
1545212450.704 * * * * [misc]progress:  [ 180 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212450.705 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212450.705 * * [misc]simplify:  iters left: 6 (48 enodes)
1545212450.721 * * [misc]simplify:  iters left: 5 (134 enodes)
1545212450.771 * [exit]simplify:  Simplified to (+ (* (* (* (* (/ d D) d) (/ c0 h)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* M M)) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* D w))))
1545212450.771 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* (/ d D) d) (/ c0 h)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* M M)) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* D w)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212450.772 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212450.772 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212450.778 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212450.798 * * [misc]simplify:  iters left: 4 (335 enodes)
1545212451.040 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212451.040 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* (/ d D) d) (/ c0 h)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* M M)) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* D w)))) (* (* (* D w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212451.040 * * * * [misc]progress:  [ 181 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212451.041 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212451.041 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212451.050 * * [misc]simplify:  iters left: 5 (130 enodes)
1545212451.109 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* (/ (/ c0 w) h) (* (/ d D) d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))))
1545212451.109 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* (/ (/ c0 w) h) (* (/ d D) d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212451.110 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212451.110 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212451.122 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212451.152 * * [misc]simplify:  iters left: 4 (317 enodes)
1545212451.364 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))
1545212451.364 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D)))))
1545212451.364 * * * * [misc]progress:  [ 182 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212451.365 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212451.365 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212451.380 * * [misc]simplify:  iters left: 5 (131 enodes)
1545212451.428 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (pow M 3)) (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M)))))) w) (* (sqrt (sqrt (* (- (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))))
1545212451.428 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (pow M 3)) (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M)))))) w) (* (sqrt (sqrt (* (- (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212451.428 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212451.429 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212451.435 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212451.454 * * [misc]simplify:  iters left: 4 (317 enodes)
1545212451.726 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212451.726 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212451.726 * * * * [misc]progress:  [ 183 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212451.726 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212451.726 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212451.735 * * [misc]simplify:  iters left: 5 (125 enodes)
1545212451.787 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* w (* D D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))))))
1545212451.787 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* w (* D D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212451.788 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212451.788 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212451.793 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212451.813 * * [misc]simplify:  iters left: 4 (324 enodes)
1545212452.045 * [exit]simplify:  Simplified to (* (* (* (* D D) w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212452.045 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (* (* D D) w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212452.045 * * * * [misc]progress:  [ 184 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212452.046 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212452.046 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212452.054 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212452.092 * * [misc]simplify:  iters left: 4 (487 enodes)
1545212452.455 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212452.456 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212452.456 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212452.456 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212452.463 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212452.480 * * [misc]simplify:  iters left: 4 (302 enodes)
1545212452.674 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212452.674 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212452.675 * * * * [misc]progress:  [ 185 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212452.675 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212452.675 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212452.684 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212452.741 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)))))) (* D w)) (* (* (* d (* (/ c0 h) (/ d D))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212452.741 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)))))) (* D w)) (* (* (* d (* (/ c0 h) (/ d D))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212452.742 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212452.742 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212452.752 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212452.773 * * [misc]simplify:  iters left: 4 (309 enodes)
1545212452.959 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))
1545212452.959 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))))))
1545212452.959 * * * * [misc]progress:  [ 186 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212452.959 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212452.960 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212452.968 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212453.002 * * [misc]simplify:  iters left: 4 (487 enodes)
1545212453.398 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (* (* (/ d D) (/ (* d c0) (* h w))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))
1545212453.398 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (* (* (/ d D) (/ (* d c0) (* h w))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212453.398 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212453.398 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212453.403 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212453.420 * * [misc]simplify:  iters left: 4 (294 enodes)
1545212453.612 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))
1545212453.612 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D)))))
1545212453.612 * * * * [misc]progress:  [ 187 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212453.613 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212453.613 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212453.621 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212453.665 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)))))) (* D w)) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (/ c0 h) (* (/ d D) d)))))
1545212453.665 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)))))) (* D w)) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (/ c0 h) (* (/ d D) d))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212453.665 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212453.666 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212453.671 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212453.693 * * [misc]simplify:  iters left: 4 (309 enodes)
1545212453.887 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)))
1545212453.887 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w))))))
1545212453.887 * * * * [misc]progress:  [ 188 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212453.887 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212453.887 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212453.895 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212453.926 * * [misc]simplify:  iters left: 4 (491 enodes)
1545212454.286 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (/ (* (/ c0 h) (* d d)) (* D w)) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212454.286 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (/ (* (/ c0 h) (* d d)) (* D w)) (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212454.286 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212454.287 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212454.295 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212454.313 * * [misc]simplify:  iters left: 4 (294 enodes)
1545212454.503 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))
1545212454.504 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D)))))
1545212454.504 * * * * [misc]progress:  [ 189 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212454.504 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212454.505 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212454.519 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212454.548 * * [misc]simplify:  iters left: 4 (498 enodes)
1545212454.972 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (pow M 3)))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))))))))
1545212454.973 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (pow M 3)))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212454.973 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212454.973 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212454.981 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212454.998 * * [misc]simplify:  iters left: 4 (294 enodes)
1545212455.211 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212455.211 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212455.211 * * * * [misc]progress:  [ 190 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212455.211 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212455.211 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212455.220 * * [misc]simplify:  iters left: 5 (125 enodes)
1545212455.256 * * [misc]simplify:  iters left: 4 (497 enodes)
1545212455.562 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D w))))
1545212455.562 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D w)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212455.563 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212455.563 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212455.568 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212455.586 * * [misc]simplify:  iters left: 4 (300 enodes)
1545212455.798 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (* (* D D) w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212455.798 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (* (* D D) w) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212455.798 * * * * [misc]progress:  [ 191 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212455.798 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212455.799 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212455.807 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212455.845 * * [misc]simplify:  iters left: 4 (483 enodes)
1545212456.162 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212456.163 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212456.163 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212456.163 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212456.168 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212456.192 * * [misc]simplify:  iters left: 4 (278 enodes)
1545212456.387 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D)))
1545212456.387 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D))))))
1545212456.387 * * * * [misc]progress:  [ 192 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212456.387 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212456.388 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212456.396 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212456.440 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* d (* (/ c0 h) (/ d D))))))
1545212456.440 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* d (* (/ c0 h) (/ d D)))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212456.441 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212456.441 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212456.446 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212456.467 * * [misc]simplify:  iters left: 4 (285 enodes)
1545212456.647 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))
1545212456.647 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))))
1545212456.648 * * * * [misc]progress:  [ 193 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212456.648 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212456.648 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212456.657 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212456.689 * * [misc]simplify:  iters left: 4 (481 enodes)
1545212457.101 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ d D) (/ (/ c0 h) (/ w d))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212457.101 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ d D) (/ (/ c0 h) (/ w d))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212457.102 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212457.102 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212457.110 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212457.136 * * [misc]simplify:  iters left: 4 (268 enodes)
1545212457.318 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))
1545212457.318 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))))))
1545212457.318 * * * * [misc]progress:  [ 194 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212457.318 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212457.319 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212457.330 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212457.373 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (/ c0 h) (* (/ d D) d)))))
1545212457.373 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (/ c0 h) (* (/ d D) d))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212457.373 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212457.373 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212457.379 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212457.398 * * [misc]simplify:  iters left: 4 (285 enodes)
1545212457.579 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))
1545212457.579 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D w)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))))
1545212457.580 * * * * [misc]progress:  [ 195 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212457.580 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212457.581 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212457.589 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212457.634 * * [misc]simplify:  iters left: 4 (487 enodes)
1545212458.130 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (* (/ (/ c0 h) w) (/ (* d d) D)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212458.130 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (* (/ (/ c0 h) w) (/ (* d d) D)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212458.130 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212458.130 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212458.135 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212458.154 * * [misc]simplify:  iters left: 4 (268 enodes)
1545212458.324 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))
1545212458.324 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))))))
1545212458.324 * * * * [misc]progress:  [ 196 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212458.324 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212458.325 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212458.337 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212458.366 * * [misc]simplify:  iters left: 4 (494 enodes)
1545212458.742 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3))))) w) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (/ (/ c0 (/ D d)) (* (/ D d) h)) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))))
1545212458.742 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3))))) w) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (/ (/ c0 (/ D d)) (* (/ D d) h)) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212458.743 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212458.743 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212458.747 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212458.763 * * [misc]simplify:  iters left: 4 (268 enodes)
1545212458.931 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))
1545212458.932 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))))))
1545212458.932 * * * * [misc]progress:  [ 197 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212458.932 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212458.932 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212458.938 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212458.959 * * [misc]simplify:  iters left: 4 (309 enodes)
1545212459.126 * [exit]simplify:  Simplified to (+ (* (* (* d d) (/ c0 h)) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (* D D) w) (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))))
1545212459.127 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* d d) (/ c0 h)) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (* D D) w) (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212459.127 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212459.127 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212459.130 * * [misc]simplify:  iters left: 5 (50 enodes)
1545212459.145 * * [misc]simplify:  iters left: 4 (162 enodes)
1545212459.202 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D D) w))
1545212459.202 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* d d) (/ c0 h)) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (* D D) w) (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D D) w)))))
1545212459.202 * * * * [misc]progress:  [ 198 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212459.202 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212459.203 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212459.209 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212459.235 * * [misc]simplify:  iters left: 4 (293 enodes)
1545212459.444 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)) (* (/ (* d (* d c0)) (* h w)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212459.444 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)) (* (/ (* d (* d c0)) (* h w)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212459.444 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212459.444 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212459.448 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212459.456 * * [misc]simplify:  iters left: 4 (142 enodes)
1545212459.508 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D))
1545212459.508 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)) (* (/ (* d (* d c0)) (* h w)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)))))
1545212459.508 * * * * [misc]progress:  [ 199 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212459.508 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212459.509 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212459.514 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212459.533 * * [misc]simplify:  iters left: 4 (310 enodes)
1545212459.688 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (* (* (/ c0 (/ h d)) (/ d D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212459.688 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (* (* (/ c0 (/ h d)) (/ d D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212459.688 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212459.689 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212459.692 * * [misc]simplify:  iters left: 5 (46 enodes)
1545212459.701 * * [misc]simplify:  iters left: 4 (149 enodes)
1545212459.754 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w))
1545212459.755 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (* (* (/ c0 (/ h d)) (/ d D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w)))))
1545212459.755 * * * * [misc]progress:  [ 200 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212459.755 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212459.755 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212459.761 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212459.781 * * [misc]simplify:  iters left: 4 (295 enodes)
1545212459.942 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* (* (/ d (/ D d)) (/ (/ c0 w) h)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212459.942 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* (* (/ d (/ D d)) (/ (/ c0 w) h)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212459.942 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212459.943 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212459.946 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212459.954 * * [misc]simplify:  iters left: 4 (134 enodes)
1545212460.003 * [exit]simplify:  Simplified to (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212460.003 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* (* (/ d (/ D d)) (/ (/ c0 w) h)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212460.003 * * * * [misc]progress:  [ 201 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212460.004 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212460.004 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212460.010 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212460.028 * * [misc]simplify:  iters left: 4 (312 enodes)
1545212460.187 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (* (* (/ c0 h) (/ (* d d) D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212460.187 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (* (* (/ c0 h) (/ (* d d) D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212460.187 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212460.187 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212460.190 * * [misc]simplify:  iters left: 5 (46 enodes)
1545212460.200 * * [misc]simplify:  iters left: 4 (149 enodes)
1545212460.255 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w))
1545212460.255 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* D w)) (* (* (/ c0 h) (/ (* d d) D)) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w)))))
1545212460.255 * * * * [misc]progress:  [ 202 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212460.255 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212460.255 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212460.261 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212460.279 * * [misc]simplify:  iters left: 4 (299 enodes)
1545212460.439 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* (/ (/ (/ c0 w) h) (/ D (* d d))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212460.439 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* (/ (/ (/ c0 w) h) (/ D (* d d))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212460.439 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212460.439 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212460.443 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212460.451 * * [misc]simplify:  iters left: 4 (134 enodes)
1545212460.498 * [exit]simplify:  Simplified to (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212460.498 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* (/ (/ (/ c0 w) h) (/ D (* d d))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212460.498 * * * * [misc]progress:  [ 203 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212460.498 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212460.498 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212460.505 * * [misc]simplify:  iters left: 5 (79 enodes)
1545212460.523 * * [misc]simplify:  iters left: 4 (308 enodes)
1545212460.679 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (/ (/ (/ c0 h) (/ D d)) (/ D d)) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))
1545212460.679 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (/ (/ (/ c0 h) (/ D d)) (/ D d)) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212460.679 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212460.680 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212460.683 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212460.691 * * [misc]simplify:  iters left: 4 (134 enodes)
1545212460.742 * [exit]simplify:  Simplified to (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) w)
1545212460.742 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (/ (/ (/ c0 h) (/ D d)) (/ D d)) (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) w))))
1545212460.742 * * * * [misc]progress:  [ 204 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212460.743 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212460.743 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212460.751 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212460.779 * * [misc]simplify:  iters left: 4 (439 enodes)
1545212461.037 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (* (* D w) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))) (* M M))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212461.037 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (* (* D w) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))) (* M M))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212461.041 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212461.041 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212461.046 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212461.061 * * [misc]simplify:  iters left: 4 (250 enodes)
1545212461.173 * [exit]simplify:  Simplified to (* (* (* w (* D D)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212461.173 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (* w (* D D)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212461.174 * * * * [misc]progress:  [ 205 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212461.174 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212461.174 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212461.185 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212461.210 * * [misc]simplify:  iters left: 4 (412 enodes)
1545212461.435 * [exit]simplify:  Simplified to (+ (* (* (* D D) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ c0 (/ (* h w) (* d d))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212461.435 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ c0 (/ (* h w) (* d d))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212461.435 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212461.435 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212461.440 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212461.455 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212461.561 * [exit]simplify:  Simplified to (* (* D D) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212461.561 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212461.562 * * * * [misc]progress:  [ 206 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212461.562 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212461.562 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212461.570 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212461.596 * * [misc]simplify:  iters left: 4 (427 enodes)
1545212461.827 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (* (/ c0 h) (/ d (/ D d))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D)))))))))
1545212461.827 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* (* (/ c0 h) (/ d (/ D d))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212461.827 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212461.827 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212461.835 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212461.849 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212461.958 * [exit]simplify:  Simplified to (* (* D w) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212461.959 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* D w) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212461.959 * * * * [misc]progress:  [ 207 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212461.959 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212461.959 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212461.967 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212461.997 * * [misc]simplify:  iters left: 4 (412 enodes)
1545212462.237 * [exit]simplify:  Simplified to (+ (* (* (* (/ (* d c0) (* h w)) (/ d D)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212462.238 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (* d c0) (* h w)) (/ d D)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212462.238 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212462.238 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212462.243 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212462.257 * * [misc]simplify:  iters left: 4 (222 enodes)
1545212462.361 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))
1545212462.361 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))))
1545212462.361 * * * * [misc]progress:  [ 208 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212462.361 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212462.361 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212462.373 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212462.416 * * [misc]simplify:  iters left: 4 (431 enodes)
1545212462.949 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (/ d D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* d (/ c0 h)))))
1545212462.950 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (/ d D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* d (/ c0 h))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212462.950 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212462.950 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212462.955 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212462.969 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212463.091 * [exit]simplify:  Simplified to (* (* D w) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212463.091 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* D w) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212463.092 * * * * [misc]progress:  [ 209 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212463.092 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212463.093 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212463.107 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212463.154 * * [misc]simplify:  iters left: 4 (416 enodes)
1545212463.397 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 h) w) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ d D) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212463.397 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 h) w) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ d D) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212463.397 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212463.397 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212463.402 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212463.418 * * [misc]simplify:  iters left: 4 (222 enodes)
1545212463.518 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))
1545212463.518 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))))
1545212463.518 * * * * [misc]progress:  [ 210 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212463.518 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212463.519 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212463.526 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212463.554 * * [misc]simplify:  iters left: 4 (421 enodes)
1545212463.788 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (sqrt (sqrt (+ (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))) (* M M)))))) (* (* (/ d D) (/ d D)) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3)) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (sqrt (sqrt (* (- (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* M M)) (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) w))
1545212463.788 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 h) (sqrt (sqrt (+ (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))) (* M M)))))) (* (* (/ d D) (/ d D)) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3)) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (sqrt (sqrt (* (- (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* M M)) (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) w)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212463.788 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212463.789 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212463.793 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212463.807 * * [misc]simplify:  iters left: 4 (222 enodes)
1545212463.918 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212463.918 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212463.918 * * * * [misc]progress:  [ 211 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212463.919 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212463.919 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212463.928 * * [misc]simplify:  iters left: 5 (93 enodes)
1545212463.954 * * [misc]simplify:  iters left: 4 (341 enodes)
1545212464.127 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* w (* D D)))))
1545212464.127 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* w (* D D))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212464.127 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212464.127 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212464.131 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212464.145 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212464.203 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* D w) D) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212464.203 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* D w) D) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212464.203 * * * * [misc]progress:  [ 212 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212464.203 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212464.204 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212464.212 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212464.231 * * [misc]simplify:  iters left: 4 (316 enodes)
1545212464.389 * [exit]simplify:  Simplified to (+ (* (* D D) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* d (* d c0)) (* h w)))))
1545212464.389 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D D) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* d (* d c0)) (* h w))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212464.390 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212464.390 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212464.393 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212464.403 * * [misc]simplify:  iters left: 4 (150 enodes)
1545212464.457 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D)))
1545212464.457 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D))))))
1545212464.457 * * * * [misc]progress:  [ 213 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212464.457 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212464.457 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212464.464 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212464.484 * * [misc]simplify:  iters left: 4 (331 enodes)
1545212464.650 * [exit]simplify:  Simplified to (+ (* (* D w) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ (* d (/ c0 h)) (/ D d)))))
1545212464.650 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ (* d (/ c0 h)) (/ D d))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212464.651 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212464.651 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212464.654 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212464.664 * * [misc]simplify:  iters left: 4 (157 enodes)
1545212464.720 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w)))
1545212464.720 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w))))))
1545212464.720 * * * * [misc]progress:  [ 214 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212464.720 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212464.721 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212464.727 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212464.746 * * [misc]simplify:  iters left: 4 (314 enodes)
1545212464.915 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (/ c0 h) (/ D d)) (/ w d))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212464.915 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (/ c0 h) (/ D d)) (/ w d))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212464.915 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212464.916 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212464.919 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212464.930 * * [misc]simplify:  iters left: 4 (140 enodes)
1545212464.979 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212464.979 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212464.980 * * * * [misc]progress:  [ 215 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212464.980 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212464.980 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212464.987 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212465.008 * * [misc]simplify:  iters left: 4 (335 enodes)
1545212465.177 * [exit]simplify:  Simplified to (+ (* (* D w) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* c0 (/ d D)) (/ h d)))))
1545212465.177 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* c0 (/ d D)) (/ h d))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212465.177 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212465.178 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212465.181 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212465.191 * * [misc]simplify:  iters left: 4 (157 enodes)
1545212465.247 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w)))
1545212465.247 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w))))))
1545212465.247 * * * * [misc]progress:  [ 216 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212465.248 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212465.248 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212465.254 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212465.274 * * [misc]simplify:  iters left: 4 (320 enodes)
1545212465.445 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (/ d (/ D d))))) (* D (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212465.445 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (/ d (/ D d))))) (* D (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212465.446 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212465.446 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212465.449 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212465.460 * * [misc]simplify:  iters left: 4 (140 enodes)
1545212465.513 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212465.513 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212465.513 * * * * [misc]progress:  [ 217 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212465.513 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212465.513 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212465.519 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212465.539 * * [misc]simplify:  iters left: 4 (327 enodes)
1545212465.702 * [exit]simplify:  Simplified to (+ (* (/ (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) (/ D (* (* d (/ c0 h)) (/ d D)))) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* w (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))))))
1545212465.702 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) (/ D (* (* d (/ c0 h)) (/ d D)))) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* w (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212465.702 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212465.702 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212465.706 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212465.717 * * [misc]simplify:  iters left: 4 (140 enodes)
1545212465.767 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212465.767 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212465.767 * * * * [misc]progress:  [ 218 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))>
1545212465.768 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d)))
1545212465.768 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212465.776 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212465.805 * * [misc]simplify:  iters left: 4 (456 enodes)
1545212466.067 * [exit]simplify:  Simplified to (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212466.067 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))
1545212466.067 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D))
1545212466.067 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212466.072 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212466.091 * * [misc]simplify:  iters left: 4 (274 enodes)
1545212466.224 * [exit]simplify:  Simplified to (* (* (* (* D D) w) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212466.224 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (* (* D D) w) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212466.225 * * * * [misc]progress:  [ 219 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))>
1545212466.225 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212466.225 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212466.233 * * [misc]simplify:  iters left: 5 (114 enodes)
1545212466.260 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212466.529 * [exit]simplify:  Simplified to (+ (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ c0 (/ (* h w) (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212466.529 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ c0 (/ (* h w) (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))
1545212466.529 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D))
1545212466.529 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212466.534 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212466.549 * * [misc]simplify:  iters left: 4 (252 enodes)
1545212466.678 * [exit]simplify:  Simplified to (* (* D D) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212466.679 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212466.679 * * * * [misc]progress:  [ 220 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212466.679 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212466.679 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212466.687 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212466.715 * * [misc]simplify:  iters left: 4 (457 enodes)
1545212466.990 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* (/ c0 h) (* (/ d D) d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212466.991 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* (/ c0 h) (* (/ d D) d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212466.991 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212466.991 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212466.996 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212467.024 * * [misc]simplify:  iters left: 4 (259 enodes)
1545212467.150 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212467.151 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212467.151 * * * * [misc]progress:  [ 221 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212467.151 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212467.151 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212467.161 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212467.187 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212467.470 * [exit]simplify:  Simplified to (+ (* (* d (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (/ c0 h) (/ (/ d D) w)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))))))
1545212467.470 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (/ c0 h) (/ (/ d D) w)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212467.471 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212467.471 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212467.475 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212467.490 * * [misc]simplify:  iters left: 4 (244 enodes)
1545212467.609 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)
1545212467.609 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))))
1545212467.609 * * * * [misc]progress:  [ 222 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212467.609 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D))))
1545212467.609 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212467.617 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212467.644 * * [misc]simplify:  iters left: 4 (461 enodes)
1545212467.930 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ d D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* d (/ c0 h)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212467.930 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ d D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* d (/ c0 h)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212467.932 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212467.932 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212467.936 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212467.954 * * [misc]simplify:  iters left: 4 (259 enodes)
1545212468.080 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212468.080 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))))
1545212468.080 * * * * [misc]progress:  [ 223 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212468.080 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212468.081 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212468.091 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212468.117 * * [misc]simplify:  iters left: 4 (446 enodes)
1545212468.402 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 w) h) (sqrt (sqrt (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ d D) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212468.402 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 w) h) (sqrt (sqrt (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ d D) d) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212468.402 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212468.402 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212468.407 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212468.421 * * [misc]simplify:  iters left: 4 (244 enodes)
1545212468.574 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)
1545212468.574 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))))
1545212468.574 * * * * [misc]progress:  [ 224 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))>
1545212468.574 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212468.574 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212468.582 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212468.609 * * [misc]simplify:  iters left: 4 (453 enodes)
1545212468.887 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (pow M 3)) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)))) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (* M M)))))) w))
1545212468.887 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (- (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (pow M 3)) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)))) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (* M M)))))) w)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))
1545212468.887 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w)
1545212468.888 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212468.892 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212468.906 * * [misc]simplify:  iters left: 4 (244 enodes)
1545212469.027 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) w)
1545212469.027 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) w))))
1545212469.027 * * * * [misc]progress:  [ 225 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))>
1545212469.027 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d)))
1545212469.028 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212469.034 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212469.058 * * [misc]simplify:  iters left: 4 (359 enodes)
1545212469.249 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) D) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* D w))))
1545212469.249 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) D) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* D w)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))
1545212469.249 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D))
1545212469.249 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212469.253 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212469.267 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212469.323 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* D w) D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212469.323 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* D w) D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212469.324 * * * * [misc]progress:  [ 226 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212469.324 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212469.324 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212469.331 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212469.352 * * [misc]simplify:  iters left: 4 (346 enodes)
1545212469.555 * [exit]simplify:  Simplified to (+ (* (* D D) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d d) c0) (* h w)))))
1545212469.555 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D D) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d d) c0) (* h w))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212469.555 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212469.555 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212469.559 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212469.568 * * [misc]simplify:  iters left: 4 (150 enodes)
1545212469.621 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D)))
1545212469.621 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D))))))
1545212469.621 * * * * [misc]progress:  [ 227 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212469.621 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212469.621 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212469.629 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212469.649 * * [misc]simplify:  iters left: 4 (361 enodes)
1545212469.854 * [exit]simplify:  Simplified to (+ (* (* D w) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* d (/ c0 h)) (/ D d)))))
1545212469.854 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* d (/ c0 h)) (/ D d))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212469.854 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212469.854 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212469.858 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212469.867 * * [misc]simplify:  iters left: 4 (157 enodes)
1545212469.923 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w)))
1545212469.923 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w))))))
1545212469.923 * * * * [misc]progress:  [ 228 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212469.923 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212469.924 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212469.930 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212469.950 * * [misc]simplify:  iters left: 4 (344 enodes)
1545212470.163 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))) (/ (* d (/ c0 h)) (/ w (/ d D)))) (sqrt (sqrt (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))))) (* D (* (sqrt (sqrt (* (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M))))) (sqrt (sqrt (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M))))))))
1545212470.163 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))) (/ (* d (/ c0 h)) (/ w (/ d D)))) (sqrt (sqrt (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))))) (* D (* (sqrt (sqrt (* (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M))))) (sqrt (sqrt (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212470.163 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212470.163 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212470.167 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212470.175 * * [misc]simplify:  iters left: 4 (140 enodes)
1545212470.226 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212470.226 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212470.226 * * * * [misc]progress:  [ 229 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212470.226 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D))))
1545212470.227 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212470.233 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212470.254 * * [misc]simplify:  iters left: 4 (365 enodes)
1545212470.458 * [exit]simplify:  Simplified to (+ (* (* D w) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (* (/ d D) d) (/ c0 h)))))
1545212470.458 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (* (/ d D) d) (/ c0 h))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212470.458 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212470.458 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212470.462 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212470.472 * * [misc]simplify:  iters left: 4 (157 enodes)
1545212470.529 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w)))
1545212470.529 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w))))))
1545212470.529 * * * * [misc]progress:  [ 230 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212470.529 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212470.529 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212470.536 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212470.558 * * [misc]simplify:  iters left: 4 (350 enodes)
1545212470.771 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (/ (* d d) D)))) (* D (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))))
1545212470.771 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (/ (* d d) D)))) (* D (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212470.771 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212470.771 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212470.775 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212470.783 * * [misc]simplify:  iters left: 4 (140 enodes)
1545212470.832 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212470.832 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212470.832 * * * * [misc]progress:  [ 231 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212470.833 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212470.833 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212470.840 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212470.860 * * [misc]simplify:  iters left: 4 (357 enodes)
1545212471.070 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* w (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)))))) (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M))))))
1545212471.070 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* w (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)))))) (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)))))) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212471.070 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212471.070 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212471.073 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212471.082 * * [misc]simplify:  iters left: 4 (140 enodes)
1545212471.134 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212471.134 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212471.134 * * * * [misc]progress:  [ 232 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212471.134 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212471.134 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212471.143 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212471.170 * * [misc]simplify:  iters left: 4 (458 enodes)
1545212471.437 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))))))) (* (* (* D D) w) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))))
1545212471.437 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))))))) (* (* (* D D) w) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212471.437 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212471.437 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212471.443 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212471.461 * * [misc]simplify:  iters left: 4 (309 enodes)
1545212471.652 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D D) w)))
1545212471.652 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D D) w))))))
1545212471.652 * * * * [misc]progress:  [ 233 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212471.652 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212471.653 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212471.661 * * [misc]simplify:  iters left: 5 (114 enodes)
1545212471.687 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212471.951 * [exit]simplify:  Simplified to (+ (* (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212471.951 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212471.951 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212471.952 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212471.957 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212471.973 * * [misc]simplify:  iters left: 4 (285 enodes)
1545212472.144 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212472.144 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))))
1545212472.145 * * * * [misc]progress:  [ 234 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212472.145 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212472.145 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212472.153 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212472.180 * * [misc]simplify:  iters left: 4 (457 enodes)
1545212472.454 * [exit]simplify:  Simplified to (+ (* (* D w) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))))) (* (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (* (/ (* (/ d D) c0) (/ h d)) (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212472.454 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))))) (* (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (* (/ (* (/ d D) c0) (/ h d)) (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212472.455 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212472.455 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212472.460 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212472.477 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212472.651 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212472.651 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212472.651 * * * * [misc]progress:  [ 235 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212472.651 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212472.651 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212472.659 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212472.686 * * [misc]simplify:  iters left: 4 (454 enodes)
1545212472.987 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (* (- M) (* M M))) (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (pow M 3)))))) (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212472.988 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (* (- M) (* M M))) (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (pow M 3)))))) (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212472.988 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212472.988 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212472.996 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212473.012 * * [misc]simplify:  iters left: 4 (275 enodes)
1545212473.178 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212473.178 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212473.178 * * * * [misc]progress:  [ 236 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212473.179 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212473.179 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212473.187 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212473.217 * * [misc]simplify:  iters left: 4 (461 enodes)
1545212473.490 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (* (* (/ c0 h) (* d (/ d D))) (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212473.490 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (* (* (/ c0 h) (* d (/ d D))) (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212473.491 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212473.491 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212473.496 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212473.516 * * [misc]simplify:  iters left: 4 (292 enodes)
1545212473.688 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212473.688 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212473.688 * * * * [misc]progress:  [ 237 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212473.689 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212473.689 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212473.697 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212473.726 * * [misc]simplify:  iters left: 4 (460 enodes)
1545212474.284 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) D) (* (* (/ (/ (/ c0 w) h) (/ D (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212474.284 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) D) (* (* (/ (/ (/ c0 w) h) (/ D (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212474.284 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212474.284 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212474.289 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212474.305 * * [misc]simplify:  iters left: 4 (275 enodes)
1545212474.471 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212474.471 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212474.471 * * * * [misc]progress:  [ 238 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212474.472 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212474.472 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212474.480 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212474.506 * * [misc]simplify:  iters left: 4 (467 enodes)
1545212474.799 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))))))) w) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))))
1545212474.799 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))))))) w) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212474.799 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212474.799 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212474.804 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212474.820 * * [misc]simplify:  iters left: 4 (275 enodes)
1545212474.986 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212474.986 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212474.987 * * * * [misc]progress:  [ 239 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212474.987 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212474.987 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212474.996 * * [misc]simplify:  iters left: 5 (123 enodes)
1545212475.023 * * [misc]simplify:  iters left: 4 (462 enodes)
1545212475.293 * [exit]simplify:  Simplified to (+ (* (* (* D D) w) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M)))))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212475.293 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M)))))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212475.293 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212475.294 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212475.299 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212475.317 * * [misc]simplify:  iters left: 4 (294 enodes)
1545212475.473 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))) (* (* w (* D D)) (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212475.473 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))) (* (* w (* D D)) (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212475.473 * * * * [misc]progress:  [ 240 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212475.473 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212475.473 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212475.482 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212475.509 * * [misc]simplify:  iters left: 4 (446 enodes)
1545212475.757 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) D)))
1545212475.757 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) D))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212475.757 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212475.757 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212475.762 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212475.779 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212475.923 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* D D)) (sqrt (sqrt (* (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212475.924 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* D D)) (sqrt (sqrt (* (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))
1545212475.924 * * * * [misc]progress:  [ 241 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212475.924 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212475.924 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212475.933 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212475.960 * * [misc]simplify:  iters left: 4 (463 enodes)
1545212476.239 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ (* d c0) (* D h)) d) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))))
1545212476.239 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ (* d c0) (* D h)) d) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212476.239 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212476.239 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212476.245 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212476.264 * * [misc]simplify:  iters left: 4 (277 enodes)
1545212476.410 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* w D)) (sqrt (sqrt (* (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212476.410 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* w D)) (sqrt (sqrt (* (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212476.411 * * * * [misc]progress:  [ 242 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212476.411 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212476.411 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212476.419 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212476.446 * * [misc]simplify:  iters left: 4 (443 enodes)
1545212476.718 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D)) (* (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212476.718 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D)) (* (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212476.719 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212476.719 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212476.724 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212476.740 * * [misc]simplify:  iters left: 4 (262 enodes)
1545212476.876 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))))
1545212476.876 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))))))))
1545212476.876 * * * * [misc]progress:  [ 243 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212476.877 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212476.877 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212476.885 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212476.915 * * [misc]simplify:  iters left: 4 (465 enodes)
1545212477.172 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* (/ d D) (/ c0 h)) d) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))))
1545212477.172 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* (/ d D) (/ c0 h)) d) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212477.172 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212477.172 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212477.178 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212477.197 * * [misc]simplify:  iters left: 4 (277 enodes)
1545212477.345 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* w D)) (sqrt (sqrt (* (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212477.345 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* w D)) (sqrt (sqrt (* (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212477.346 * * * * [misc]progress:  [ 244 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212477.346 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212477.346 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212477.354 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212477.381 * * [misc]simplify:  iters left: 4 (450 enodes)
1545212477.650 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ (/ (/ c0 w) h) (/ D (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212477.650 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ (/ (/ c0 w) h) (/ D (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212477.651 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212477.651 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212477.656 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212477.672 * * [misc]simplify:  iters left: 4 (262 enodes)
1545212477.830 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))))
1545212477.830 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))))))))
1545212477.830 * * * * [misc]progress:  [ 245 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212477.831 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212477.831 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212477.842 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212477.869 * * [misc]simplify:  iters left: 4 (455 enodes)
1545212478.129 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* (/ d D) (/ c0 h)) (/ d D)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212478.129 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* (/ d D) (/ c0 h)) (/ d D)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212478.129 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212478.129 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212478.134 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212478.149 * * [misc]simplify:  iters left: 4 (262 enodes)
1545212478.289 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))) (* w (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))))
1545212478.289 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))) (* w (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))))))
1545212478.289 * * * * [misc]progress:  [ 246 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212478.289 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212478.290 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212478.298 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212478.324 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212478.593 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* D D) w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))))))
1545212478.593 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* D D) w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212478.593 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212478.593 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212478.598 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212478.616 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212478.754 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* w (* D D))))
1545212478.754 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* w (* D D)))))))
1545212478.754 * * * * [misc]progress:  [ 247 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212478.755 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212478.755 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212478.762 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212478.787 * * [misc]simplify:  iters left: 4 (430 enodes)
1545212479.044 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))))))
1545212479.044 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212479.044 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212479.045 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212479.049 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212479.063 * * [misc]simplify:  iters left: 4 (247 enodes)
1545212479.194 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* D D)))
1545212479.194 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* D D))))))
1545212479.194 * * * * [misc]progress:  [ 248 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212479.195 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212479.195 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212479.202 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212479.227 * * [misc]simplify:  iters left: 4 (441 enodes)
1545212479.500 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ (/ c0 (/ h d)) (/ D d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* D w)))
1545212479.500 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ (/ c0 (/ h d)) (/ D d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* D w))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212479.501 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212479.501 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212479.505 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212479.520 * * [misc]simplify:  iters left: 4 (254 enodes)
1545212479.653 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* w D)))
1545212479.653 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* w D))))))
1545212479.653 * * * * [misc]progress:  [ 249 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212479.653 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212479.654 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212479.661 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212479.688 * * [misc]simplify:  iters left: 4 (428 enodes)
1545212479.959 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))))
1545212479.959 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212479.959 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212479.959 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212479.964 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212479.981 * * [misc]simplify:  iters left: 4 (237 enodes)
1545212480.104 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))
1545212480.104 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))))))
1545212480.104 * * * * [misc]progress:  [ 250 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212480.104 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212480.105 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212480.115 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212480.140 * * [misc]simplify:  iters left: 4 (445 enodes)
1545212480.408 * [exit]simplify:  Simplified to (+ (* (* (/ (/ (* d c0) h) (/ D d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* D w)))
1545212480.408 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ (* d c0) h) (/ D d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* D w))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212480.408 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212480.408 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212480.413 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212480.427 * * [misc]simplify:  iters left: 4 (254 enodes)
1545212480.562 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* w D)))
1545212480.562 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* w D))))))
1545212480.562 * * * * [misc]progress:  [ 251 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212480.562 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212480.563 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212480.570 * * [misc]simplify:  iters left: 5 (106 enodes)
1545212480.595 * * [misc]simplify:  iters left: 4 (434 enodes)
1545212480.867 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) D) (* (* (/ (* d c0) (* (/ D d) (* w h))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212480.867 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) D) (* (* (/ (* d c0) (* (/ D d) (* w h))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212480.867 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212480.868 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212480.872 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212480.885 * * [misc]simplify:  iters left: 4 (237 enodes)
1545212481.011 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))
1545212481.011 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))))))
1545212481.011 * * * * [misc]progress:  [ 252 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212481.012 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212481.012 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212481.019 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212481.047 * * [misc]simplify:  iters left: 4 (441 enodes)
1545212481.314 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)) (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))))) (* (sqrt (sqrt (* (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))))
1545212481.314 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)) (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))))) (* (sqrt (sqrt (* (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212481.314 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212481.318 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212481.322 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212481.335 * * [misc]simplify:  iters left: 4 (237 enodes)
1545212481.460 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* w (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))
1545212481.460 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* w (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))))))
1545212481.460 * * * * [misc]progress:  [ 253 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212481.460 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212481.461 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212481.469 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212481.496 * * [misc]simplify:  iters left: 4 (439 enodes)
1545212481.727 * [exit]simplify:  Simplified to (+ (* (* (* D D) w) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212481.727 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212481.727 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212481.727 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212481.732 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212481.750 * * [misc]simplify:  iters left: 4 (248 enodes)
1545212481.863 * [exit]simplify:  Simplified to (* (* D (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))
1545212481.863 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* D (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))))))
1545212481.863 * * * * [misc]progress:  [ 254 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212481.863 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212481.864 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212481.872 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212481.899 * * [misc]simplify:  iters left: 4 (412 enodes)
1545212482.124 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) d) (* (* (/ c0 w) (/ d h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))))
1545212482.124 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) d) (* (* (/ c0 w) (/ d h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212482.125 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212482.125 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212482.129 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212482.143 * * [misc]simplify:  iters left: 4 (226 enodes)
1545212482.250 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))
1545212482.250 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))))
1545212482.250 * * * * [misc]progress:  [ 255 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212482.250 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212482.250 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212482.258 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212482.284 * * [misc]simplify:  iters left: 4 (427 enodes)
1545212482.530 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) d) (* (* (/ d D) (/ c0 h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))))
1545212482.530 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) d) (* (* (/ d D) (/ c0 h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212482.530 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212482.530 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212482.535 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212482.552 * * [misc]simplify:  iters left: 4 (233 enodes)
1545212482.660 * [exit]simplify:  Simplified to (* (* w D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))
1545212482.660 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* w D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))))
1545212482.660 * * * * [misc]progress:  [ 256 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212482.660 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212482.661 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212482.668 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212482.696 * * [misc]simplify:  iters left: 4 (412 enodes)
1545212482.943 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* (/ c0 w) (/ d h)) (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D)))
1545212482.943 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* (/ c0 w) (/ d h)) (/ d D))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) D))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212482.943 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212482.943 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212482.948 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212482.961 * * [misc]simplify:  iters left: 4 (218 enodes)
1545212483.062 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212483.062 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212483.062 * * * * [misc]progress:  [ 257 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212483.062 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212483.063 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212483.071 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212483.097 * * [misc]simplify:  iters left: 4 (431 enodes)
1545212483.346 * [exit]simplify:  Simplified to (+ (* (* D w) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (/ d (/ D d)) (/ c0 h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))
1545212483.346 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (/ d (/ D d)) (/ c0 h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212483.347 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212483.347 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212483.352 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212483.366 * * [misc]simplify:  iters left: 4 (233 enodes)
1545212483.476 * [exit]simplify:  Simplified to (* (* w D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))
1545212483.476 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* w D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))))
1545212483.476 * * * * [misc]progress:  [ 258 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212483.476 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212483.476 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212483.484 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212483.510 * * [misc]simplify:  iters left: 4 (416 enodes)
1545212483.751 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 w) h) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* d (/ d D)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))))))
1545212483.751 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 w) h) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* d (/ d D)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212483.751 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212483.752 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212483.756 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212483.772 * * [misc]simplify:  iters left: 4 (218 enodes)
1545212483.872 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212483.872 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212483.872 * * * * [misc]progress:  [ 259 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212483.872 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212483.873 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212483.880 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212483.909 * * [misc]simplify:  iters left: 4 (425 enodes)
1545212484.142 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* w (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3))))))))
1545212484.142 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* w (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212484.142 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212484.142 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212484.147 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212484.160 * * [misc]simplify:  iters left: 4 (218 enodes)
1545212484.258 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212484.258 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212484.258 * * * * [misc]progress:  [ 260 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212484.258 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212484.258 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212484.267 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212484.287 * * [misc]simplify:  iters left: 4 (318 enodes)
1545212484.437 * [exit]simplify:  Simplified to (+ (* (* w (* D D)) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) (* (* (/ c0 h) (* d d)) (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212484.437 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) (* (* (/ c0 h) (* d d)) (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212484.437 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212484.437 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212484.441 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212484.453 * * [misc]simplify:  iters left: 4 (185 enodes)
1545212484.526 * [exit]simplify:  Simplified to (* (* D (* w D)) (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))
1545212484.526 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) (* (* (/ c0 h) (* d d)) (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D (* w D)) (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))
1545212484.526 * * * * [misc]progress:  [ 261 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212484.527 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212484.527 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212484.533 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212484.554 * * [misc]simplify:  iters left: 4 (306 enodes)
1545212484.700 * [exit]simplify:  Simplified to (+ (* (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d d) (/ c0 w)) h)) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))) (* D D)))
1545212484.700 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d d) (/ c0 w)) h)) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))) (* D D))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212484.700 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212484.700 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212484.704 * * [misc]simplify:  iters left: 5 (50 enodes)
1545212484.714 * * [misc]simplify:  iters left: 4 (167 enodes)
1545212484.781 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))) (* D D))
1545212484.781 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d d) (/ c0 w)) h)) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))) (* D D))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))) (* D D)))))
1545212484.781 * * * * [misc]progress:  [ 262 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212484.782 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212484.782 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212484.788 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212484.808 * * [misc]simplify:  iters left: 4 (321 enodes)
1545212484.960 * [exit]simplify:  Simplified to (+ (* (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ c0 h) (* d d)) D)) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))) (* D w)))
1545212484.960 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ c0 h) (* d d)) D)) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))) (* D w))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212484.960 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212484.961 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212484.964 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212484.975 * * [misc]simplify:  iters left: 4 (174 enodes)
1545212485.045 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))) (* w D))
1545212485.046 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ c0 h) (* d d)) D)) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))) (* D w))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))) (* w D)))))
1545212485.046 * * * * [misc]progress:  [ 263 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212485.046 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212485.046 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212485.053 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212485.071 * * [misc]simplify:  iters left: 4 (309 enodes)
1545212485.233 * [exit]simplify:  Simplified to (+ (* (* (/ c0 (* w h)) (* d (/ d D))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) D))
1545212485.233 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (* d (/ d D))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212485.233 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212485.234 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212485.497 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212485.507 * * [misc]simplify:  iters left: 4 (159 enodes)
1545212485.574 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) D)
1545212485.574 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (* d (/ d D))) (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) D))))
1545212485.574 * * * * [misc]progress:  [ 264 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212485.575 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212485.575 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212485.581 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212485.601 * * [misc]simplify:  iters left: 4 (323 enodes)
1545212485.755 * [exit]simplify:  Simplified to (+ (* (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (* d c0) (/ d D)) h)) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) (* D w)))
1545212485.755 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (* d c0) (/ d D)) h)) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) (* D w))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212485.755 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212485.755 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212485.759 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212485.770 * * [misc]simplify:  iters left: 4 (174 enodes)
1545212485.839 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))) (* w D))
1545212485.839 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (* d c0) (/ d D)) h)) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) (* D w))) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))) (* w D)))))
1545212485.839 * * * * [misc]progress:  [ 265 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212485.840 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212485.840 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212485.848 * * [misc]simplify:  iters left: 5 (83 enodes)
1545212485.867 * * [misc]simplify:  iters left: 4 (314 enodes)
1545212486.024 * [exit]simplify:  Simplified to (+ (/ (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ D (* (/ c0 (* w h)) (* d d)))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) D))
1545212486.024 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ D (* (/ c0 (* w h)) (* d d)))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212486.024 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212486.025 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212486.028 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212486.038 * * [misc]simplify:  iters left: 4 (159 enodes)
1545212486.106 * [exit]simplify:  Simplified to (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) D)
1545212486.106 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (/ D (* (/ c0 (* w h)) (* d d)))) (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))) D)) (* (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))) D))))
1545212486.106 * * * * [misc]progress:  [ 266 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212486.106 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212486.107 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212486.113 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212486.134 * * [misc]simplify:  iters left: 4 (321 enodes)
1545212486.294 * [exit]simplify:  Simplified to (+ (* (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (* (/ c0 h) (* (/ d D) (/ d D)))) (* w (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M)))))))
1545212486.294 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (* (/ c0 h) (* (/ d D) (/ d D)))) (* w (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212486.295 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212486.295 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212486.298 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212486.308 * * [misc]simplify:  iters left: 4 (159 enodes)
1545212486.376 * [exit]simplify:  Simplified to (* w (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))
1545212486.376 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))) (* (/ c0 h) (* (/ d D) (/ d D)))) (* w (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))))) (* w (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))))
1545212486.376 * * * * [misc]progress:  [ 267 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212486.376 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212486.376 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212486.384 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212486.408 * * [misc]simplify:  iters left: 4 (360 enodes)
1545212486.581 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (* d d) (/ c0 h)))))
1545212486.582 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (* d d) (/ c0 h))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212486.582 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212486.582 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212486.586 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212486.599 * * [misc]simplify:  iters left: 4 (197 enodes)
1545212486.678 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* D (* w D)) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212486.679 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* D (* w D)) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))
1545212486.679 * * * * [misc]progress:  [ 268 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212486.679 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212486.680 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212486.690 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212486.711 * * [misc]simplify:  iters left: 4 (351 enodes)
1545212486.880 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* D D)) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* c0 (* d d)) (* w h))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))
1545212486.880 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* D D)) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* c0 (* d d)) (* w h))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212486.880 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212486.880 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212486.884 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212486.895 * * [misc]simplify:  iters left: 4 (171 enodes)
1545212486.965 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* D D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212486.965 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* D D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212486.966 * * * * [misc]progress:  [ 269 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212486.966 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212486.966 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212486.975 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212486.998 * * [misc]simplify:  iters left: 4 (366 enodes)
1545212487.175 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (* D w)) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d c0) h) (/ d D))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))
1545212487.175 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (* D w)) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d c0) h) (/ d D))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212487.175 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212487.175 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212487.180 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212487.194 * * [misc]simplify:  iters left: 4 (178 enodes)
1545212487.265 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212487.265 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))
1545212487.265 * * * * [misc]progress:  [ 270 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212487.265 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212487.266 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212487.273 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212487.294 * * [misc]simplify:  iters left: 4 (345 enodes)
1545212487.473 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212487.473 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212487.473 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212487.473 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212487.477 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212487.487 * * [misc]simplify:  iters left: 4 (163 enodes)
1545212487.553 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212487.553 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212487.553 * * * * [misc]progress:  [ 271 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212487.554 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212487.554 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212487.561 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212487.583 * * [misc]simplify:  iters left: 4 (366 enodes)
1545212487.765 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d c0) (/ d D)) h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))
1545212487.765 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d c0) (/ d D)) h)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212487.765 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212487.765 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212487.770 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212487.781 * * [misc]simplify:  iters left: 4 (178 enodes)
1545212487.852 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212487.852 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))
1545212487.852 * * * * [misc]progress:  [ 272 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212487.852 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212487.853 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212487.860 * * [misc]simplify:  iters left: 5 (96 enodes)
1545212487.881 * * [misc]simplify:  iters left: 4 (346 enodes)
1545212488.065 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* (* (* (/ d w) (/ c0 h)) (/ d D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212488.065 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* (* (* (/ d w) (/ c0 h)) (/ d D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212488.065 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212488.066 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212488.069 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212488.080 * * [misc]simplify:  iters left: 4 (163 enodes)
1545212488.147 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212488.147 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212488.147 * * * * [misc]progress:  [ 273 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212488.148 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212488.148 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212488.155 * * [misc]simplify:  iters left: 5 (97 enodes)
1545212488.179 * * [misc]simplify:  iters left: 4 (357 enodes)
1545212488.359 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212488.359 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212488.360 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212488.361 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212488.365 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212488.375 * * [misc]simplify:  iters left: 4 (163 enodes)
1545212488.442 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212488.442 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212488.442 * * * * [misc]progress:  [ 274 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))>
1545212488.442 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d)))
1545212488.442 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212488.453 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212488.478 * * [misc]simplify:  iters left: 4 (411 enodes)
1545212488.691 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))))))))
1545212488.691 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))
1545212488.692 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D))
1545212488.692 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212488.697 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212488.711 * * [misc]simplify:  iters left: 4 (244 enodes)
1545212488.826 * [exit]simplify:  Simplified to (* (* D (* w D)) (* (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) (sqrt (sqrt (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))))
1545212488.826 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* D (* w D)) (* (sqrt (sqrt (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) (sqrt (sqrt (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))))))))
1545212488.826 * * * * [misc]progress:  [ 275 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))>
1545212488.826 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212488.827 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212488.835 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212488.860 * * [misc]simplify:  iters left: 4 (391 enodes)
1545212489.065 * [exit]simplify:  Simplified to (+ (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))))) (* (* d (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) (* (/ c0 h) (/ d w)))))
1545212489.065 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))))) (* (* d (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) (* (/ c0 h) (/ d w))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))
1545212489.065 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D))
1545212489.066 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212489.070 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212489.084 * * [misc]simplify:  iters left: 4 (222 enodes)
1545212489.188 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* D D)))
1545212489.188 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* D D))))))
1545212489.188 * * * * [misc]progress:  [ 276 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212489.189 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212489.189 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212489.197 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212489.221 * * [misc]simplify:  iters left: 4 (404 enodes)
1545212489.442 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* (* d (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (/ d D) (/ c0 h)))))
1545212489.442 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* (* d (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (/ d D) (/ c0 h))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212489.442 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212489.443 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212489.447 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212489.461 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212489.564 * [exit]simplify:  Simplified to (* (* w D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212489.564 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* w D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212489.564 * * * * [misc]progress:  [ 277 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212489.564 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212489.565 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212489.572 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212489.598 * * [misc]simplify:  iters left: 4 (385 enodes)
1545212489.820 * [exit]simplify:  Simplified to (+ (* (* d (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ (/ d D) h) (/ c0 w)) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D)))
1545212489.820 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ (/ d D) h) (/ c0 w)) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212489.821 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212489.821 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212489.825 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212489.838 * * [misc]simplify:  iters left: 4 (214 enodes)
1545212489.933 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212489.934 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212489.934 * * * * [misc]progress:  [ 278 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212489.936 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D))))
1545212489.937 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212489.944 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212489.969 * * [misc]simplify:  iters left: 4 (406 enodes)
1545212490.185 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (/ d D)) (* (/ (* d c0) h) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))))
1545212490.185 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (/ d D)) (* (/ (* d c0) h) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212490.185 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212490.185 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212490.190 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212490.205 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212490.311 * [exit]simplify:  Simplified to (* (* w D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212490.311 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* w D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212490.311 * * * * [misc]progress:  [ 279 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212490.312 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212490.312 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212490.320 * * [misc]simplify:  iters left: 5 (106 enodes)
1545212490.344 * * [misc]simplify:  iters left: 4 (395 enodes)
1545212490.571 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 h) w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (/ d (/ D d)) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))))
1545212490.571 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 h) w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (/ d (/ D d)) (sqrt (sqrt (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212490.571 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212490.572 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212490.579 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212490.592 * * [misc]simplify:  iters left: 4 (214 enodes)
1545212490.687 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212490.687 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212490.687 * * * * [misc]progress:  [ 280 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))>
1545212490.687 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212490.688 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212490.695 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212490.722 * * [misc]simplify:  iters left: 4 (402 enodes)
1545212490.943 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* w (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))))
1545212490.943 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* w (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))
1545212490.943 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w)
1545212490.943 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212490.948 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212490.961 * * [misc]simplify:  iters left: 4 (214 enodes)
1545212491.056 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212491.056 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212491.056 * * * * [misc]progress:  [ 281 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))>
1545212491.056 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d)))
1545212491.056 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212491.064 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212491.089 * * [misc]simplify:  iters left: 4 (389 enodes)
1545212491.295 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D (* D w)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))))
1545212491.295 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D (* D w)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))
1545212491.295 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D))
1545212491.295 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212491.299 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212491.312 * * [misc]simplify:  iters left: 4 (215 enodes)
1545212491.396 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* D (* w D)) (sqrt (sqrt (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212491.396 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* D (* w D)) (sqrt (sqrt (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212491.396 * * * * [misc]progress:  [ 282 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212491.397 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212491.397 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212491.404 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212491.430 * * [misc]simplify:  iters left: 4 (377 enodes)
1545212491.621 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* D D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ c0 h) (/ w (* d d))))))
1545212491.621 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* D D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ c0 h) (/ w (* d d)))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212491.621 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212491.621 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212491.625 * * [misc]simplify:  iters left: 5 (56 enodes)
1545212491.640 * * [misc]simplify:  iters left: 4 (189 enodes)
1545212491.717 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* D D) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212491.717 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* D D) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))
1545212491.717 * * * * [misc]progress:  [ 283 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212491.717 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212491.718 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212491.725 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212491.749 * * [misc]simplify:  iters left: 4 (394 enodes)
1545212491.950 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 (/ h d)) (/ d D)))))
1545212491.950 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 (/ h d)) (/ d D))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212491.950 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212491.950 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212491.954 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212491.966 * * [misc]simplify:  iters left: 4 (196 enodes)
1545212492.043 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212492.043 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212492.043 * * * * [misc]progress:  [ 284 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212492.043 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212492.044 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212492.051 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212492.075 * * [misc]simplify:  iters left: 4 (377 enodes)
1545212492.288 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (/ d D) (/ c0 h)) (/ w d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))
1545212492.288 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (/ d D) (/ c0 h)) (/ w d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212492.288 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212492.289 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212492.293 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212492.303 * * [misc]simplify:  iters left: 4 (181 enodes)
1545212492.375 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))
1545212492.375 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))))
1545212492.376 * * * * [misc]progress:  [ 285 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212492.376 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D))))
1545212492.376 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212492.384 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212492.406 * * [misc]simplify:  iters left: 4 (396 enodes)
1545212492.610 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* D w) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (* d (/ d D)) (/ c0 h)))))
1545212492.610 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (* D w) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (* d (/ d D)) (/ c0 h))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212492.610 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212492.610 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212492.614 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212492.629 * * [misc]simplify:  iters left: 4 (196 enodes)
1545212492.706 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212492.706 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212492.706 * * * * [misc]progress:  [ 286 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212492.707 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212492.707 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212492.714 * * [misc]simplify:  iters left: 5 (101 enodes)
1545212492.737 * * [misc]simplify:  iters left: 4 (381 enodes)
1545212492.942 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ d (/ D d)) (/ c0 (* w h))))))
1545212492.942 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ d (/ D d)) (/ c0 (* w h)))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212492.942 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212492.942 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212492.946 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212492.957 * * [misc]simplify:  iters left: 4 (181 enodes)
1545212493.031 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))
1545212493.031 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))))
1545212493.031 * * * * [misc]progress:  [ 287 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212493.031 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212493.031 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212493.039 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212493.064 * * [misc]simplify:  iters left: 4 (388 enodes)
1545212493.271 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))
1545212493.271 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212493.271 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212493.271 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212493.275 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212493.286 * * [misc]simplify:  iters left: 4 (181 enodes)
1545212493.358 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))
1545212493.358 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))))
1545212493.358 * * * * [misc]progress:  [ 288 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212493.359 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212493.359 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212493.368 * * [misc]simplify:  iters left: 5 (123 enodes)
1545212493.399 * * [misc]simplify:  iters left: 4 (469 enodes)
1545212493.686 * [exit]simplify:  Simplified to (+ (* (* (* D D) w) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ (* d c0) (/ h d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))))))))
1545212493.686 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ (* d c0) (/ h d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212493.686 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212493.686 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212493.692 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212493.710 * * [misc]simplify:  iters left: 4 (308 enodes)
1545212493.893 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (* w (* D D)) (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))))
1545212493.893 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (* w (* D D)) (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))))))))
1545212493.893 * * * * [misc]progress:  [ 289 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212493.893 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212493.894 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212493.905 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212493.932 * * [misc]simplify:  iters left: 4 (462 enodes)
1545212494.209 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (/ (* (/ c0 h) (* d d)) w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (* D D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212494.209 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (/ (* (/ c0 h) (* d d)) w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (* D D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212494.209 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212494.210 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212494.215 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212494.231 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212494.407 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D)) (sqrt (sqrt (* (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))
1545212494.408 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D)) (sqrt (sqrt (* (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))))))
1545212494.408 * * * * [misc]progress:  [ 290 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212494.408 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212494.408 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212494.417 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212494.445 * * [misc]simplify:  iters left: 4 (479 enodes)
1545212494.740 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (/ (/ (* d c0) h) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))))
1545212494.741 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (/ (/ (* d c0) h) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212494.741 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212494.741 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212494.746 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212494.766 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212494.946 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))
1545212494.946 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D))))))
1545212494.946 * * * * [misc]progress:  [ 291 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212494.947 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212494.947 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212494.955 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212494.985 * * [misc]simplify:  iters left: 4 (450 enodes)
1545212495.269 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) D)) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212495.269 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) D)) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212495.270 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212495.270 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212495.275 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212495.291 * * [misc]simplify:  iters left: 4 (276 enodes)
1545212495.462 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))))
1545212495.463 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))))))
1545212495.463 * * * * [misc]progress:  [ 292 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212495.463 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212495.463 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212495.472 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212495.502 * * [misc]simplify:  iters left: 4 (481 enodes)
1545212495.786 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (* (* (/ c0 h) (/ (* d d) D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))))
1545212495.786 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (* (* (/ c0 h) (/ (* d d) D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212495.786 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212495.786 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212495.791 * * [misc]simplify:  iters left: 5 (74 enodes)
1545212495.808 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212495.991 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))
1545212495.991 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D))))))
1545212495.991 * * * * [misc]progress:  [ 293 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212495.992 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212495.992 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212496.000 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212496.027 * * [misc]simplify:  iters left: 4 (452 enodes)
1545212496.308 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (* (* (/ (* (/ c0 w) (/ d h)) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212496.308 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (* (* (/ (* (/ c0 w) (/ d h)) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212496.308 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212496.308 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212496.313 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212496.329 * * [misc]simplify:  iters left: 4 (276 enodes)
1545212496.503 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))))
1545212496.503 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))))))
1545212496.503 * * * * [misc]progress:  [ 294 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212496.504 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212496.504 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212496.512 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212496.540 * * [misc]simplify:  iters left: 4 (461 enodes)
1545212497.073 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (pow M 3)) (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))) (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* (/ d D) (/ c0 h)) (/ d D)) (sqrt (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))))))))
1545212497.073 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (pow M 3)) (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))) (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* (/ d D) (/ c0 h)) (/ d D)) (sqrt (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212497.073 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212497.073 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212497.078 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212497.098 * * [misc]simplify:  iters left: 4 (276 enodes)
1545212497.269 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))))))))
1545212497.269 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))))))))))
1545212497.270 * * * * [misc]progress:  [ 295 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212497.270 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212497.270 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212497.278 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212497.305 * * [misc]simplify:  iters left: 4 (424 enodes)
1545212497.544 * [exit]simplify:  Simplified to (+ (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* w (* D D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212497.544 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* w (* D D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212497.544 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212497.544 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212497.549 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212497.565 * * [misc]simplify:  iters left: 4 (271 enodes)
1545212497.707 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w (* D D))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212497.707 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w (* D D))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212497.707 * * * * [misc]progress:  [ 296 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212497.707 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212497.708 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212497.715 * * [misc]simplify:  iters left: 5 (106 enodes)
1545212497.742 * * [misc]simplify:  iters left: 4 (410 enodes)
1545212497.977 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* d d) (/ c0 (* w h))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))))
1545212497.977 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* d d) (/ c0 (* w h))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212497.977 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212497.978 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212497.982 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212497.996 * * [misc]simplify:  iters left: 4 (249 enodes)
1545212498.133 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (* (* D D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212498.133 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (* (* D D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212498.133 * * * * [misc]progress:  [ 297 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212498.134 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212498.134 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212498.141 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212498.169 * * [misc]simplify:  iters left: 4 (427 enodes)
1545212498.412 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (/ (* d d) D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) D) (* w (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))
1545212498.412 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (/ (* d d) D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) D) (* w (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212498.412 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212498.413 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212498.417 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212498.431 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212498.570 * [exit]simplify:  Simplified to (* (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212498.570 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212498.570 * * * * [misc]progress:  [ 298 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212498.571 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212498.571 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212498.581 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212498.605 * * [misc]simplify:  iters left: 4 (417 enodes)
1545212498.856 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) D)) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212498.856 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3))))) D)) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212498.856 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212498.857 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212498.864 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212498.878 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212499.009 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) D))
1545212499.009 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) D)))))
1545212499.010 * * * * [misc]progress:  [ 299 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212499.010 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212499.010 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212499.018 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212499.044 * * [misc]simplify:  iters left: 4 (431 enodes)
1545212499.299 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (/ (* d c0) (* (/ D d) h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)))))) (* D w)))
1545212499.299 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (/ (* d c0) (* (/ D d) h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)))))) (* D w))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212499.300 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212499.300 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212499.304 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212499.319 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212499.457 * [exit]simplify:  Simplified to (* (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212499.457 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212499.457 * * * * [misc]progress:  [ 300 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212499.457 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212499.458 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212499.465 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212499.489 * * [misc]simplify:  iters left: 4 (424 enodes)
1545212499.744 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212499.744 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212499.744 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212499.744 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212499.749 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212499.763 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212499.894 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) D))
1545212499.894 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) D)))))
1545212499.894 * * * * [misc]progress:  [ 301 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212499.895 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212499.895 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212499.902 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212499.927 * * [misc]simplify:  iters left: 4 (429 enodes)
1545212500.174 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))))
1545212500.174 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212500.174 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212500.175 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212500.179 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212500.192 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212500.322 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* w (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D))))))))
1545212500.322 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* w (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))))))))
1545212500.323 * * * * [misc]progress:  [ 302 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212500.323 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212500.323 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212500.331 * * [misc]simplify:  iters left: 5 (118 enodes)
1545212500.361 * * [misc]simplify:  iters left: 4 (451 enodes)
1545212500.625 * [exit]simplify:  Simplified to (+ (* (* (* D D) w) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212500.625 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212500.626 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212500.626 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212500.631 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212500.646 * * [misc]simplify:  iters left: 4 (263 enodes)
1545212500.785 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) (* (* D D) w)))
1545212500.785 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (/ c0 (* w h)) (* (/ d D) (/ d D))) (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ M (* (/ c0 (* w h)) (* (/ d D) (/ d D)))))) (* (* D D) w))))))
1545212500.785 * * * * [misc]progress:  [ 303 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212500.785 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212500.786 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212500.797 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212500.823 * * [misc]simplify:  iters left: 4 (437 enodes)
1545212501.076 * [exit]simplify:  Simplified to (+ (* (* (* D D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* c0 (* d d)) (* w h))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212501.076 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* c0 (* d d)) (* w h))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212501.076 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212501.076 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212501.084 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212501.098 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212501.223 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D)))
1545212501.223 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D))))))
1545212501.223 * * * * [misc]progress:  [ 304 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212501.223 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212501.224 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212501.232 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212501.257 * * [misc]simplify:  iters left: 4 (450 enodes)
1545212501.538 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (* d c0) D) (/ h d)))))
1545212501.538 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (* d c0) D) (/ h d))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212501.538 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212501.538 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212501.543 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212501.557 * * [misc]simplify:  iters left: 4 (246 enodes)
1545212501.685 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) (* w D)) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))
1545212501.685 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) (* w D)) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))))))
1545212501.685 * * * * [misc]progress:  [ 305 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212501.685 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212501.685 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212501.693 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212501.721 * * [misc]simplify:  iters left: 4 (437 enodes)
1545212501.992 * [exit]simplify:  Simplified to (+ (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) D))
1545212501.992 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212501.992 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212501.992 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212501.997 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212502.013 * * [misc]simplify:  iters left: 4 (233 enodes)
1545212502.134 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))
1545212502.134 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))))
1545212502.134 * * * * [misc]progress:  [ 306 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212502.134 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212502.134 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212502.142 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212502.170 * * [misc]simplify:  iters left: 4 (456 enodes)
1545212502.456 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (* d c0) (/ h d)) D))))
1545212502.456 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (* d c0) (/ h d)) D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212502.457 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212502.457 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212502.461 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212502.476 * * [misc]simplify:  iters left: 4 (246 enodes)
1545212502.604 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) (* w D)) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))
1545212502.604 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) (* w D)) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))))))
1545212502.604 * * * * [misc]progress:  [ 307 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212502.604 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212502.604 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212502.612 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212502.638 * * [misc]simplify:  iters left: 4 (441 enodes)
1545212502.913 * [exit]simplify:  Simplified to (+ (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212502.913 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212502.914 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212502.914 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212502.918 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212502.932 * * [misc]simplify:  iters left: 4 (233 enodes)
1545212503.056 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))
1545212503.056 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))))
1545212503.056 * * * * [misc]progress:  [ 308 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212503.056 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212503.057 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212503.064 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212503.093 * * [misc]simplify:  iters left: 4 (450 enodes)
1545212503.356 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h))))))) (sqrt (sqrt (* (- M (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) (* (/ (/ d D) w) (* (/ d D) (/ c0 h))))))))) (* w (* (sqrt (sqrt (* (+ (pow (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) 3) (* (- M) (* M M))) (- (* M M) (* (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))))))) (sqrt (sqrt (* (- (* (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))) (* M M)) (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h))))))))))
1545212503.356 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h))))))) (sqrt (sqrt (* (- M (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) (* (/ (/ d D) w) (* (/ d D) (/ c0 h))))))))) (* w (* (sqrt (sqrt (* (+ (pow (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) 3) (* (- M) (* M M))) (- (* M M) (* (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))))))) (sqrt (sqrt (* (- (* (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))) (* M M)) (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212503.356 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212503.356 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212503.361 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212503.377 * * [misc]simplify:  iters left: 4 (233 enodes)
1545212503.498 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))
1545212503.499 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))))))
1545212503.500 * * * * [misc]progress:  [ 309 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212503.500 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212503.500 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212503.510 * * [misc]simplify:  iters left: 5 (93 enodes)
1545212503.529 * * [misc]simplify:  iters left: 4 (341 enodes)
1545212503.700 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D w) D))))
1545212503.700 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* D w) D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212503.700 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212503.701 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212503.704 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212503.715 * * [misc]simplify:  iters left: 4 (168 enodes)
1545212503.775 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* D D) w)))
1545212503.775 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* D D) w))))))
1545212503.775 * * * * [misc]progress:  [ 310 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212503.775 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212503.775 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212503.782 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212503.804 * * [misc]simplify:  iters left: 4 (316 enodes)
1545212503.957 * [exit]simplify:  Simplified to (+ (* (* D D) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (* d d) (/ (/ c0 w) h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212503.957 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D D) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (* d d) (/ (/ c0 w) h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212503.958 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212503.958 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212503.961 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212503.970 * * [misc]simplify:  iters left: 4 (148 enodes)
1545212504.023 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D)))
1545212504.023 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D))))))
1545212504.023 * * * * [misc]progress:  [ 311 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212504.023 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212504.024 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212504.030 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212504.050 * * [misc]simplify:  iters left: 4 (331 enodes)
1545212504.213 * [exit]simplify:  Simplified to (+ (* (* D w) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (/ d D) (/ (* d c0) h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212504.214 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (/ d D) (/ (* d c0) h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212504.214 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212504.214 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212504.217 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212504.230 * * [misc]simplify:  iters left: 4 (155 enodes)
1545212504.283 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))
1545212504.283 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D))))))
1545212504.284 * * * * [misc]progress:  [ 312 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212504.284 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212504.284 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212504.290 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212504.311 * * [misc]simplify:  iters left: 4 (314 enodes)
1545212504.481 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ d D) (* d c0)) (* w h)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)))
1545212504.481 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ d D) (* d c0)) (* w h)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212504.481 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212504.481 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212504.485 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212504.493 * * [misc]simplify:  iters left: 4 (138 enodes)
1545212504.545 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212504.545 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212504.546 * * * * [misc]progress:  [ 313 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212504.546 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212504.546 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212504.553 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212504.572 * * [misc]simplify:  iters left: 4 (335 enodes)
1545212504.743 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) w)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ c0 (* (/ D d) (/ h d))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212504.743 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) w)) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ c0 (* (/ D d) (/ h d))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212504.743 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212504.743 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212504.747 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212504.756 * * [misc]simplify:  iters left: 4 (155 enodes)
1545212504.812 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))
1545212504.812 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D))))))
1545212504.812 * * * * [misc]progress:  [ 314 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212504.812 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212504.813 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212504.819 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212504.838 * * [misc]simplify:  iters left: 4 (320 enodes)
1545212505.004 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (/ c0 h) (* (/ D d) (/ w d))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D)))
1545212505.004 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (/ c0 h) (* (/ D d) (/ w d))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212505.004 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212505.004 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212505.008 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212505.019 * * [misc]simplify:  iters left: 4 (138 enodes)
1545212505.067 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212505.067 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212505.067 * * * * [misc]progress:  [ 315 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212505.068 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212505.068 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212505.074 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212505.095 * * [misc]simplify:  iters left: 4 (327 enodes)
1545212505.278 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212505.278 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* w (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212505.279 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212505.279 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212505.282 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212505.290 * * [misc]simplify:  iters left: 4 (138 enodes)
1545212505.356 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212505.357 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212505.357 * * * * [misc]progress:  [ 316 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212505.357 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212505.357 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212505.365 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212505.387 * * [misc]simplify:  iters left: 4 (360 enodes)
1545212505.561 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D w) D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ (* d c0) (/ h d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212505.561 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D w) D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ (* d c0) (/ h d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212505.561 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212505.562 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212505.566 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212505.578 * * [misc]simplify:  iters left: 4 (197 enodes)
1545212505.656 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (* D (* w D)) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212505.656 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (* D (* w D)) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))
1545212505.656 * * * * [misc]progress:  [ 317 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212505.657 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212505.657 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212505.664 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212505.688 * * [misc]simplify:  iters left: 4 (346 enodes)
1545212505.854 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 w) (/ (* d d) h)))))
1545212505.854 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 w) (/ (* d d) h))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212505.855 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212505.855 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212505.859 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212505.870 * * [misc]simplify:  iters left: 4 (171 enodes)
1545212505.937 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* (* D D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212505.937 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))) (* (* D D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212505.937 * * * * [misc]progress:  [ 318 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212505.938 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212505.938 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212505.945 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212505.969 * * [misc]simplify:  iters left: 4 (361 enodes)
1545212506.143 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d c0) h) (/ d D))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212506.143 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d c0) h) (/ d D))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212506.144 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212506.144 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212506.148 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212506.159 * * [misc]simplify:  iters left: 4 (178 enodes)
1545212506.230 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212506.230 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))
1545212506.230 * * * * [misc]progress:  [ 319 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212506.230 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212506.231 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212506.238 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212506.261 * * [misc]simplify:  iters left: 4 (344 enodes)
1545212506.440 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))))))) D) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (* d c0) (/ d D)) (* w h)))))
1545212506.440 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))))))) D) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (* d c0) (/ d D)) (* w h))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212506.440 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212506.440 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212506.444 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212506.455 * * [misc]simplify:  iters left: 4 (165 enodes)
1545212506.521 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212506.521 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212506.521 * * * * [misc]progress:  [ 320 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212506.522 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212506.522 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212506.531 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212506.553 * * [misc]simplify:  iters left: 4 (365 enodes)
1545212506.731 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d c0) (/ d D)) h))))
1545212506.731 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d c0) (/ d D)) h)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212506.731 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212506.732 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212506.736 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212506.749 * * [misc]simplify:  iters left: 4 (178 enodes)
1545212506.819 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212506.819 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))
1545212506.820 * * * * [misc]progress:  [ 321 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212506.820 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212506.820 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212506.827 * * [misc]simplify:  iters left: 5 (96 enodes)
1545212506.848 * * [misc]simplify:  iters left: 4 (349 enodes)
1545212507.047 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ (* d d) D) (/ c0 (* w h))))))
1545212507.047 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ (* d d) D) (/ c0 (* w h)))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212507.048 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212507.048 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212507.052 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212507.062 * * [misc]simplify:  iters left: 4 (165 enodes)
1545212507.127 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212507.127 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212507.127 * * * * [misc]progress:  [ 322 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212507.128 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212507.128 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212507.135 * * [misc]simplify:  iters left: 5 (97 enodes)
1545212507.157 * * [misc]simplify:  iters left: 4 (360 enodes)
1545212507.337 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* (/ d D) (/ d D))))))
1545212507.337 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212507.337 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212507.337 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212507.341 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212507.352 * * [misc]simplify:  iters left: 4 (165 enodes)
1545212507.416 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212507.416 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212507.417 * * * * [misc]progress:  [ 323 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212507.417 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212507.417 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212507.422 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212507.437 * * [misc]simplify:  iters left: 4 (232 enodes)
1545212507.522 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* (* d d) (/ c0 h)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212507.522 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* (* d d) (/ c0 h)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212507.524 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212507.524 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212507.527 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212507.534 * * [misc]simplify:  iters left: 4 (101 enodes)
1545212507.554 * * [misc]simplify:  iters left: 3 (252 enodes)
1545212507.622 * [exit]simplify:  Simplified to (* (sqrt (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h))))) (* (* w D) D))
1545212507.622 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* (* d d) (/ c0 h)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h))))) (* (* w D) D)))))
1545212507.622 * * * * [misc]progress:  [ 324 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212507.622 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212507.623 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212507.628 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212507.641 * * [misc]simplify:  iters left: 4 (212 enodes)
1545212507.723 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* d (* d c0)) (* w h))))
1545212507.723 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* d (* d c0)) (* w h)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212507.723 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212507.724 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212507.726 * * [misc]simplify:  iters left: 5 (34 enodes)
1545212507.989 * * [misc]simplify:  iters left: 4 (81 enodes)
1545212508.004 * * [misc]simplify:  iters left: 3 (201 enodes)
1545212508.060 * [exit]simplify:  Simplified to (* (* D D) (sqrt (+ M (* (* (/ c0 w) (/ d D)) (/ (/ d D) h)))))
1545212508.060 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D D)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* d (* d c0)) (* w h)))) (* (* D D) (sqrt (+ M (* (* (/ c0 w) (/ d D)) (/ (/ d D) h))))))))
1545212508.060 * * * * [misc]progress:  [ 325 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212508.060 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212508.061 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212508.066 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212508.080 * * [misc]simplify:  iters left: 4 (227 enodes)
1545212508.168 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h)))
1545212508.168 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212508.168 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212508.168 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212508.171 * * [misc]simplify:  iters left: 5 (35 enodes)
1545212508.177 * * [misc]simplify:  iters left: 4 (88 enodes)
1545212508.197 * * [misc]simplify:  iters left: 3 (214 enodes)
1545212508.253 * [exit]simplify:  Simplified to (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D))))))
1545212508.253 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))
1545212508.253 * * * * [misc]progress:  [ 326 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212508.254 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212508.254 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212508.259 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212508.273 * * [misc]simplify:  iters left: 4 (215 enodes)
1545212508.366 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ (/ c0 w) h) (/ d (/ D d))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212508.366 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ (/ c0 w) h) (/ d (/ D d))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212508.367 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212508.367 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212508.369 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212508.375 * * [misc]simplify:  iters left: 4 (73 enodes)
1545212508.390 * * [misc]simplify:  iters left: 3 (193 enodes)
1545212508.449 * [exit]simplify:  Simplified to (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) D)
1545212508.450 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ (/ c0 w) h) (/ d (/ D d))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) D))))
1545212508.450 * * * * [misc]progress:  [ 327 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212508.450 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212508.450 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212508.455 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212508.469 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212508.559 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (* d (/ d D)) (/ c0 h))))
1545212508.560 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (* d (/ d D)) (/ c0 h)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212508.561 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212508.561 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212508.564 * * [misc]simplify:  iters left: 5 (35 enodes)
1545212508.570 * * [misc]simplify:  iters left: 4 (88 enodes)
1545212508.588 * * [misc]simplify:  iters left: 3 (214 enodes)
1545212508.647 * [exit]simplify:  Simplified to (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D))))))
1545212508.647 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* (* d (/ d D)) (/ c0 h)))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))
1545212508.647 * * * * [misc]progress:  [ 328 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212508.647 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212508.647 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212508.652 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212508.666 * * [misc]simplify:  iters left: 4 (218 enodes)
1545212508.762 * [exit]simplify:  Simplified to (+ (* D (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ (/ (* d c0) h) (* (/ D d) w)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212508.762 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ (/ (* d c0) h) (* (/ D d) w)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212508.762 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212508.762 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212508.765 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212508.770 * * [misc]simplify:  iters left: 4 (73 enodes)
1545212508.785 * * [misc]simplify:  iters left: 3 (193 enodes)
1545212508.840 * [exit]simplify:  Simplified to (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) D)
1545212508.840 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ (/ (* d c0) h) (* (/ D d) w)) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) D))))
1545212508.840 * * * * [misc]progress:  [ 329 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212508.840 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212508.840 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212508.845 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212508.859 * * [misc]simplify:  iters left: 4 (227 enodes)
1545212508.951 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212508.951 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212508.951 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212508.951 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212508.954 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212508.961 * * [misc]simplify:  iters left: 4 (73 enodes)
1545212508.976 * * [misc]simplify:  iters left: 3 (193 enodes)
1545212509.031 * [exit]simplify:  Simplified to (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) w)
1545212509.031 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (+ M (* (/ (/ d D) w) (/ (/ d D) (/ h c0))))) w))))
1545212509.031 * * * * [misc]progress:  [ 330 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))>
1545212509.032 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d)))
1545212509.032 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212509.040 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212509.063 * * [misc]simplify:  iters left: 4 (377 enodes)
1545212509.257 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* d c0) (/ h d))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212509.257 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* d c0) (/ h d))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))
1545212509.257 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D))
1545212509.257 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212509.262 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212509.275 * * [misc]simplify:  iters left: 4 (223 enodes)
1545212509.373 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (* D (* w D)) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))
1545212509.373 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (* D (* w D)) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))))
1545212509.373 * * * * [misc]progress:  [ 331 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))>
1545212509.373 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212509.374 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212509.384 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212509.405 * * [misc]simplify:  iters left: 4 (363 enodes)
1545212509.591 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D D) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212509.591 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D D) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))
1545212509.592 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D))
1545212509.592 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212509.596 * * [misc]simplify:  iters left: 5 (56 enodes)
1545212509.607 * * [misc]simplify:  iters left: 4 (199 enodes)
1545212509.696 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))
1545212509.696 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212509.696 * * * * [misc]progress:  [ 332 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212509.697 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212509.697 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212509.705 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212509.730 * * [misc]simplify:  iters left: 4 (380 enodes)
1545212509.925 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212509.925 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212509.925 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212509.926 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212509.930 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212509.945 * * [misc]simplify:  iters left: 4 (206 enodes)
1545212510.037 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212510.037 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212510.037 * * * * [misc]progress:  [ 333 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212510.037 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212510.037 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212510.045 * * [misc]simplify:  iters left: 5 (97 enodes)
1545212510.066 * * [misc]simplify:  iters left: 4 (364 enodes)
1545212510.267 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (pow M 3)) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)))) (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))) D)) (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))))) (/ (/ (* d c0) h) (/ w (/ d D)))) (sqrt (sqrt (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212510.267 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (pow M 3)) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)))) (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))) D)) (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))))) (/ (/ (* d c0) h) (/ w (/ d D)))) (sqrt (sqrt (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212510.267 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212510.268 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212510.272 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212510.283 * * [misc]simplify:  iters left: 4 (189 enodes)
1545212510.374 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212510.374 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212510.374 * * * * [misc]progress:  [ 334 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212510.375 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D))))
1545212510.375 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212510.382 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212510.405 * * [misc]simplify:  iters left: 4 (382 enodes)
1545212510.604 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212510.604 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212510.604 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212510.604 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212510.608 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212510.620 * * [misc]simplify:  iters left: 4 (206 enodes)
1545212510.715 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212510.715 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212510.715 * * * * [misc]progress:  [ 335 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212510.715 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212510.715 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212510.723 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212510.745 * * [misc]simplify:  iters left: 4 (367 enodes)
1545212510.943 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (/ d D) (* d c0)) (* w h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212510.943 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (/ d D) (* d c0)) (* w h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212510.943 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212510.943 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212510.947 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212510.958 * * [misc]simplify:  iters left: 4 (189 enodes)
1545212511.046 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212511.047 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))) D) (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212511.047 * * * * [misc]progress:  [ 336 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))>
1545212511.047 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212511.047 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212511.057 * * [misc]simplify:  iters left: 5 (99 enodes)
1545212511.079 * * [misc]simplify:  iters left: 4 (376 enodes)
1545212511.282 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212511.282 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))
1545212511.283 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w)
1545212511.283 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212511.287 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212511.298 * * [misc]simplify:  iters left: 4 (189 enodes)
1545212511.385 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* w (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D))))))))
1545212511.385 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (- (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* w (sqrt (sqrt (+ M (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))))))))))
1545212511.385 * * * * [misc]progress:  [ 337 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))>
1545212511.385 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d)))
1545212511.386 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212511.392 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212511.413 * * [misc]simplify:  iters left: 4 (298 enodes)
1545212511.547 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* w (* D D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* d d)))))
1545212511.547 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* w (* D D)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* d d))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))
1545212511.548 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D))
1545212511.548 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212511.551 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212511.559 * * [misc]simplify:  iters left: 4 (125 enodes)
1545212511.586 * * [misc]simplify:  iters left: 3 (361 enodes)
1545212511.706 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (- M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))) (* w (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))))
1545212511.706 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (* D D) (sqrt (sqrt (- M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))) (* w (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))))))
1545212511.706 * * * * [misc]progress:  [ 338 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212511.707 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212511.707 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212511.713 * * [misc]simplify:  iters left: 5 (83 enodes)
1545212511.730 * * [misc]simplify:  iters left: 4 (282 enodes)
1545212511.858 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (/ c0 h) (* d d)) w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* D D) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212511.858 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (* (/ c0 h) (* d d)) w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* D D) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212511.858 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212511.858 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212511.861 * * [misc]simplify:  iters left: 5 (40 enodes)
1545212511.868 * * [misc]simplify:  iters left: 4 (105 enodes)
1545212511.892 * * [misc]simplify:  iters left: 3 (291 enodes)
1545212511.985 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) D) (* D (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))
1545212511.985 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) D) (* D (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))))))
1545212511.985 * * * * [misc]progress:  [ 339 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212511.985 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212511.985 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212511.992 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212512.009 * * [misc]simplify:  iters left: 4 (297 enodes)
1545212512.146 * [exit]simplify:  Simplified to (+ (* (* d (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ d D) (/ c0 h)))) (* (* (* D w) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212512.146 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ d D) (/ c0 h)))) (* (* (* D w) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212512.146 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212512.146 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212512.150 * * [misc]simplify:  iters left: 5 (41 enodes)
1545212512.157 * * [misc]simplify:  iters left: 4 (112 enodes)
1545212512.183 * * [misc]simplify:  iters left: 3 (311 enodes)
1545212512.280 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))) D) (* w (sqrt (sqrt (- M (/ (* (/ d D) c0) (/ (* w h) (/ d D))))))))
1545212512.280 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))) D) (* w (sqrt (sqrt (- M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))))
1545212512.280 * * * * [misc]progress:  [ 340 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212512.280 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212512.281 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212512.287 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212512.306 * * [misc]simplify:  iters left: 4 (283 enodes)
1545212512.449 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (* d (/ d D))))))
1545212512.449 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (* d (/ d D)))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212512.449 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212512.449 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212512.452 * * [misc]simplify:  iters left: 5 (37 enodes)
1545212512.459 * * [misc]simplify:  iters left: 4 (95 enodes)
1545212512.479 * * [misc]simplify:  iters left: 3 (273 enodes)
1545212512.569 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) D) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))
1545212512.569 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) D) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))))
1545212512.569 * * * * [misc]progress:  [ 341 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212512.569 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D))))
1545212512.570 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212512.578 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212512.595 * * [misc]simplify:  iters left: 4 (299 enodes)
1545212512.738 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* d (* (/ d D) (/ c0 h)))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* D w) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212512.738 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* d (* (/ d D) (/ c0 h)))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (* D w) (sqrt (sqrt (* (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212512.739 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212512.739 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212512.742 * * [misc]simplify:  iters left: 5 (41 enodes)
1545212512.749 * * [misc]simplify:  iters left: 4 (112 enodes)
1545212512.772 * * [misc]simplify:  iters left: 3 (311 enodes)
1545212512.871 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))) D) (* w (sqrt (sqrt (- M (/ (* (/ d D) c0) (/ (* w h) (/ d D))))))))
1545212512.871 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))) D) (* w (sqrt (sqrt (- M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))))
1545212512.871 * * * * [misc]progress:  [ 342 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212512.872 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212512.872 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212512.878 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212512.895 * * [misc]simplify:  iters left: 4 (289 enodes)
1545212513.040 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ D (* (* d d) (/ c0 (* w h)))))))
1545212513.040 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ D (* (* d d) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212513.040 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212513.040 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212513.043 * * [misc]simplify:  iters left: 5 (37 enodes)
1545212513.049 * * [misc]simplify:  iters left: 4 (95 enodes)
1545212513.072 * * [misc]simplify:  iters left: 3 (273 enodes)
1545212513.162 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) D) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))
1545212513.162 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) D) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))))
1545212513.162 * * * * [misc]progress:  [ 343 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212513.162 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212513.163 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212513.169 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212513.186 * * [misc]simplify:  iters left: 4 (296 enodes)
1545212513.326 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ c0 h)) (* (* (/ d D) (/ d D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212513.327 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ c0 h)) (* (* (/ d D) (/ d D)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212513.327 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212513.327 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212513.330 * * [misc]simplify:  iters left: 5 (37 enodes)
1545212513.339 * * [misc]simplify:  iters left: 4 (95 enodes)
1545212513.359 * * [misc]simplify:  iters left: 3 (273 enodes)
1545212513.449 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))
1545212513.449 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))))
1545212513.449 * * * * [misc]progress:  [ 344 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212513.449 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212513.450 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212513.458 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212513.487 * * [misc]simplify:  iters left: 4 (472 enodes)
1545212513.781 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))))
1545212513.781 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212513.782 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212513.782 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212513.788 * * [misc]simplify:  iters left: 5 (77 enodes)
1545212513.806 * * [misc]simplify:  iters left: 4 (316 enodes)
1545212513.991 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (* D D) w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212513.991 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (* D D) w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212513.991 * * * * [misc]progress:  [ 345 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212513.992 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212513.992 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212514.000 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212514.026 * * [misc]simplify:  iters left: 4 (458 enodes)
1545212514.307 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* d d) (/ (/ c0 w) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212514.307 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* d d) (/ (/ c0 w) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212514.308 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212514.308 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212514.313 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212514.333 * * [misc]simplify:  iters left: 4 (294 enodes)
1545212514.507 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212514.507 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212514.507 * * * * [misc]progress:  [ 346 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212514.507 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212514.508 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212514.516 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212514.546 * * [misc]simplify:  iters left: 4 (469 enodes)
1545212514.840 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))) (* (* (/ (* d c0) (* (/ h d) D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212514.840 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))) (* (* (/ (* d c0) (* (/ h d) D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212514.840 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212514.840 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212514.845 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212514.862 * * [misc]simplify:  iters left: 4 (301 enodes)
1545212515.041 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212515.041 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212515.041 * * * * [misc]progress:  [ 347 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212515.041 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212515.042 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212515.049 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212515.076 * * [misc]simplify:  iters left: 4 (451 enodes)
1545212515.363 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (* (/ d D) (/ (* d c0) (* w h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212515.363 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (* (/ d D) (/ (* d c0) (* w h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212515.364 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212515.364 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212515.369 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212515.388 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212515.564 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212515.564 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212515.564 * * * * [misc]progress:  [ 348 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212515.564 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212515.565 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212515.572 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212515.603 * * [misc]simplify:  iters left: 4 (477 enodes)
1545212515.902 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* (* d d) (/ c0 h)) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212515.902 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (/ (* (* d d) (/ c0 h)) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212515.902 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212515.902 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212515.907 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212515.924 * * [misc]simplify:  iters left: 4 (301 enodes)
1545212516.104 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212516.104 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212516.104 * * * * [misc]progress:  [ 349 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212516.104 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212516.105 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212516.112 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212516.139 * * [misc]simplify:  iters left: 4 (457 enodes)
1545212516.431 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (* (/ (/ c0 w) h) (/ (* d d) D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212516.431 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (* (/ (/ c0 w) h) (/ (* d d) D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212516.432 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212516.432 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212516.440 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212516.456 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212516.632 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212516.632 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212516.632 * * * * [misc]progress:  [ 350 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212516.632 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212516.633 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212516.640 * * [misc]simplify:  iters left: 5 (114 enodes)
1545212516.670 * * [misc]simplify:  iters left: 4 (464 enodes)
1545212516.948 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212516.948 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212516.948 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212516.949 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212516.953 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212516.971 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212517.148 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212517.148 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212517.149 * * * * [misc]progress:  [ 351 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212517.149 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212517.149 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212517.157 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212517.182 * * [misc]simplify:  iters left: 4 (437 enodes)
1545212517.436 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))))
1545212517.436 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212517.436 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212517.437 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212517.441 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212517.457 * * [misc]simplify:  iters left: 4 (273 enodes)
1545212517.600 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D D) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))
1545212517.600 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D D) w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212517.600 * * * * [misc]progress:  [ 352 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212517.600 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212517.601 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212517.608 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212517.632 * * [misc]simplify:  iters left: 4 (423 enodes)
1545212517.884 * [exit]simplify:  Simplified to (+ (* (* (/ (* d (* d c0)) (* w h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D D))))
1545212517.884 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* d (* d c0)) (* w h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212517.884 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212517.884 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212517.889 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212517.903 * * [misc]simplify:  iters left: 4 (251 enodes)
1545212518.034 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D D)))
1545212518.034 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D D))))))
1545212518.034 * * * * [misc]progress:  [ 353 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212518.034 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212518.035 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212518.042 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212518.069 * * [misc]simplify:  iters left: 4 (436 enodes)
1545212518.318 * [exit]simplify:  Simplified to (+ (* (* (/ (* (/ d D) c0) (/ h d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w))))
1545212518.318 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (/ d D) c0) (/ h d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212518.318 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212518.318 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212518.323 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212518.337 * * [misc]simplify:  iters left: 4 (258 enodes)
1545212518.472 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D w)))
1545212518.472 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D w))))))
1545212518.472 * * * * [misc]progress:  [ 354 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212518.472 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212518.472 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212518.482 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212518.506 * * [misc]simplify:  iters left: 4 (420 enodes)
1545212518.772 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (* (* d (/ d D)) (/ (/ c0 w) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212518.773 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (* (* (* d (/ d D)) (/ (/ c0 w) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212518.773 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212518.773 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212518.777 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212518.791 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212518.921 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212518.921 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212518.922 * * * * [misc]progress:  [ 355 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212518.922 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212518.922 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212518.930 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212518.955 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212519.461 * [exit]simplify:  Simplified to (+ (* (* (/ (* (/ d D) c0) (/ h d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w))))
1545212519.462 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (/ d D) c0) (/ h d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* D w)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212519.462 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212519.462 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212519.466 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212519.481 * * [misc]simplify:  iters left: 4 (258 enodes)
1545212519.615 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D w)))
1545212519.615 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D w))))))
1545212519.615 * * * * [misc]progress:  [ 356 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212519.615 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212519.615 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212519.623 * * [misc]simplify:  iters left: 5 (106 enodes)
1545212519.650 * * [misc]simplify:  iters left: 4 (425 enodes)
1545212519.914 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) D) (* (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))
1545212519.914 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) D) (* (* (/ (* (* d c0) (/ d D)) (* w h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212519.914 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212519.915 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212519.919 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212519.936 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212520.066 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212520.066 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212520.066 * * * * [misc]progress:  [ 357 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212520.066 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212520.067 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212520.074 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212520.098 * * [misc]simplify:  iters left: 4 (432 enodes)
1545212520.356 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212520.357 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212520.357 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212520.357 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212520.361 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212520.375 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212520.505 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212520.505 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212520.505 * * * * [misc]progress:  [ 358 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212520.506 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212520.506 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212520.514 * * [misc]simplify:  iters left: 5 (127 enodes)
1545212520.543 * * [misc]simplify:  iters left: 4 (496 enodes)
1545212520.849 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212520.849 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212520.849 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212520.849 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212520.855 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212520.873 * * [misc]simplify:  iters left: 4 (323 enodes)
1545212521.046 * [exit]simplify:  Simplified to (* (* (* (* D w) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212521.046 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (* (* D w) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212521.046 * * * * [misc]progress:  [ 359 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212521.046 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212521.046 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212521.055 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212521.083 * * [misc]simplify:  iters left: 4 (477 enodes)
1545212521.364 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 w) (/ (* d d) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))))
1545212521.364 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 w) (/ (* d d) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212521.364 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212521.365 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212521.370 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212521.387 * * [misc]simplify:  iters left: 4 (297 enodes)
1545212521.554 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D D)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212521.554 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* D D)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212521.554 * * * * [misc]progress:  [ 360 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212521.554 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212521.554 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212521.563 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212521.591 * * [misc]simplify:  iters left: 4 (494 enodes)
1545212521.887 * [exit]simplify:  Simplified to (+ (* (* (* (/ (* d c0) (* h D)) d) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* D w) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))
1545212521.887 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (* d c0) (* h D)) d) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* D w) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212521.887 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212521.887 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212521.893 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212521.910 * * [misc]simplify:  iters left: 4 (304 enodes)
1545212522.078 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D w)))
1545212522.078 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D w))))))
1545212522.078 * * * * [misc]progress:  [ 361 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212522.078 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212522.079 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212522.087 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212522.117 * * [misc]simplify:  iters left: 4 (484 enodes)
1545212522.430 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) D)) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ d D) (* (/ c0 w) (/ d h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212522.430 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) D)) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ d D) (* (/ c0 w) (/ d h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212522.430 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212522.430 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212522.435 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212522.455 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212522.615 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212522.615 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212522.616 * * * * [misc]progress:  [ 362 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212522.616 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212522.616 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212522.625 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212522.656 * * [misc]simplify:  iters left: 4 (496 enodes)
1545212522.952 * [exit]simplify:  Simplified to (+ (* (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) D) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)))
1545212522.952 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))) D) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212522.952 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212522.952 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212522.957 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212522.974 * * [misc]simplify:  iters left: 4 (304 enodes)
1545212523.143 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D w)))
1545212523.143 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* D w))))))
1545212523.143 * * * * [misc]progress:  [ 363 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212523.143 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212523.143 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212523.152 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212523.180 * * [misc]simplify:  iters left: 4 (486 enodes)
1545212523.485 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ (* (/ c0 h) (/ d D)) (/ w d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))))))
1545212523.485 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ (* (/ c0 h) (/ d D)) (/ w d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212523.486 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212523.486 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212523.494 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212523.510 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212523.670 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212523.671 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212523.671 * * * * [misc]progress:  [ 364 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212523.671 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212523.671 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212523.680 * * [misc]simplify:  iters left: 5 (121 enodes)
1545212523.710 * * [misc]simplify:  iters left: 4 (495 enodes)
1545212524.019 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212524.019 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212524.020 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212524.020 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212524.026 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212524.042 * * [misc]simplify:  iters left: 4 (291 enodes)
1545212524.203 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212524.204 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212524.204 * * * * [misc]progress:  [ 365 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212524.204 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212524.204 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212524.212 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212524.239 * * [misc]simplify:  iters left: 4 (458 enodes)
1545212524.502 * [exit]simplify:  Simplified to (+ (* (* (* D w) D) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (* (/ (* d c0) (/ h d)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))))
1545212524.502 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) D) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (* (/ (* d c0) (/ h d)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212524.502 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212524.502 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212524.507 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212524.523 * * [misc]simplify:  iters left: 4 (274 enodes)
1545212524.653 * [exit]simplify:  Simplified to (* (* w (* D D)) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212524.653 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* w (* D D)) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212524.653 * * * * [misc]progress:  [ 366 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212524.653 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212524.654 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212524.661 * * [misc]simplify:  iters left: 5 (114 enodes)
1545212524.690 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212524.946 * [exit]simplify:  Simplified to (+ (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* d (sqrt (sqrt (+ (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ (/ c0 h) (/ w d)))))
1545212524.946 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* d (sqrt (sqrt (+ (- (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ (/ c0 h) (/ w d))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212524.947 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212524.947 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212524.951 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212524.969 * * [misc]simplify:  iters left: 4 (250 enodes)
1545212525.092 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))))))))
1545212525.092 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))))))))))
1545212525.092 * * * * [misc]progress:  [ 367 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212525.092 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212525.093 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212525.103 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212525.130 * * [misc]simplify:  iters left: 4 (457 enodes)
1545212525.399 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (* (* (/ d D) (/ (* d c0) h)) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (+ (- (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212525.399 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) D) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w)) (* (* (* (/ d D) (/ (* d c0) h)) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (+ (- (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212525.400 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212525.400 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212525.404 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212525.419 * * [misc]simplify:  iters left: 4 (257 enodes)
1545212525.547 * [exit]simplify:  Simplified to (* (* D w) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212525.548 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* D w) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212525.548 * * * * [misc]progress:  [ 368 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212525.548 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212525.548 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212525.556 * * [misc]simplify:  iters left: 5 (111 enodes)
1545212525.581 * * [misc]simplify:  iters left: 4 (442 enodes)
1545212525.860 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 w) h) (* d (/ d D))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))
1545212525.861 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 w) h) (* d (/ d D))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212525.861 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212525.861 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212525.865 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212525.883 * * [misc]simplify:  iters left: 4 (244 enodes)
1545212525.998 * [exit]simplify:  Simplified to (* D (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212525.998 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212525.998 * * * * [misc]progress:  [ 369 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212525.998 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212525.999 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212526.007 * * [misc]simplify:  iters left: 5 (116 enodes)
1545212526.035 * * [misc]simplify:  iters left: 4 (461 enodes)
1545212526.314 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* w (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (* (/ d D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (/ (* d c0) h) (sqrt (sqrt (+ (- (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212526.314 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* w (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (* (/ d D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (/ (* d c0) h) (sqrt (sqrt (+ (- (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212526.315 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212526.315 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212526.319 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212526.334 * * [misc]simplify:  iters left: 4 (257 enodes)
1545212526.462 * [exit]simplify:  Simplified to (* (* D w) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212526.462 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* D w) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212526.463 * * * * [misc]progress:  [ 370 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212526.463 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212526.463 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212526.471 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212526.497 * * [misc]simplify:  iters left: 4 (446 enodes)
1545212526.773 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ c0 (* w h))) (* (* d (/ d D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212526.773 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ c0 (* w h))) (* (* d (/ d D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212526.773 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212526.773 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212526.778 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212526.795 * * [misc]simplify:  iters left: 4 (244 enodes)
1545212526.911 * [exit]simplify:  Simplified to (* D (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212526.911 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212526.911 * * * * [misc]progress:  [ 371 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212526.911 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212526.912 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212526.920 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212526.948 * * [misc]simplify:  iters left: 4 (451 enodes)
1545212527.213 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))))
1545212527.213 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))) (* w (* (sqrt (sqrt (* (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212527.213 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212527.213 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212527.218 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212527.232 * * [misc]simplify:  iters left: 4 (244 enodes)
1545212527.350 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) w)
1545212527.350 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) w))))
1545212527.350 * * * * [misc]progress:  [ 372 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212527.351 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212527.351 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212527.359 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212527.384 * * [misc]simplify:  iters left: 4 (403 enodes)
1545212527.592 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) D) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))
1545212527.592 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) D) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212527.592 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212527.592 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212527.597 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212527.612 * * [misc]simplify:  iters left: 4 (252 enodes)
1545212527.730 * [exit]simplify:  Simplified to (* (* w (* D D)) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212527.730 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* w (* D D)) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))))
1545212527.730 * * * * [misc]progress:  [ 373 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212527.730 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212527.730 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212527.738 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212527.764 * * [misc]simplify:  iters left: 4 (397 enodes)
1545212527.976 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) d) (* (* (/ d h) (/ c0 w)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))))
1545212527.976 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) d) (* (* (/ d h) (/ c0 w)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212527.977 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212527.977 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212527.981 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212527.995 * * [misc]simplify:  iters left: 4 (228 enodes)
1545212528.099 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* D (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212528.099 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))) (* D (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))))
1545212528.100 * * * * [misc]progress:  [ 374 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212528.100 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212528.100 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212528.110 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212528.135 * * [misc]simplify:  iters left: 4 (412 enodes)
1545212528.356 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) w)) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (* (/ c0 h) (* d (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212528.356 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) w)) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (* (/ c0 h) (* d (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212528.356 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212528.356 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212528.361 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212528.375 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212528.483 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) w))
1545212528.483 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) w)))))
1545212528.483 * * * * [misc]progress:  [ 375 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212528.483 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212528.484 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212528.491 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212528.515 * * [misc]simplify:  iters left: 4 (391 enodes)
1545212528.739 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (/ (* (/ c0 h) (/ d D)) (/ w d))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))
1545212528.739 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (/ (* (/ c0 h) (/ d D)) (/ w d))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212528.740 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212528.740 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212528.744 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212528.758 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212528.858 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212528.858 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212528.858 * * * * [misc]progress:  [ 376 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212528.858 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212528.859 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212528.867 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212528.893 * * [misc]simplify:  iters left: 4 (410 enodes)
1545212529.115 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) w)) (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (* d c0) h)) (* (/ d D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212529.115 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) w)) (* (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (* d c0) h)) (* (/ d D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212529.115 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212529.116 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212529.120 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212529.134 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212529.242 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) w))
1545212529.242 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (sqrt (sqrt (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) w)))))
1545212529.242 * * * * [misc]progress:  [ 377 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212529.243 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212529.243 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212529.251 * * [misc]simplify:  iters left: 5 (106 enodes)
1545212529.275 * * [misc]simplify:  iters left: 4 (401 enodes)
1545212529.500 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (/ c0 w) h)) (* (* d (/ d D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))))
1545212529.500 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (/ c0 w) h)) (* (* d (/ d D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212529.500 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212529.500 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212529.505 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212529.518 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212529.619 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212529.619 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212529.620 * * * * [misc]progress:  [ 378 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212529.620 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212529.620 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212529.628 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212529.654 * * [misc]simplify:  iters left: 4 (404 enodes)
1545212530.125 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))))
1545212530.125 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212530.126 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212530.126 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212530.130 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212530.144 * * [misc]simplify:  iters left: 4 (224 enodes)
1545212530.247 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212530.247 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212530.247 * * * * [misc]progress:  [ 379 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212530.247 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212530.248 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212530.255 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212530.277 * * [misc]simplify:  iters left: 4 (377 enodes)
1545212530.466 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (* D D) w) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))))
1545212530.466 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* (* D D) w) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212530.466 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212530.467 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212530.471 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212530.484 * * [misc]simplify:  iters left: 4 (223 enodes)
1545212530.587 * [exit]simplify:  Simplified to (* (* (* D (* D w)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212530.587 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (* D (* D w)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212530.587 * * * * [misc]progress:  [ 380 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212530.588 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212530.588 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212530.595 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212530.616 * * [misc]simplify:  iters left: 4 (363 enodes)
1545212530.801 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (* D D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ (* (* d d) (/ c0 w)) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212530.801 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (* D D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ (* (* d d) (/ c0 w)) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212530.801 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212530.801 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212530.805 * * [misc]simplify:  iters left: 5 (56 enodes)
1545212530.817 * * [misc]simplify:  iters left: 4 (199 enodes)
1545212530.904 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212530.904 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212530.904 * * * * [misc]progress:  [ 381 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212530.904 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212530.904 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212530.912 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212530.937 * * [misc]simplify:  iters left: 4 (380 enodes)
1545212531.128 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (* (* d (/ c0 h)) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212531.128 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (* (* d (/ c0 h)) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212531.129 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212531.129 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212531.133 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212531.145 * * [misc]simplify:  iters left: 4 (206 enodes)
1545212531.236 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212531.236 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212531.236 * * * * [misc]progress:  [ 382 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212531.236 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212531.236 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212531.244 * * [misc]simplify:  iters left: 5 (97 enodes)
1545212531.267 * * [misc]simplify:  iters left: 4 (364 enodes)
1545212531.464 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (* (* d (/ d D)) (/ c0 (* w h))))))
1545212531.464 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (* (* d (/ d D)) (/ c0 (* w h)))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212531.465 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212531.465 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212531.472 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212531.483 * * [misc]simplify:  iters left: 4 (193 enodes)
1545212531.569 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212531.569 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212531.569 * * * * [misc]progress:  [ 383 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212531.569 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212531.570 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212531.577 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212531.600 * * [misc]simplify:  iters left: 4 (382 enodes)
1545212531.806 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ (* d (* d c0)) (* D h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))))
1545212531.806 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ (* d (* d c0)) (* D h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212531.807 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212531.807 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212531.811 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212531.826 * * [misc]simplify:  iters left: 4 (206 enodes)
1545212531.916 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))
1545212531.916 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212531.917 * * * * [misc]progress:  [ 384 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212531.917 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212531.917 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212531.924 * * [misc]simplify:  iters left: 5 (98 enodes)
1545212531.946 * * [misc]simplify:  iters left: 4 (367 enodes)
1545212532.145 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ (* (/ d D) (* d c0)) (* w h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212532.145 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M))))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))) (/ (* (/ d D) (* d c0)) (* w h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212532.145 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212532.146 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212532.149 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212532.163 * * [misc]simplify:  iters left: 4 (193 enodes)
1545212532.249 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212532.250 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212532.250 * * * * [misc]progress:  [ 385 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212532.250 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212532.250 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212532.257 * * [misc]simplify:  iters left: 5 (99 enodes)
1545212532.279 * * [misc]simplify:  iters left: 4 (376 enodes)
1545212532.475 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ (/ (/ c0 h) (/ D d)) (/ D d)))))
1545212532.475 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))) (/ (/ (/ c0 h) (/ D d)) (/ D d))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212532.475 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212532.476 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212532.480 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212532.491 * * [misc]simplify:  iters left: 4 (193 enodes)
1545212532.579 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212532.579 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212532.579 * * * * [misc]progress:  [ 386 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))>
1545212532.580 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d)))
1545212532.580 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212532.586 * * [misc]simplify:  iters left: 5 (91 enodes)
1545212532.606 * * [misc]simplify:  iters left: 4 (336 enodes)
1545212532.771 * [exit]simplify:  Simplified to (+ (* (* (* D D) w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (/ (* d c0) (/ h d)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212532.771 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (/ (* d c0) (/ h d)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))
1545212532.771 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D))
1545212532.771 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212532.778 * * [misc]simplify:  iters left: 5 (56 enodes)
1545212532.790 * * [misc]simplify:  iters left: 4 (209 enodes)
1545212532.882 * [exit]simplify:  Simplified to (* (* w (* D D)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))
1545212532.882 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* (/ (* d c0) (/ h d)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))) (* (* w (* D D)) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212532.882 * * * * [misc]progress:  [ 387 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))>
1545212532.882 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212532.882 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212532.888 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212532.907 * * [misc]simplify:  iters left: 4 (324 enodes)
1545212533.076 * [exit]simplify:  Simplified to (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ (/ c0 h) (/ w (* d d)))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* D D)))
1545212533.077 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ (/ c0 h) (/ w (* d d)))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* D D))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))
1545212533.077 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D))
1545212533.077 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212533.081 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212533.092 * * [misc]simplify:  iters left: 4 (193 enodes)
1545212533.178 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* D D))
1545212533.178 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ (/ c0 h) (/ w (* d d)))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) (* D D))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))) (* D D)))))
1545212533.178 * * * * [misc]progress:  [ 388 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212533.179 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212533.179 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212533.185 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212533.206 * * [misc]simplify:  iters left: 4 (335 enodes)
1545212533.372 * [exit]simplify:  Simplified to (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))) (/ (* (/ c0 h) (* d d)) D)) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w)))
1545212533.372 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))) (/ (* (/ c0 h) (* d d)) D)) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212533.372 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212533.372 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212533.376 * * [misc]simplify:  iters left: 5 (52 enodes)
1545212533.387 * * [misc]simplify:  iters left: 4 (200 enodes)
1545212533.479 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) (* D w))
1545212533.479 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))) (/ (* (/ c0 h) (* d d)) D)) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) (* D w)))))
1545212533.479 * * * * [misc]progress:  [ 389 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212533.479 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212533.480 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212533.485 * * [misc]simplify:  iters left: 5 (83 enodes)
1545212533.504 * * [misc]simplify:  iters left: 4 (323 enodes)
1545212533.681 * [exit]simplify:  Simplified to (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D))
1545212533.681 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212533.681 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212533.681 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212533.685 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212533.695 * * [misc]simplify:  iters left: 4 (183 enodes)
1545212533.781 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D)
1545212533.781 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))
1545212533.781 * * * * [misc]progress:  [ 390 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212533.781 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D))))
1545212533.782 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212533.788 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212533.809 * * [misc]simplify:  iters left: 4 (339 enodes)
1545212533.982 * [exit]simplify:  Simplified to (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ (* c0 (* d d)) (* D h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w)))
1545212533.982 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ (* c0 (* d d)) (* D h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212533.983 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212533.983 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212533.987 * * [misc]simplify:  iters left: 5 (52 enodes)
1545212533.998 * * [misc]simplify:  iters left: 4 (200 enodes)
1545212534.089 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) (* D w))
1545212534.090 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))) (/ (* c0 (* d d)) (* D h))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) (* D w))) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) (* D w)))))
1545212534.091 * * * * [misc]progress:  [ 391 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212534.091 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212534.091 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212534.097 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212534.116 * * [misc]simplify:  iters left: 4 (330 enodes)
1545212534.293 * [exit]simplify:  Simplified to (+ (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))) (/ D (/ (* d (* d c0)) (* w h)))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D))
1545212534.293 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))) (/ D (/ (* d (* d c0)) (* w h)))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212534.293 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212534.294 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212534.297 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212534.307 * * [misc]simplify:  iters left: 4 (183 enodes)
1545212534.394 * [exit]simplify:  Simplified to (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D)
1545212534.394 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))) (/ D (/ (* d (* d c0)) (* w h)))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))
1545212534.394 * * * * [misc]progress:  [ 392 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))>
1545212534.394 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212534.395 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212534.401 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212534.422 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212534.592 * [exit]simplify:  Simplified to (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))) (* (/ d D) (* (/ c0 h) (/ d D)))) (* w (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))
1545212534.592 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))) (* (/ d D) (* (/ c0 h) (/ d D)))) (* w (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))
1545212534.592 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w)
1545212534.592 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212534.596 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212534.606 * * [misc]simplify:  iters left: 4 (183 enodes)
1545212534.695 * [exit]simplify:  Simplified to (* w (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))
1545212534.695 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))) (* (/ d D) (* (/ c0 h) (/ d D)))) (* w (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* w (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))
1545212534.695 * * * * [misc]progress:  [ 393 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))>
1545212534.696 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d)))
1545212534.696 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212534.703 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212534.727 * * [misc]simplify:  iters left: 4 (406 enodes)
1545212534.948 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* d d)))))
1545212534.948 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* d d))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))
1545212534.948 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D))
1545212534.948 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212534.952 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212534.966 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212535.072 * [exit]simplify:  Simplified to (* (* (* D (* D w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))
1545212535.072 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (* D (* D w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212535.072 * * * * [misc]progress:  [ 394 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212535.072 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212535.073 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212535.080 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212535.102 * * [misc]simplify:  iters left: 4 (392 enodes)
1545212535.320 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (/ (* d d) w))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212535.320 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (/ (* d d) w))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212535.320 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212535.320 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212535.325 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212535.337 * * [misc]simplify:  iters left: 4 (211 enodes)
1545212535.430 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))
1545212535.430 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212535.430 * * * * [misc]progress:  [ 395 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212535.430 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212535.431 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212535.438 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212535.463 * * [misc]simplify:  iters left: 4 (407 enodes)
1545212535.681 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* w (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (* d (/ c0 h)) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))))
1545212535.681 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* w (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (* d (/ c0 h)) (/ d D))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212535.681 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212535.681 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212535.685 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212535.698 * * [misc]simplify:  iters left: 4 (218 enodes)
1545212535.793 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))
1545212535.793 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212535.793 * * * * [misc]progress:  [ 396 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212535.793 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212535.793 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212535.800 * * [misc]simplify:  iters left: 5 (99 enodes)
1545212535.825 * * [misc]simplify:  iters left: 4 (392 enodes)
1545212536.051 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* (/ d (/ D d)) (/ (/ c0 w) h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212536.051 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) D) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (* (/ d (/ D d)) (/ (/ c0 w) h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212536.052 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212536.052 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212536.056 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212536.067 * * [misc]simplify:  iters left: 4 (205 enodes)
1545212536.161 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))
1545212536.161 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))))
1545212536.161 * * * * [misc]progress:  [ 397 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212536.161 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D))))
1545212536.162 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212536.169 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212536.192 * * [misc]simplify:  iters left: 4 (411 enodes)
1545212536.415 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* D w)) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d c0) (/ d D)) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))))
1545212536.415 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* D w)) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (* d c0) (/ d D)) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212536.416 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212536.416 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212536.420 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212536.435 * * [misc]simplify:  iters left: 4 (218 enodes)
1545212536.531 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))
1545212536.531 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212536.531 * * * * [misc]progress:  [ 398 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212536.531 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212536.531 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212536.538 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212536.561 * * [misc]simplify:  iters left: 4 (396 enodes)
1545212536.788 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (/ (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ D (* (/ (/ c0 h) (/ w d)) d)))))
1545212536.788 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (/ (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (/ D (* (/ (/ c0 h) (/ w d)) d))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212536.788 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212536.788 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212536.792 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212536.804 * * [misc]simplify:  iters left: 4 (205 enodes)
1545212536.895 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))
1545212536.895 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))))
1545212536.895 * * * * [misc]progress:  [ 399 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212536.895 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212536.895 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212536.902 * * [misc]simplify:  iters left: 5 (101 enodes)
1545212536.927 * * [misc]simplify:  iters left: 4 (403 enodes)
1545212537.144 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (* (* (/ c0 h) (/ d D)) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))
1545212537.144 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (* (* (/ c0 h) (/ d D)) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212537.144 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212537.144 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212537.148 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212537.160 * * [misc]simplify:  iters left: 4 (205 enodes)
1545212537.252 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))
1545212537.252 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))))
1545212537.252 * * * * [misc]progress:  [ 400 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212537.253 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212537.253 * * [misc]simplify:  iters left: 6 (47 enodes)
1545212537.262 * * [misc]simplify:  iters left: 5 (127 enodes)
1545212537.290 * * [misc]simplify:  iters left: 4 (498 enodes)
1545212537.590 * [exit]simplify:  Simplified to (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))))
1545212537.590 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (* (/ c0 h) (* d d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212537.591 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212537.591 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212537.596 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212537.618 * * [misc]simplify:  iters left: 4 (329 enodes)
1545212537.804 * [exit]simplify:  Simplified to (* (* (* (* D w) D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))
1545212537.804 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (* (* D w) D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))))))
1545212537.804 * * * * [misc]progress:  [ 401 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212537.805 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212537.805 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212537.816 * * [misc]simplify:  iters left: 5 (122 enodes)
1545212537.844 * * [misc]simplify:  iters left: 4 (491 enodes)
1545212538.144 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3))))))))
1545212538.144 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212538.144 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212538.145 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212538.150 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212538.167 * * [misc]simplify:  iters left: 4 (305 enodes)
1545212538.352 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))
1545212538.352 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))))))
1545212538.352 * * * * [misc]progress:  [ 402 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212538.352 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212538.352 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212538.361 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212538.404 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d d) D) (/ c0 h)))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212538.404 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d d) D) (/ c0 h)))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212538.405 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212538.405 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212538.410 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212538.428 * * [misc]simplify:  iters left: 4 (312 enodes)
1545212538.613 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)))
1545212538.613 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))) (+ (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d d) D) (/ c0 h)))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w))))))
1545212538.613 * * * * [misc]progress:  [ 403 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212538.614 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212538.614 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212538.622 * * [misc]simplify:  iters left: 5 (119 enodes)
1545212538.650 * * [misc]simplify:  iters left: 4 (479 enodes)
1545212538.965 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212538.965 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212538.966 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212538.966 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212538.971 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212538.988 * * [misc]simplify:  iters left: 4 (297 enodes)
1545212539.170 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212539.170 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212539.171 * * * * [misc]progress:  [ 404 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212539.171 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212539.171 * * [misc]simplify:  iters left: 6 (46 enodes)
1545212539.180 * * [misc]simplify:  iters left: 5 (124 enodes)
1545212539.221 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (* (/ d D) (* d c0)) h))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))
1545212539.221 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (* (/ d D) (* d c0)) h))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212539.221 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212539.221 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212539.226 * * [misc]simplify:  iters left: 5 (76 enodes)
1545212539.245 * * [misc]simplify:  iters left: 4 (312 enodes)
1545212539.428 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)))
1545212539.429 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (* (/ d D) (* d c0)) h))) (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w))))))
1545212539.429 * * * * [misc]progress:  [ 405 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212539.429 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212539.429 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212539.437 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212539.468 * * [misc]simplify:  iters left: 4 (481 enodes)
1545212539.777 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (/ (/ (/ c0 w) h) (/ (/ D d) d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212539.778 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (* D (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (/ (/ (/ c0 w) h) (/ (/ D d) d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212539.778 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212539.778 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212539.783 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212539.801 * * [misc]simplify:  iters left: 4 (297 enodes)
1545212539.981 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212539.981 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212539.981 * * * * [misc]progress:  [ 406 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212539.981 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212539.981 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212539.990 * * [misc]simplify:  iters left: 5 (121 enodes)
1545212540.020 * * [misc]simplify:  iters left: 4 (490 enodes)
1545212540.328 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) w) (* (* (/ (/ c0 (/ D d)) (* (/ D d) h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212540.328 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) w) (* (* (/ (/ c0 (/ D d)) (* (/ D d) h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212540.329 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212540.329 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212540.334 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212540.350 * * [misc]simplify:  iters left: 4 (297 enodes)
1545212540.532 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212540.532 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))) (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212540.532 * * * * [misc]progress:  [ 407 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212540.533 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212540.533 * * [misc]simplify:  iters left: 6 (45 enodes)
1545212540.541 * * [misc]simplify:  iters left: 5 (120 enodes)
1545212540.567 * * [misc]simplify:  iters left: 4 (461 enodes)
1545212540.835 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* w (* D D))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212540.835 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* w (* D D))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212540.835 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212540.835 * * [misc]simplify:  iters left: 6 (27 enodes)
1545212540.840 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212540.859 * * [misc]simplify:  iters left: 4 (287 enodes)
1545212541.004 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D D) w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212541.004 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D D) w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212541.004 * * * * [misc]progress:  [ 408 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212541.004 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212541.005 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212541.013 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212541.039 * * [misc]simplify:  iters left: 4 (447 enodes)
1545212541.478 * [exit]simplify:  Simplified to (+ (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (/ (* d d) w)))))
1545212541.478 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (/ (* d d) w))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212541.479 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212541.479 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212541.483 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212541.498 * * [misc]simplify:  iters left: 4 (265 enodes)
1545212541.638 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212541.638 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212541.638 * * * * [misc]progress:  [ 409 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212541.639 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212541.639 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212541.647 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212541.676 * * [misc]simplify:  iters left: 4 (462 enodes)
1545212541.948 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (/ c0 h) (/ d (/ D d)))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))
1545212541.948 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* w (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (/ c0 h) (/ d (/ D d)))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212541.949 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212541.949 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212541.953 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212541.969 * * [misc]simplify:  iters left: 4 (272 enodes)
1545212542.111 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)))
1545212542.111 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w))))))
1545212542.111 * * * * [misc]progress:  [ 410 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212542.111 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212542.112 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212542.119 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212542.145 * * [misc]simplify:  iters left: 4 (447 enodes)
1545212542.428 * [exit]simplify:  Simplified to (+ (* (* (* (* (/ c0 w) (/ d h)) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))))
1545212542.428 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* (/ c0 w) (/ d h)) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212542.428 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212542.428 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212542.436 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212542.450 * * [misc]simplify:  iters left: 4 (257 enodes)
1545212542.586 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212542.586 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212542.586 * * * * [misc]progress:  [ 411 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212542.586 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212542.587 * * [misc]simplify:  iters left: 6 (44 enodes)
1545212542.594 * * [misc]simplify:  iters left: 5 (117 enodes)
1545212542.621 * * [misc]simplify:  iters left: 4 (466 enodes)
1545212542.904 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ (* (/ d D) (* d c0)) h))))
1545212542.904 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- (* M M) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ (* (/ d D) (* d c0)) h)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212542.904 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212542.904 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212542.909 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212542.927 * * [misc]simplify:  iters left: 4 (272 enodes)
1545212543.069 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)))
1545212543.069 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w))))))
1545212543.069 * * * * [misc]progress:  [ 412 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212543.069 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212543.069 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212543.077 * * [misc]simplify:  iters left: 5 (113 enodes)
1545212543.103 * * [misc]simplify:  iters left: 4 (451 enodes)
1545212543.385 * [exit]simplify:  Simplified to (+ (* (* (/ (* (/ c0 h) (/ d D)) (/ w d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))))
1545212543.385 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* (/ c0 h) (/ d D)) (/ w d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (pow M 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212543.385 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212543.385 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212543.389 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212543.404 * * [misc]simplify:  iters left: 4 (257 enodes)
1545212543.538 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212543.538 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212543.538 * * * * [misc]progress:  [ 413 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212543.539 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212543.539 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212543.547 * * [misc]simplify:  iters left: 5 (114 enodes)
1545212543.575 * * [misc]simplify:  iters left: 4 (458 enodes)
1545212543.847 * [exit]simplify:  Simplified to (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (pow M 3)) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M))))) (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) w))
1545212543.847 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (pow M 3)) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M))))) (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) w)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212543.847 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212543.847 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212543.852 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212543.866 * * [misc]simplify:  iters left: 4 (257 enodes)
1545212544.002 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212544.002 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212544.002 * * * * [misc]progress:  [ 414 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))>
1545212544.002 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d)))
1545212544.003 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212544.010 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212544.036 * * [misc]simplify:  iters left: 4 (451 enodes)
1545212544.298 * [exit]simplify:  Simplified to (+ (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M)))))) (* (* D D) w)) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212544.299 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M)))))) (* (* D D) w)) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D)))))
1545212544.300 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* w D) D))
1545212544.300 * * [misc]simplify:  iters left: 6 (26 enodes)
1545212544.304 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212544.320 * * [misc]simplify:  iters left: 4 (271 enodes)
1545212544.457 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D w) D)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))
1545212544.457 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* D w) D)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))))))
1545212544.457 * * * * [misc]progress:  [ 415 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))>
1545212544.458 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212544.458 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212544.468 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212544.492 * * [misc]simplify:  iters left: 4 (431 enodes)
1545212544.744 * [exit]simplify:  Simplified to (+ (* (* (/ c0 (/ (* h w) (* d d))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M)))))) (* D D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))))))
1545212544.744 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (/ (* h w) (* d d))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M)))))) (* D D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D)))))
1545212544.744 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* D D))
1545212544.744 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212544.752 * * [misc]simplify:  iters left: 5 (64 enodes)
1545212544.766 * * [misc]simplify:  iters left: 4 (249 enodes)
1545212544.892 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212544.892 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212544.892 * * * * [misc]progress:  [ 416 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212544.892 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212544.893 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212544.900 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212544.926 * * [misc]simplify:  iters left: 4 (452 enodes)
1545212545.189 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (/ (/ (* d c0) D) (/ h d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M)))))) (* D w)) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212545.189 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (/ (/ (* d c0) D) (/ h d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M)))))) (* D w)) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212545.190 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212545.190 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212545.194 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212545.209 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212545.338 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212545.338 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212545.338 * * * * [misc]progress:  [ 417 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212545.338 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212545.338 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212545.346 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212545.370 * * [misc]simplify:  iters left: 4 (432 enodes)
1545212545.642 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212545.642 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212545.642 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212545.642 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212545.646 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212545.660 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212545.784 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212545.784 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212545.784 * * * * [misc]progress:  [ 418 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))>
1545212545.784 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D))))
1545212545.785 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212545.792 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212545.820 * * [misc]simplify:  iters left: 4 (450 enodes)
1545212546.092 * [exit]simplify:  Simplified to (+ (* (* (/ (* d (/ c0 h)) (/ D d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))))))) (* w (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212546.092 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* d (/ c0 h)) (/ D d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* D (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))))))) (* w (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D)))))
1545212546.093 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* w D))
1545212546.093 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212546.097 * * [misc]simplify:  iters left: 5 (65 enodes)
1545212546.112 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212546.240 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212546.240 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212546.240 * * * * [misc]progress:  [ 419 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))>
1545212546.241 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212546.241 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212546.248 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212546.273 * * [misc]simplify:  iters left: 4 (437 enodes)
1545212546.538 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))))))) (* (* (* (/ (/ c0 h) (/ w d)) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212546.538 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))))))) (* (* (* (/ (/ c0 h) (/ w d)) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D))))
1545212546.538 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) D)
1545212546.538 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212546.543 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212546.556 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212546.680 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212546.680 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212546.680 * * * * [misc]progress:  [ 420 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))>
1545212546.681 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212546.681 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212546.688 * * [misc]simplify:  iters left: 5 (109 enodes)
1545212546.713 * * [misc]simplify:  iters left: 4 (444 enodes)
1545212546.977 * [exit]simplify:  Simplified to (+ (* w (* (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M))))) (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (* M M) (- M)))))))) (* (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))))
1545212546.977 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (* (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M))))) (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (* M M) (- M)))))))) (* (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w))))
1545212546.977 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) w)
1545212546.977 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212546.981 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212546.995 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212547.119 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))))))))
1545212547.119 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))))))))))
1545212547.119 * * * * [misc]progress:  [ 421 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212547.119 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212547.120 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212547.126 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212547.149 * * [misc]simplify:  iters left: 4 (359 enodes)
1545212547.346 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) D) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* D w))))
1545212547.346 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) D) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* D w)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212547.346 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212547.347 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212547.350 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212547.364 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212547.420 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D w) D)))
1545212547.421 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D w) D))))))
1545212547.421 * * * * [misc]progress:  [ 422 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212547.421 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212547.421 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212547.430 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212547.449 * * [misc]simplify:  iters left: 4 (347 enodes)
1545212547.637 * [exit]simplify:  Simplified to (+ (* (* D D) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))))) (* (* (* d (/ (* d c0) (* h w))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212547.637 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D D) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))))) (* (* (* d (/ (* d c0) (* h w))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212547.637 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212547.637 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212547.644 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212547.653 * * [misc]simplify:  iters left: 4 (150 enodes)
1545212547.704 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D)))
1545212547.704 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D D))))))
1545212547.704 * * * * [misc]progress:  [ 423 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212547.704 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212547.705 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212547.713 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212547.734 * * [misc]simplify:  iters left: 4 (362 enodes)
1545212547.935 * [exit]simplify:  Simplified to (+ (* (* D w) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M))))))) (* (* (/ (* (* d d) (/ c0 h)) D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212547.936 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M))))))) (* (* (/ (* (* d d) (/ c0 h)) D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212547.936 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212547.936 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212547.939 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212547.949 * * [misc]simplify:  iters left: 4 (157 enodes)
1545212548.004 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w)))
1545212548.004 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w))))))
1545212548.004 * * * * [misc]progress:  [ 424 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212548.004 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212548.004 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212548.011 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212548.030 * * [misc]simplify:  iters left: 4 (345 enodes)
1545212548.235 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (/ c0 h) (/ w d)) (/ D d)))) (* D (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212548.235 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (/ c0 h) (/ w d)) (/ D d)))) (* D (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212548.236 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212548.236 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212548.239 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212548.248 * * [misc]simplify:  iters left: 4 (140 enodes)
1545212548.299 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212548.299 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212548.299 * * * * [misc]progress:  [ 425 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212548.299 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212548.300 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212548.306 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212548.326 * * [misc]simplify:  iters left: 4 (366 enodes)
1545212548.527 * [exit]simplify:  Simplified to (+ (* (* D w) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M))))))) (* (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212548.527 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D w) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* M M))))))) (* (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212548.527 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212548.528 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212548.531 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212548.541 * * [misc]simplify:  iters left: 4 (157 enodes)
1545212548.596 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w)))
1545212548.596 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D w))))))
1545212548.596 * * * * [misc]progress:  [ 426 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212548.596 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212548.597 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212548.603 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212548.623 * * [misc]simplify:  iters left: 4 (351 enodes)
1545212548.828 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (/ (* d d) D)))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212548.828 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (/ c0 w) h) (/ (* d d) D)))) (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212548.829 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212548.829 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212548.832 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212548.841 * * [misc]simplify:  iters left: 4 (140 enodes)
1545212548.892 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212548.892 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212548.892 * * * * [misc]progress:  [ 427 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212548.893 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212548.893 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212548.899 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212548.922 * * [misc]simplify:  iters left: 4 (358 enodes)
1545212549.119 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))) (/ (/ c0 (/ D d)) (* (/ D d) h)))) (* (* (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (sqrt (sqrt (* (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) w))
1545212549.119 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))) (/ (/ c0 (/ D d)) (* (/ D d) h)))) (* (* (sqrt (sqrt (* (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (sqrt (sqrt (* (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) w)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212549.120 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212549.120 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212549.123 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212549.134 * * [misc]simplify:  iters left: 4 (140 enodes)
1545212549.183 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212549.184 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212549.184 * * * * [misc]progress:  [ 428 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212549.184 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212549.184 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212549.192 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212549.216 * * [misc]simplify:  iters left: 4 (389 enodes)
1545212549.412 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* d c0) (/ h d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))) (* M M)))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212549.412 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* d c0) (/ h d))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w))) (* M M)))))) (* (* D (* D w)) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212549.413 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212549.413 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212549.418 * * [misc]simplify:  iters left: 5 (61 enodes)
1545212549.430 * * [misc]simplify:  iters left: 4 (215 enodes)
1545212549.515 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (* (* D D) w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212549.515 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* (* (* D D) w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212549.515 * * * * [misc]progress:  [ 429 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212549.515 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212549.516 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212549.523 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212549.545 * * [misc]simplify:  iters left: 4 (379 enodes)
1545212549.735 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212549.735 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* D D) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (* (/ c0 h) (/ (* d d) w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212549.736 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212549.736 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212549.740 * * [misc]simplify:  iters left: 5 (56 enodes)
1545212549.751 * * [misc]simplify:  iters left: 4 (189 enodes)
1545212549.829 * [exit]simplify:  Simplified to (* (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212549.829 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212549.829 * * * * [misc]progress:  [ 430 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212549.830 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212549.830 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212549.837 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212549.860 * * [misc]simplify:  iters left: 4 (394 enodes)
1545212550.057 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* w (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212550.058 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* w (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212550.058 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212550.058 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212550.062 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212550.074 * * [misc]simplify:  iters left: 4 (196 enodes)
1545212550.152 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212550.152 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212550.152 * * * * [misc]progress:  [ 431 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212550.152 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212550.152 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212550.159 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212550.184 * * [misc]simplify:  iters left: 4 (376 enodes)
1545212550.389 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))))) (* D (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (* M M) (- M))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))))) (* (* (sqrt (sqrt (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))) (/ (* (/ c0 h) (/ d D)) (/ w d))) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))))))
1545212550.389 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M) (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))))) (* D (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (* M M) (- M))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))))) (* (* (sqrt (sqrt (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))))) (/ (* (/ c0 h) (/ d D)) (/ w d))) (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212550.390 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212550.390 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212550.394 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212550.405 * * [misc]simplify:  iters left: 4 (185 enodes)
1545212550.479 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212550.479 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212550.479 * * * * [misc]progress:  [ 432 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212550.480 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212550.480 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212550.487 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212550.510 * * [misc]simplify:  iters left: 4 (398 enodes)
1545212550.714 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* w (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (/ (* d c0) (* (/ D d) h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212550.715 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* w (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (/ (* d c0) (* (/ D d) h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212550.715 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212550.715 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212550.719 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212550.734 * * [misc]simplify:  iters left: 4 (196 enodes)
1545212550.812 * [exit]simplify:  Simplified to (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))))))))
1545212550.812 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212550.812 * * * * [misc]progress:  [ 433 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212550.812 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212550.813 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212550.820 * * [misc]simplify:  iters left: 5 (101 enodes)
1545212550.842 * * [misc]simplify:  iters left: 4 (381 enodes)
1545212551.045 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ (/ c0 (* h w)) (/ D (* d d)))) (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212551.045 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* D (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ (/ c0 (* h w)) (/ D (* d d)))) (sqrt (sqrt (+ (+ (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212551.045 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212551.045 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212551.049 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212551.060 * * [misc]simplify:  iters left: 4 (185 enodes)
1545212551.136 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212551.136 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212551.136 * * * * [misc]progress:  [ 434 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212551.136 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212551.136 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212551.146 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212551.169 * * [misc]simplify:  iters left: 4 (390 enodes)
1545212551.368 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3)) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) w) (* (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) (/ (/ (/ c0 h) (/ D d)) (/ D d)))))
1545212551.368 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3)) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) w) (* (sqrt (sqrt (+ (+ (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) (/ (/ (/ c0 h) (/ D d)) (/ D d))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212551.368 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212551.368 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212551.372 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212551.384 * * [misc]simplify:  iters left: 4 (185 enodes)
1545212551.457 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212551.457 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212551.457 * * * * [misc]progress:  [ 435 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212551.458 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212551.458 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212551.464 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212551.482 * * [misc]simplify:  iters left: 4 (299 enodes)
1545212551.616 * [exit]simplify:  Simplified to (+ (* (* w (* D D)) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* d d) (/ c0 h)))))
1545212551.616 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (* D D)) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (* (* d d) (/ c0 h))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212551.616 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212551.616 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212551.619 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212551.627 * * [misc]simplify:  iters left: 4 (127 enodes)
1545212551.657 * * [misc]simplify:  iters left: 3 (368 enodes)
1545212551.780 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D (* D w))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212551.780 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* D (* D w))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212551.780 * * * * [misc]progress:  [ 436 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212551.781 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212551.781 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212551.787 * * [misc]simplify:  iters left: 5 (83 enodes)
1545212551.803 * * [misc]simplify:  iters left: 4 (283 enodes)
1545212551.937 * [exit]simplify:  Simplified to (+ (* (* d (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (/ c0 h) (/ w d)))) (* (* (* D D) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))
1545212551.937 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) (/ (/ c0 h) (/ w d)))) (* (* (* D D) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212551.937 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212551.938 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212551.941 * * [misc]simplify:  iters left: 5 (40 enodes)
1545212551.948 * * [misc]simplify:  iters left: 4 (107 enodes)
1545212551.970 * * [misc]simplify:  iters left: 3 (299 enodes)
1545212552.067 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ M (* (/ (/ d D) (/ h c0)) (/ (/ d D) w))))) (* (* D D) (sqrt (sqrt (- M (* (/ (/ d D) (/ h c0)) (/ (/ d D) w)))))))
1545212552.067 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ M (* (/ (/ d D) (/ h c0)) (/ (/ d D) w))))) (* (* D D) (sqrt (sqrt (- M (* (/ (/ d D) (/ h c0)) (/ (/ d D) w))))))))))
1545212552.067 * * * * [misc]progress:  [ 437 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212552.068 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212552.068 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212552.074 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212552.092 * * [misc]simplify:  iters left: 4 (298 enodes)
1545212552.482 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (* d c0) D) (/ h d))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212552.482 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (/ (* d c0) D) (/ h d))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212552.482 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212552.483 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212552.486 * * [misc]simplify:  iters left: 5 (41 enodes)
1545212552.493 * * [misc]simplify:  iters left: 4 (114 enodes)
1545212552.519 * * [misc]simplify:  iters left: 3 (320 enodes)
1545212552.622 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d)))))) w) (* D (sqrt (sqrt (- M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d))))))))
1545212552.622 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (+ M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d)))))) w) (* D (sqrt (sqrt (- M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d)))))))))))
1545212552.622 * * * * [misc]progress:  [ 438 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212552.622 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212552.622 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212552.629 * * [misc]simplify:  iters left: 5 (80 enodes)
1545212552.647 * * [misc]simplify:  iters left: 4 (283 enodes)
1545212552.792 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ d D) (* (/ c0 w) (/ d h))))))
1545212552.792 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ d D) (* (/ c0 w) (/ d h)))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212552.793 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212552.793 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212552.796 * * [misc]simplify:  iters left: 5 (37 enodes)
1545212552.802 * * [misc]simplify:  iters left: 4 (95 enodes)
1545212552.822 * * [misc]simplify:  iters left: 3 (272 enodes)
1545212552.914 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))) (* D (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w))))))))
1545212552.914 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))) (* D (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))))))))
1545212552.914 * * * * [misc]progress:  [ 439 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212552.914 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212552.914 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212552.921 * * [misc]simplify:  iters left: 5 (85 enodes)
1545212552.938 * * [misc]simplify:  iters left: 4 (302 enodes)
1545212553.086 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ d D) (* d c0)) h))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212553.086 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (/ (* (/ d D) (* d c0)) h))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212553.086 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212553.086 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212553.089 * * [misc]simplify:  iters left: 5 (41 enodes)
1545212553.097 * * [misc]simplify:  iters left: 4 (114 enodes)
1545212553.120 * * [misc]simplify:  iters left: 3 (320 enodes)
1545212553.225 * [exit]simplify:  Simplified to (* (* (sqrt (sqrt (+ M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d)))))) w) (* D (sqrt (sqrt (- M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d))))))))
1545212553.225 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (+ M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d)))))) w) (* D (sqrt (sqrt (- M (/ (/ (/ c0 w) h) (* (/ D d) (/ D d)))))))))))
1545212553.225 * * * * [misc]progress:  [ 440 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212553.225 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212553.225 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212553.231 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212553.248 * * [misc]simplify:  iters left: 4 (289 enodes)
1545212553.396 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (/ c0 (* h w)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (/ d (/ D d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212553.396 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (/ c0 (* h w)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (/ d (/ D d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212553.396 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212553.397 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212553.399 * * [misc]simplify:  iters left: 5 (37 enodes)
1545212553.406 * * [misc]simplify:  iters left: 4 (95 enodes)
1545212553.425 * * [misc]simplify:  iters left: 3 (272 enodes)
1545212553.516 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))) (* D (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w))))))))
1545212553.516 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))) (* D (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))))))))
1545212553.516 * * * * [misc]progress:  [ 441 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212553.516 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212553.516 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212553.522 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212553.542 * * [misc]simplify:  iters left: 4 (296 enodes)
1545212553.683 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) w) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))) (/ c0 h)) (* (* (/ d D) (/ d D)) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))))
1545212553.683 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) w) (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))) (/ c0 h)) (* (* (/ d D) (/ d D)) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212553.683 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212553.683 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212553.687 * * [misc]simplify:  iters left: 5 (37 enodes)
1545212553.693 * * [misc]simplify:  iters left: 4 (95 enodes)
1545212553.713 * * [misc]simplify:  iters left: 3 (272 enodes)
1545212553.805 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))) (* w (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w))))))))
1545212553.805 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))) (* w (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))))))))
1545212553.805 * * * * [misc]progress:  [ 442 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))>
1545212553.805 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d)))
1545212553.805 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212553.813 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212553.836 * * [misc]simplify:  iters left: 4 (406 enodes)
1545212554.057 * [exit]simplify:  Simplified to (+ (* (* (* w (* D D)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M)))))))
1545212554.057 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* w (* D D)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (* (* (* d d) (/ c0 h)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))
1545212554.057 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D))
1545212554.057 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212554.061 * * [misc]simplify:  iters left: 5 (62 enodes)
1545212554.075 * * [misc]simplify:  iters left: 4 (235 enodes)
1545212554.181 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) (* (* w (* D D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212554.181 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M))))) (* (* w (* D D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212554.181 * * * * [misc]progress:  [ 443 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))>
1545212554.181 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212554.182 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212554.189 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212554.212 * * [misc]simplify:  iters left: 4 (392 enodes)
1545212554.428 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D D)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d c0) (* h w)) d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212554.428 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D D)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d c0) (* h w)) d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D)))))
1545212554.429 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* D D))
1545212554.429 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212554.433 * * [misc]simplify:  iters left: 5 (57 enodes)
1545212554.445 * * [misc]simplify:  iters left: 4 (211 enodes)
1545212554.540 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212554.540 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D D) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212554.540 * * * * [misc]progress:  [ 444 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212554.541 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212554.541 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212554.548 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212554.573 * * [misc]simplify:  iters left: 4 (407 enodes)
1545212554.799 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D w)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d c0) (* h D)) d))))
1545212554.799 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))) (* D w)) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ (* d c0) (* h D)) d)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212554.799 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212554.799 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212554.803 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212554.816 * * [misc]simplify:  iters left: 4 (218 enodes)
1545212554.916 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212554.916 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212554.916 * * * * [misc]progress:  [ 445 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212554.917 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212554.917 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212554.924 * * [misc]simplify:  iters left: 5 (99 enodes)
1545212554.946 * * [misc]simplify:  iters left: 4 (392 enodes)
1545212555.170 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (* (/ d D) d) (/ c0 (* h w))))))
1545212555.170 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3)))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (* (/ d D) d) (/ c0 (* h w)))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212555.170 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212555.171 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212555.174 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212555.186 * * [misc]simplify:  iters left: 4 (203 enodes)
1545212555.281 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))
1545212555.281 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212555.281 * * * * [misc]progress:  [ 446 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))>
1545212555.281 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D))))
1545212555.282 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212555.289 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212555.312 * * [misc]simplify:  iters left: 4 (411 enodes)
1545212555.542 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))) (* D w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ c0 (* (/ D d) (/ h d)))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212555.542 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))) (* D w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (/ c0 (* (/ D d) (/ h d)))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D)))))
1545212555.542 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* w D))
1545212555.542 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212555.546 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212555.559 * * [misc]simplify:  iters left: 4 (218 enodes)
1545212555.656 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))
1545212555.656 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))))
1545212555.656 * * * * [misc]progress:  [ 447 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))>
1545212555.656 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212555.657 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212555.664 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212555.688 * * [misc]simplify:  iters left: 4 (396 enodes)
1545212555.914 * [exit]simplify:  Simplified to (+ (* D (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (/ c0 (* h w)) (/ d (/ D d)))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212555.914 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* D (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (pow M 3))))))) (* (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (/ c0 (* h w)) (/ d (/ D d)))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D))))
1545212555.914 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) D)
1545212555.915 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212555.918 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212555.930 * * [misc]simplify:  iters left: 4 (203 enodes)
1545212556.024 * [exit]simplify:  Simplified to (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))
1545212556.024 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212556.024 * * * * [misc]progress:  [ 448 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))>
1545212556.024 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212556.024 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212556.031 * * [misc]simplify:  iters left: 5 (101 enodes)
1545212556.054 * * [misc]simplify:  iters left: 4 (403 enodes)
1545212556.270 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (pow M 3))))) w) (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) (* (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) (/ (/ (/ c0 h) (/ D d)) (/ D d))) (sqrt (sqrt (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))
1545212556.270 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (+ (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3) (pow M 3))))) w) (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) (* (* (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))) (/ (/ (/ c0 h) (/ D d)) (/ D d))) (sqrt (sqrt (- (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w))))
1545212556.270 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) w)
1545212556.271 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212556.274 * * [misc]simplify:  iters left: 5 (54 enodes)
1545212556.286 * * [misc]simplify:  iters left: 4 (203 enodes)
1545212556.380 * [exit]simplify:  Simplified to (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))
1545212556.381 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))))))
1545212556.381 * * * * [misc]progress:  [ 449 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))>
1545212556.381 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) d)))
1545212556.381 * * [misc]simplify:  iters left: 6 (30 enodes)
1545212556.386 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212556.402 * * [misc]simplify:  iters left: 4 (260 enodes)
1545212556.513 * [exit]simplify:  Simplified to (+ (* (* (* D D) w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (/ (* d c0) (/ h d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))
1545212556.513 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (/ (* d c0) (/ h d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D)))))
1545212556.513 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* w D) D))
1545212556.513 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212556.517 * * [misc]simplify:  iters left: 5 (40 enodes)
1545212556.524 * * [misc]simplify:  iters left: 4 (117 enodes)
1545212556.548 * * [misc]simplify:  iters left: 3 (335 enodes)
1545212556.655 * [exit]simplify:  Simplified to (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* w (* D D)))
1545212556.655 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) w) (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (/ (* d c0) (/ h d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (* w (* D D))))))
1545212556.655 * * * * [misc]progress:  [ 450 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))>
1545212556.655 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212556.655 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212556.661 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212556.675 * * [misc]simplify:  iters left: 4 (244 enodes)
1545212556.786 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (* d d) (/ (/ c0 w) h))))
1545212556.786 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (* d d) (/ (/ c0 w) h)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D)))))
1545212556.786 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* D D))
1545212556.786 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212556.789 * * [misc]simplify:  iters left: 5 (35 enodes)
1545212556.796 * * [misc]simplify:  iters left: 4 (95 enodes)
1545212556.815 * * [misc]simplify:  iters left: 3 (274 enodes)
1545212556.905 * [exit]simplify:  Simplified to (* (* D D) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* w h) c0)))))
1545212556.905 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D D)) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (* d d) (/ (/ c0 w) h)))) (* (* D D) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* w h) c0))))))))
1545212556.905 * * * * [misc]progress:  [ 451 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212556.905 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212556.906 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212556.913 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212556.928 * * [misc]simplify:  iters left: 4 (257 enodes)
1545212557.040 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (/ c0 (/ h d)) (/ d D))))
1545212557.040 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (/ c0 (/ h d)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212557.040 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212557.040 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212557.043 * * [misc]simplify:  iters left: 5 (36 enodes)
1545212557.052 * * [misc]simplify:  iters left: 4 (102 enodes)
1545212557.073 * * [misc]simplify:  iters left: 3 (287 enodes)
1545212557.164 * [exit]simplify:  Simplified to (* (* D w) (sqrt (- M (/ (/ c0 (* w h)) (* (/ D d) (/ D d))))))
1545212557.164 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (/ c0 (/ h d)) (/ d D)))) (* (* D w) (sqrt (- M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))))))))
1545212557.164 * * * * [misc]progress:  [ 452 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212557.165 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212557.165 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212557.170 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212557.186 * * [misc]simplify:  iters left: 4 (247 enodes)
1545212557.304 * [exit]simplify:  Simplified to (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))) D) (* (* (/ c0 (* h w)) (* (/ d D) d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))
1545212557.304 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))) D) (* (* (/ c0 (* h w)) (* (/ d D) d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212557.304 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212557.304 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212557.307 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212557.312 * * [misc]simplify:  iters left: 4 (89 enodes)
1545212557.334 * * [misc]simplify:  iters left: 3 (272 enodes)
1545212557.425 * [exit]simplify:  Simplified to (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D)
1545212557.425 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M)))) D) (* (* (/ c0 (* h w)) (* (/ d D) d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))
1545212557.425 * * * * [misc]progress:  [ 453 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))>
1545212557.425 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D))))
1545212557.425 * * [misc]simplify:  iters left: 6 (29 enodes)
1545212557.431 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212557.446 * * [misc]simplify:  iters left: 4 (263 enodes)
1545212557.564 * [exit]simplify:  Simplified to (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (* d (/ c0 h)) (/ d D))))
1545212557.564 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (* d (/ c0 h)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))
1545212557.565 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D))
1545212557.565 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212557.567 * * [misc]simplify:  iters left: 5 (36 enodes)
1545212557.574 * * [misc]simplify:  iters left: 4 (102 enodes)
1545212557.597 * * [misc]simplify:  iters left: 3 (287 enodes)
1545212557.688 * [exit]simplify:  Simplified to (* (* D w) (sqrt (- M (/ (/ c0 (* w h)) (* (/ D d) (/ D d))))))
1545212557.688 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D w)) (* (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (* (* d (/ c0 h)) (/ d D)))) (* (* D w) (sqrt (- M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))))))))
1545212557.688 * * * * [misc]progress:  [ 454 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))>
1545212557.689 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212557.689 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212557.694 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212557.708 * * [misc]simplify:  iters left: 4 (250 enodes)
1545212557.827 * [exit]simplify:  Simplified to (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))
1545212557.827 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D))))
1545212557.827 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) D)
1545212557.828 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212557.830 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212557.836 * * [misc]simplify:  iters left: 4 (89 enodes)
1545212557.854 * * [misc]simplify:  iters left: 3 (272 enodes)
1545212557.948 * [exit]simplify:  Simplified to (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D)
1545212557.948 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))
1545212557.948 * * * * [misc]progress:  [ 455 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))>
1545212557.948 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212557.949 * * [misc]simplify:  iters left: 6 (28 enodes)
1545212557.953 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212557.968 * * [misc]simplify:  iters left: 4 (259 enodes)
1545212558.086 * [exit]simplify:  Simplified to (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))
1545212558.086 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w))))
1545212558.087 * [enter]simplify:  Simplifying (* (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) w)
1545212558.087 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212558.089 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212558.095 * * [misc]simplify:  iters left: 4 (89 enodes)
1545212558.114 * * [misc]simplify:  iters left: 3 (272 enodes)
1545212558.207 * [exit]simplify:  Simplified to (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w)
1545212558.208 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))
1545212558.208 * * * * [misc]progress:  [ 456 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212558.208 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212558.208 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212558.216 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212558.242 * * [misc]simplify:  iters left: 4 (448 enodes)
1545212558.520 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* d d) (/ c0 h))) (* (* (* (* D w) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)))))))
1545212558.520 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* d d) (/ c0 h))) (* (* (* (* D w) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212558.521 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212558.521 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212558.525 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212558.542 * * [misc]simplify:  iters left: 4 (293 enodes)
1545212558.719 * [exit]simplify:  Simplified to (* (* D (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212558.719 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* D (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212558.719 * * * * [misc]progress:  [ 457 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212558.719 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212558.720 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212558.727 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212558.752 * * [misc]simplify:  iters left: 4 (425 enodes)
1545212559.002 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))) (* D D))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (/ c0 h) (/ (* d d) w))))
1545212559.002 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (- M) (* M M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))) (* D D))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (/ c0 h) (/ (* d d) w)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212559.002 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212559.003 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212559.007 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212559.023 * * [misc]simplify:  iters left: 4 (279 enodes)
1545212559.199 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* D D))
1545212559.199 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* D D)))))
1545212559.199 * * * * [misc]progress:  [ 458 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212559.199 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212559.200 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212559.207 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212559.233 * * [misc]simplify:  iters left: 4 (440 enodes)
1545212559.498 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (/ (/ c0 (/ h d)) (/ D d))))
1545212559.498 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (/ (/ c0 (/ h d)) (/ D d)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212559.499 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212559.499 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212559.504 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212559.520 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212559.698 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* D w))
1545212559.698 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* D w)))))
1545212559.698 * * * * [misc]progress:  [ 459 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212559.698 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212559.699 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212559.706 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212559.731 * * [misc]simplify:  iters left: 4 (433 enodes)
1545212560.010 * [exit]simplify:  Simplified to (+ (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))))
1545212560.010 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (+ (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212560.010 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212560.011 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212560.015 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212560.033 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212560.203 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) D)
1545212560.203 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) D))))
1545212560.203 * * * * [misc]progress:  [ 460 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212560.203 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212560.204 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212560.211 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212560.240 * * [misc]simplify:  iters left: 4 (444 enodes)
1545212560.507 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ d D) (/ c0 h)) d)))
1545212560.507 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))))))) (* (* (/ d D) (/ c0 h)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212560.507 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212560.508 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212560.512 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212560.531 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212560.708 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* D w))
1545212560.708 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* D w)))))
1545212560.708 * * * * [misc]progress:  [ 461 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212560.709 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212560.709 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212560.716 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212560.744 * * [misc]simplify:  iters left: 4 (434 enodes)
1545212561.011 * [exit]simplify:  Simplified to (+ (* (/ (* (/ c0 h) (* d d)) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))))
1545212561.011 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ c0 h) (* d d)) (* D w)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212561.011 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212561.011 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212561.016 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212561.031 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212561.199 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) D)
1545212561.199 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) D))))
1545212561.199 * * * * [misc]progress:  [ 462 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212561.199 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212561.200 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212561.207 * * [misc]simplify:  iters left: 5 (109 enodes)
1545212561.235 * * [misc]simplify:  iters left: 4 (441 enodes)
1545212561.508 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))))) (* (* w (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)) (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (* (* M M) (- M))))))))
1545212561.508 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))))) (* (* w (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)) (+ (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3) (* (* M M) (- M)))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212561.509 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212561.509 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212561.513 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212561.528 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212561.697 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212561.697 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212561.697 * * * * [misc]progress:  [ 463 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212561.698 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212561.698 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212561.708 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212561.732 * * [misc]simplify:  iters left: 4 (412 enodes)
1545212561.964 * [exit]simplify:  Simplified to (+ (* (* (* (* D D) w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212561.964 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* D D) w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212561.964 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212561.964 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212561.968 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212561.983 * * [misc]simplify:  iters left: 4 (250 enodes)
1545212562.117 * [exit]simplify:  Simplified to (* (* (* D w) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212562.117 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (* D w) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212562.117 * * * * [misc]progress:  [ 464 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212562.117 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212562.117 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212562.127 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212562.150 * * [misc]simplify:  iters left: 4 (396 enodes)
1545212562.379 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ d w) (/ c0 h)) d)) (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)))) (* D D))))
1545212562.379 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ d w) (/ c0 h)) d)) (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)))) (* D D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212562.379 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212562.380 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212562.383 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212562.397 * * [misc]simplify:  iters left: 4 (236 enodes)
1545212562.526 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D D))
1545212562.526 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D D)))))
1545212562.526 * * * * [misc]progress:  [ 465 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212562.526 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212562.526 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212562.533 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212562.559 * * [misc]simplify:  iters left: 4 (413 enodes)
1545212562.791 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ d D) (/ c0 h)) d)) (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) (* D w))))
1545212562.791 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (/ d D) (/ c0 h)) d)) (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) (* D w)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212562.791 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212562.791 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212562.795 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212562.809 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212562.937 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))
1545212562.937 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))))
1545212562.937 * * * * [misc]progress:  [ 466 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212562.937 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212562.938 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212562.945 * * [misc]simplify:  iters left: 5 (99 enodes)
1545212562.970 * * [misc]simplify:  iters left: 4 (395 enodes)
1545212563.208 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ (* (* d c0) (/ d D)) (* w h))))
1545212563.208 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ (* (* d c0) (/ d D)) (* w h)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212563.209 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212563.209 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212563.213 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212563.225 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212563.356 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212563.356 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212563.356 * * * * [misc]progress:  [ 467 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212563.356 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212563.356 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212563.364 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212563.390 * * [misc]simplify:  iters left: 4 (413 enodes)
1545212563.803 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* d (/ d D)) (/ c0 h))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) (* D w)) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))))
1545212563.803 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* d (/ d D)) (/ c0 h))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) (* D w)) (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212563.804 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212563.804 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212563.808 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212563.821 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212563.950 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))
1545212563.950 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))))
1545212563.950 * * * * [misc]progress:  [ 468 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212563.950 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212563.951 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212563.958 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212563.983 * * [misc]simplify:  iters left: 4 (398 enodes)
1545212564.214 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ (/ c0 (* w h)) (/ D (* d d)))))
1545212564.214 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ (/ c0 (* w h)) (/ D (* d d))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212564.214 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212564.214 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212564.218 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212564.231 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212564.361 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212564.361 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212564.361 * * * * [misc]progress:  [ 469 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212564.361 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212564.361 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212564.368 * * [misc]simplify:  iters left: 5 (101 enodes)
1545212564.394 * * [misc]simplify:  iters left: 4 (405 enodes)
1545212564.631 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (/ (* (/ d D) (/ d D)) (/ (* w h) c0)) 3)) (* (- (/ (* (/ d D) (/ d D)) (/ (* w h) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* w h) c0))))))) (* w (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ (* w h) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* w h) c0)))))))) (* (sqrt (sqrt (* (- (* (/ (* (/ d D) (/ d D)) (/ (* w h) c0)) (/ (* (/ d D) (/ d D)) (/ (* w h) c0))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (/ (* (/ d D) (/ d D)) (/ (* w h) c0)))))) (* (* (/ d D) (/ c0 h)) (/ d D))))
1545212564.631 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow M 3) (pow (/ (* (/ d D) (/ d D)) (/ (* w h) c0)) 3)) (* (- (/ (* (/ d D) (/ d D)) (/ (* w h) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* w h) c0))))))) (* w (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ (* w h) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* w h) c0)))))))) (* (sqrt (sqrt (* (- (* (/ (* (/ d D) (/ d D)) (/ (* w h) c0)) (/ (* (/ d D) (/ d D)) (/ (* w h) c0))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ M (/ (* (/ d D) (/ d D)) (/ (* w h) c0)))))) (* (* (/ d D) (/ c0 h)) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212564.632 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212564.633 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212564.636 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212564.649 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212564.779 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212564.779 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212564.779 * * * * [misc]progress:  [ 470 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212564.780 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212564.780 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212564.787 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212564.814 * * [misc]simplify:  iters left: 4 (427 enodes)
1545212565.053 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* D D) w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212565.053 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* D D) w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212565.053 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212565.053 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212565.057 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212565.071 * * [misc]simplify:  iters left: 4 (248 enodes)
1545212565.201 * [exit]simplify:  Simplified to (* (* (* D w) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212565.201 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (* D w) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212565.201 * * * * [misc]progress:  [ 471 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212565.201 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212565.201 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212565.208 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212565.234 * * [misc]simplify:  iters left: 4 (409 enodes)
1545212565.470 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (* (* (/ c0 h) (/ d w)) d)) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))
1545212565.470 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))) (* M M)))))) (* (* (/ c0 h) (/ d w)) d)) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))) (* D D)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212565.470 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212565.470 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212565.474 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212565.488 * * [misc]simplify:  iters left: 4 (234 enodes)
1545212565.607 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D D))
1545212565.607 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D D)))))
1545212565.608 * * * * [misc]progress:  [ 472 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212565.608 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212565.608 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212565.615 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212565.639 * * [misc]simplify:  iters left: 4 (426 enodes)
1545212565.885 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (/ (* d c0) (* D h)) d)) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))))
1545212565.885 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M)))))) (* (/ (* d c0) (* D h)) d)) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212565.885 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212565.885 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212565.889 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212565.903 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212566.024 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D w))
1545212566.024 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D w)))))
1545212566.024 * * * * [misc]progress:  [ 473 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212566.024 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212566.024 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212566.031 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212566.055 * * [misc]simplify:  iters left: 4 (408 enodes)
1545212566.301 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 w) (/ d h)) (/ d D))))
1545212566.301 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (/ c0 w) (/ d h)) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212566.301 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212566.301 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212566.305 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212566.317 * * [misc]simplify:  iters left: 4 (225 enodes)
1545212566.434 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)
1545212566.434 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))))
1545212566.435 * * * * [misc]progress:  [ 474 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212566.435 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212566.435 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212566.442 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212566.466 * * [misc]simplify:  iters left: 4 (426 enodes)
1545212566.706 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (* (* (/ d D) (/ c0 h)) d)) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212566.707 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (* (* (/ d D) (/ c0 h)) d)) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212566.707 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212566.707 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212566.711 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212566.724 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212566.847 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D w))
1545212566.847 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D w)))))
1545212566.847 * * * * [misc]progress:  [ 475 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212566.847 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212566.848 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212566.855 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212566.878 * * [misc]simplify:  iters left: 4 (411 enodes)
1545212567.114 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D)) (/ (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ D (* (/ c0 (* w h)) (* d d)))))
1545212567.114 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D)) (/ (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (/ D (* (/ c0 (* w h)) (* d d))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212567.114 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212567.115 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212567.118 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212567.131 * * [misc]simplify:  iters left: 4 (225 enodes)
1545212567.249 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)
1545212567.249 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))))
1545212567.249 * * * * [misc]progress:  [ 476 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212567.249 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212567.249 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212567.256 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212567.280 * * [misc]simplify:  iters left: 4 (418 enodes)
1545212567.523 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212567.523 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) 3)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))))) (* (sqrt (sqrt (* (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212567.524 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212567.524 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212567.527 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212567.540 * * [misc]simplify:  iters left: 4 (225 enodes)
1545212567.655 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212567.655 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212567.656 * * * * [misc]progress:  [ 477 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212567.656 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212567.656 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212567.665 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212567.684 * * [misc]simplify:  iters left: 4 (319 enodes)
1545212567.848 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* d d) (/ c0 h))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D w) D)) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))))
1545212567.848 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* d d) (/ c0 h))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D w) D)) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212567.848 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212567.849 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212567.852 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212567.861 * * [misc]simplify:  iters left: 4 (149 enodes)
1545212567.914 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D (* D w)))
1545212567.914 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D (* D w))))))
1545212567.914 * * * * [misc]progress:  [ 478 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212567.914 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212567.915 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212567.921 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212567.938 * * [misc]simplify:  iters left: 4 (306 enodes)
1545212568.107 * [exit]simplify:  Simplified to (+ (* (/ (/ c0 (/ h d)) (/ w d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D D))))
1545212568.107 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ c0 (/ h d)) (/ w d)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212568.107 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212568.107 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212568.110 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212568.118 * * [misc]simplify:  iters left: 4 (133 enodes)
1545212568.167 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D))
1545212568.168 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D)))))
1545212568.168 * * * * [misc]progress:  [ 479 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212568.168 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212568.168 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212568.174 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212568.193 * * [misc]simplify:  iters left: 4 (323 enodes)
1545212568.362 * [exit]simplify:  Simplified to (+ (* (* (/ d D) (/ c0 (/ h d))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))))
1545212568.362 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ d D) (/ c0 (/ h d))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212568.362 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212568.362 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212568.368 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212568.377 * * [misc]simplify:  iters left: 4 (138 enodes)
1545212568.425 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))
1545212568.425 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))))
1545212568.425 * * * * [misc]progress:  [ 480 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212568.425 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212568.426 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212568.432 * * [misc]simplify:  iters left: 5 (81 enodes)
1545212568.451 * * [misc]simplify:  iters left: 4 (309 enodes)
1545212568.632 * [exit]simplify:  Simplified to (+ (* (* (/ (/ c0 w) h) (/ d (/ D d))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)))
1545212568.632 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (/ c0 w) h) (/ d (/ D d))) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212568.632 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212568.633 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212568.635 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212568.643 * * [misc]simplify:  iters left: 4 (128 enodes)
1545212568.692 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D)
1545212568.692 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D))))
1545212568.692 * * * * [misc]progress:  [ 481 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212568.693 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212568.693 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212568.699 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212568.719 * * [misc]simplify:  iters left: 4 (323 enodes)
1545212568.889 * [exit]simplify:  Simplified to (+ (/ (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ D (/ (* d c0) (/ h d)))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w))))
1545212568.889 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ D (/ (* d c0) (/ h d)))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212568.889 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212568.889 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212568.892 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212568.900 * * [misc]simplify:  iters left: 4 (138 enodes)
1545212568.951 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))
1545212568.951 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))))
1545212568.951 * * * * [misc]progress:  [ 482 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212568.951 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212568.951 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212568.957 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212568.976 * * [misc]simplify:  iters left: 4 (310 enodes)
1545212569.152 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ d (/ D d)) (/ c0 (* w h)))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D)))
1545212569.152 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (/ d (/ D d)) (/ c0 (* w h)))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212569.152 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212569.152 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212569.155 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212569.163 * * [misc]simplify:  iters left: 4 (128 enodes)
1545212569.211 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D)
1545212569.211 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D))))
1545212569.211 * * * * [misc]progress:  [ 483 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212569.211 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212569.212 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212569.218 * * [misc]simplify:  iters left: 5 (83 enodes)
1545212569.236 * * [misc]simplify:  iters left: 4 (317 enodes)
1545212569.411 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212569.411 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ c0 h) (* (/ d D) (/ d D)))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212569.411 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212569.411 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212569.414 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212569.424 * * [misc]simplify:  iters left: 4 (128 enodes)
1545212569.471 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212569.471 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212569.471 * * * * [misc]progress:  [ 484 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212569.472 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212569.472 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212569.479 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212569.501 * * [misc]simplify:  iters left: 4 (336 enodes)
1545212569.655 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (/ (* d c0) (/ h d))))
1545212569.655 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (/ (* d c0) (/ h d)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212569.656 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212569.656 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212569.660 * * [misc]simplify:  iters left: 5 (52 enodes)
1545212569.671 * * [misc]simplify:  iters left: 4 (174 enodes)
1545212569.740 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* w (* D D)))
1545212569.741 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* w (* D D))))))
1545212569.741 * * * * [misc]progress:  [ 485 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212569.741 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212569.741 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212569.747 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212569.767 * * [misc]simplify:  iters left: 4 (320 enodes)
1545212569.918 * [exit]simplify:  Simplified to (+ (* (/ (* (/ c0 h) (* d d)) w) (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D D))))
1545212569.918 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ c0 h) (* d d)) w) (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212569.919 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212569.919 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212569.922 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212569.932 * * [misc]simplify:  iters left: 4 (158 enodes)
1545212569.996 * [exit]simplify:  Simplified to (* (* D D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212569.997 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* D D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212569.997 * * * * [misc]progress:  [ 486 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212569.997 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212569.997 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212570.004 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212570.023 * * [misc]simplify:  iters left: 4 (331 enodes)
1545212570.182 * [exit]simplify:  Simplified to (+ (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212570.182 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D w)) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212570.182 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212570.183 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212570.186 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212570.196 * * [misc]simplify:  iters left: 4 (163 enodes)
1545212570.261 * [exit]simplify:  Simplified to (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))
1545212570.261 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))))
1545212570.261 * * * * [misc]progress:  [ 487 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212570.262 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212570.262 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212570.268 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212570.287 * * [misc]simplify:  iters left: 4 (318 enodes)
1545212570.445 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (* (/ c0 w) (/ d h)) (/ d D))))
1545212570.445 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (* (/ c0 w) (/ d h)) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212570.445 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212570.445 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212570.449 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212570.460 * * [misc]simplify:  iters left: 4 (153 enodes)
1545212570.525 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212570.525 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212570.525 * * * * [misc]progress:  [ 488 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212570.525 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212570.526 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212570.532 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212570.552 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212570.710 * [exit]simplify:  Simplified to (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w))))
1545212570.710 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212570.711 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212570.711 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212570.714 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212570.724 * * [misc]simplify:  iters left: 4 (163 enodes)
1545212570.790 * [exit]simplify:  Simplified to (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))
1545212570.790 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))))
1545212570.790 * * * * [misc]progress:  [ 489 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212570.791 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212570.791 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212570.799 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212570.818 * * [misc]simplify:  iters left: 4 (322 enodes)
1545212570.977 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (* d d) D) (/ (/ c0 w) h))))
1545212570.977 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (* d d) D) (/ (/ c0 w) h)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212570.977 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212570.978 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212570.981 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212570.990 * * [misc]simplify:  iters left: 4 (153 enodes)
1545212571.056 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212571.056 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212571.056 * * * * [misc]progress:  [ 490 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212571.056 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212571.056 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212571.063 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212571.084 * * [misc]simplify:  iters left: 4 (329 enodes)
1545212571.241 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (/ (/ c0 h) (* (/ D d) (/ D d)))))
1545212571.241 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (/ (/ c0 h) (* (/ D d) (/ D d))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212571.241 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212571.241 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212571.244 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212571.254 * * [misc]simplify:  iters left: 4 (153 enodes)
1545212571.319 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212571.319 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))) w) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212571.319 * * * * [misc]progress:  [ 491 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)))))>
1545212571.319 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d)))
1545212571.320 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212571.325 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212571.340 * * [misc]simplify:  iters left: 4 (245 enodes)
1545212571.443 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* d d))))
1545212571.443 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* d d)))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)))))
1545212571.443 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D))
1545212571.443 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212571.446 * * [misc]simplify:  iters left: 5 (36 enodes)
1545212571.452 * * [misc]simplify:  iters left: 4 (88 enodes)
1545212571.469 * * [misc]simplify:  iters left: 3 (217 enodes)
1545212571.528 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ M (/ (/ (/ d D) (/ h c0)) (/ w (/ d D)))))) (* (* D D) w))
1545212571.528 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ M (/ (/ (/ d D) (/ h c0)) (/ w (/ d D)))))) (* (* D D) w)))))
1545212571.529 * * * * [misc]progress:  [ 492 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))>
1545212571.529 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d)))
1545212571.529 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212571.534 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212571.548 * * [misc]simplify:  iters left: 4 (227 enodes)
1545212571.646 * [exit]simplify:  Simplified to (+ (* (/ (* (* d d) (/ c0 h)) w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))))))
1545212571.646 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (* d d) (/ c0 h)) w) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))
1545212571.646 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D))
1545212571.646 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212571.649 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212571.654 * * [misc]simplify:  iters left: 4 (72 enodes)
1545212571.669 * * [misc]simplify:  iters left: 3 (190 enodes)
1545212571.723 * [exit]simplify:  Simplified to (* (* D D) (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))))
1545212571.724 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* D D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w))))))))))
1545212571.724 * * * * [misc]progress:  [ 493 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212571.724 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d)))
1545212571.724 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212571.730 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212571.744 * * [misc]simplify:  iters left: 4 (242 enodes)
1545212571.850 * [exit]simplify:  Simplified to (+ (* (/ (* (/ d D) (* d c0)) h) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)))))))
1545212571.850 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ d D) (* d c0)) h) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M))))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212571.850 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212571.850 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212571.853 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212571.858 * * [misc]simplify:  iters left: 4 (77 enodes)
1545212571.873 * * [misc]simplify:  iters left: 3 (196 enodes)
1545212571.929 * [exit]simplify:  Simplified to (* (* w D) (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))
1545212571.929 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))))))
1545212571.930 * * * * [misc]progress:  [ 494 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212571.930 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212571.930 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212571.935 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212571.949 * * [misc]simplify:  iters left: 4 (226 enodes)
1545212572.054 * [exit]simplify:  Simplified to (+ (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D)))
1545212572.054 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ d D) (* d c0)) (* w h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212572.054 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212572.054 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212572.056 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212572.061 * * [misc]simplify:  iters left: 4 (67 enodes)
1545212572.075 * * [misc]simplify:  iters left: 3 (186 enodes)
1545212572.130 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))) D)
1545212572.130 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))) D))))
1545212572.130 * * * * [misc]progress:  [ 495 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212572.130 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D))))
1545212572.130 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212572.136 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212572.150 * * [misc]simplify:  iters left: 4 (242 enodes)
1545212572.253 * [exit]simplify:  Simplified to (+ (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M)))))))
1545212572.253 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* d d) D) (/ c0 h)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M))))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212572.253 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212572.253 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212572.256 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212572.261 * * [misc]simplify:  iters left: 4 (77 enodes)
1545212572.276 * * [misc]simplify:  iters left: 3 (196 enodes)
1545212572.332 * [exit]simplify:  Simplified to (* (* w D) (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))
1545212572.332 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D)))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))))))
1545212572.332 * * * * [misc]progress:  [ 496 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212572.332 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212572.332 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212572.337 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212572.351 * * [misc]simplify:  iters left: 4 (231 enodes)
1545212572.456 * [exit]simplify:  Simplified to (+ (* (/ (* (/ d w) (/ c0 h)) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))) D) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))))
1545212572.456 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ d w) (/ c0 h)) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))) D) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212572.456 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212572.456 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212572.458 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212572.463 * * [misc]simplify:  iters left: 4 (67 enodes)
1545212572.477 * * [misc]simplify:  iters left: 3 (186 enodes)
1545212572.531 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))) D)
1545212572.531 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))) D))))
1545212572.531 * * * * [misc]progress:  [ 497 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))>
1545212572.531 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212572.531 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212572.537 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212572.551 * * [misc]simplify:  iters left: 4 (238 enodes)
1545212572.653 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))) (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)))) (* w (sqrt (sqrt (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (* M M)))))))
1545212572.653 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))))) (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)))) (* w (sqrt (sqrt (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (* M M))))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))
1545212572.653 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w)
1545212572.653 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212572.655 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212572.660 * * [misc]simplify:  iters left: 4 (67 enodes)
1545212572.674 * * [misc]simplify:  iters left: 3 (186 enodes)
1545212572.728 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))))
1545212572.728 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))) w) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))))))))
1545212572.728 * * * * [misc]progress:  [ 498 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* w D) D)))))>
1545212572.728 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) d)))
1545212572.728 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212572.735 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212572.756 * * [misc]simplify:  iters left: 4 (349 enodes)
1545212572.931 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ c0 h) (* d d))))
1545212572.931 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ c0 h) (* d d)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* w D) D)))))
1545212572.931 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* w D) D))
1545212572.931 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212572.935 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212572.946 * * [misc]simplify:  iters left: 4 (198 enodes)
1545212573.034 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* (* D w) D))
1545212573.034 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* (* D w) D)))))
1545212573.034 * * * * [misc]progress:  [ 499 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* D D)))))>
1545212573.035 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212573.035 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212573.041 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212573.063 * * [misc]simplify:  iters left: 4 (335 enodes)
1545212573.230 * [exit]simplify:  Simplified to (+ (* (* (/ c0 w) (/ (* d d) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))))
1545212573.230 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 w) (/ (* d d) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* D D)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* D D)))))
1545212573.231 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* D D))
1545212573.231 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212573.234 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212573.245 * * [misc]simplify:  iters left: 4 (182 enodes)
1545212573.328 * [exit]simplify:  Simplified to (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212573.328 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212573.328 * * * * [misc]progress:  [ 500 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D)))))>
1545212573.329 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212573.329 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212573.335 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212573.358 * * [misc]simplify:  iters left: 4 (350 enodes)
1545212573.534 * [exit]simplify:  Simplified to (+ (* (/ (* d c0) (* (/ h d) D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w))))
1545212573.534 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* d c0) (* (/ h d) D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D)))))
1545212573.534 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D))
1545212573.535 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212573.538 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212573.552 * * [misc]simplify:  iters left: 4 (187 enodes)
1545212573.636 * [exit]simplify:  Simplified to (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212573.637 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212573.637 * * * * [misc]progress:  [ 501 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D))))>
1545212573.637 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212573.637 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212573.643 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212573.663 * * [misc]simplify:  iters left: 4 (333 enodes)
1545212573.845 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)))) D) (sqrt (sqrt (* (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M) (+ (pow M 3) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)))))) (* (sqrt (sqrt (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (/ (/ c0 h) (/ w d)) (/ d D))))
1545212573.845 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M)))) D) (sqrt (sqrt (* (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M) (+ (pow M 3) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)))))) (* (sqrt (sqrt (- (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (/ (/ c0 h) (/ w d)) (/ d D)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D))))
1545212573.846 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D)
1545212573.846 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212573.849 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212573.859 * * [misc]simplify:  iters left: 4 (175 enodes)
1545212573.944 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212573.945 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))))
1545212573.945 * * * * [misc]progress:  [ 502 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D)))))>
1545212573.945 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) (/ d D))))
1545212573.945 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212573.952 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212573.974 * * [misc]simplify:  iters left: 4 (352 enodes)
1545212574.153 * [exit]simplify:  Simplified to (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))))
1545212574.153 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* D w)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3))))))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D)))))
1545212574.153 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D))
1545212574.154 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212574.157 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212574.171 * * [misc]simplify:  iters left: 4 (187 enodes)
1545212574.256 * [exit]simplify:  Simplified to (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212574.256 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212574.256 * * * * [misc]progress:  [ 503 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D))))>
1545212574.256 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212574.256 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212574.263 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212574.283 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212574.458 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (* d d) D) (/ (/ c0 w) h))))
1545212574.458 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (* d d) D) (/ (/ c0 w) h)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D))))
1545212574.458 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D)
1545212574.459 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212574.462 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212574.472 * * [misc]simplify:  iters left: 4 (175 enodes)
1545212574.557 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212574.557 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))))
1545212574.557 * * * * [misc]progress:  [ 504 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) w))))>
1545212574.558 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212574.558 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212574.564 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212574.586 * * [misc]simplify:  iters left: 4 (344 enodes)
1545212574.760 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212574.760 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow M 3) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) w))))
1545212574.761 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) w)
1545212574.762 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212574.765 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212574.775 * * [misc]simplify:  iters left: 4 (175 enodes)
1545212574.863 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212574.863 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))))
1545212574.863 * * * * [misc]progress:  [ 505 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* w D) D)))))>
1545212574.863 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) d)))
1545212574.863 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212574.869 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212574.885 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212575.003 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D w) D))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* d d))))
1545212575.003 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (* D w) D))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (/ c0 h) (* d d)))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* w D) D)))))
1545212575.003 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* w D) D))
1545212575.003 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212575.006 * * [misc]simplify:  iters left: 5 (37 enodes)
1545212575.012 * * [misc]simplify:  iters left: 4 (102 enodes)
1545212575.034 * * [misc]simplify:  iters left: 3 (290 enodes)
1545212575.129 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D w) D))
1545212575.129 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D w) D)))))
1545212575.129 * * * * [misc]progress:  [ 506 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D)))))>
1545212575.129 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212575.129 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212575.135 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212575.150 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212575.264 * [exit]simplify:  Simplified to (+ (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212575.264 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ c0 h) (/ w (* d d))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D)))))
1545212575.264 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D))
1545212575.264 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212575.267 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212575.272 * * [misc]simplify:  iters left: 4 (88 enodes)
1545212575.291 * * [misc]simplify:  iters left: 3 (271 enodes)
1545212575.383 * [exit]simplify:  Simplified to (* (* D D) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))))
1545212575.384 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w))))))))))
1545212575.384 * * * * [misc]progress:  [ 507 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))))>
1545212575.384 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212575.384 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212575.390 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212575.407 * * [misc]simplify:  iters left: 4 (271 enodes)
1545212575.526 * [exit]simplify:  Simplified to (+ (* (/ (/ (* d c0) h) (/ D d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))))
1545212575.526 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ (* d c0) h) (/ D d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))))
1545212575.526 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D))
1545212575.526 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212575.529 * * [misc]simplify:  iters left: 5 (33 enodes)
1545212575.538 * * [misc]simplify:  iters left: 4 (93 enodes)
1545212575.557 * * [misc]simplify:  iters left: 3 (275 enodes)
1545212575.651 * [exit]simplify:  Simplified to (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212575.651 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212575.651 * * * * [misc]progress:  [ 508 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D))))>
1545212575.651 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212575.651 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212575.657 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212575.919 * * [misc]simplify:  iters left: 4 (253 enodes)
1545212576.038 * [exit]simplify:  Simplified to (+ (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)))
1545212576.038 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D))))
1545212576.038 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D)
1545212576.038 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212576.040 * * [misc]simplify:  iters left: 5 (29 enodes)
1545212576.045 * * [misc]simplify:  iters left: 4 (83 enodes)
1545212576.066 * * [misc]simplify:  iters left: 3 (265 enodes)
1545212576.155 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212576.155 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212576.156 * * * * [misc]progress:  [ 509 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))))>
1545212576.156 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) (/ d D))))
1545212576.156 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212576.161 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212576.177 * * [misc]simplify:  iters left: 4 (269 enodes)
1545212576.296 * [exit]simplify:  Simplified to (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212576.296 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))))
1545212576.296 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D))
1545212576.296 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212576.299 * * [misc]simplify:  iters left: 5 (33 enodes)
1545212576.305 * * [misc]simplify:  iters left: 4 (93 enodes)
1545212576.327 * * [misc]simplify:  iters left: 3 (275 enodes)
1545212576.420 * [exit]simplify:  Simplified to (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212576.420 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212576.420 * * * * [misc]progress:  [ 510 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D))))>
1545212576.420 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212576.421 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212576.426 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212576.441 * * [misc]simplify:  iters left: 4 (258 enodes)
1545212576.561 * [exit]simplify:  Simplified to (+ (* (/ (* (/ d D) (/ c0 h)) (/ w d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)))
1545212576.561 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ d D) (/ c0 h)) (/ w d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D))))
1545212576.561 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D)
1545212576.561 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212576.564 * * [misc]simplify:  iters left: 5 (29 enodes)
1545212576.569 * * [misc]simplify:  iters left: 4 (83 enodes)
1545212576.587 * * [misc]simplify:  iters left: 3 (265 enodes)
1545212576.679 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212576.679 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212576.679 * * * * [misc]progress:  [ 511 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w))))>
1545212576.679 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212576.679 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212576.685 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212576.700 * * [misc]simplify:  iters left: 4 (265 enodes)
1545212576.817 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212576.818 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* w (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w))))
1545212576.818 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w)
1545212576.818 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212576.820 * * [misc]simplify:  iters left: 5 (29 enodes)
1545212576.825 * * [misc]simplify:  iters left: 4 (83 enodes)
1545212576.843 * * [misc]simplify:  iters left: 3 (265 enodes)
1545212576.934 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212576.934 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212576.934 * * * * [misc]progress:  [ 512 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212576.934 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212576.936 * * [misc]simplify:  iters left: 6 (43 enodes)
1545212576.944 * * [misc]simplify:  iters left: 5 (115 enodes)
1545212576.970 * * [misc]simplify:  iters left: 4 (448 enodes)
1545212577.248 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (* (/ c0 h) (* d d))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))
1545212577.248 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)))))) (* (/ c0 h) (* d d))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D)) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212577.248 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212577.248 * * [misc]simplify:  iters left: 6 (25 enodes)
1545212577.253 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212577.270 * * [misc]simplify:  iters left: 4 (293 enodes)
1545212577.447 * [exit]simplify:  Simplified to (* (* D (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))))
1545212577.447 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* D (* D w)) (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))))))))))
1545212577.447 * * * * [misc]progress:  [ 513 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212577.448 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212577.448 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212577.456 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212577.480 * * [misc]simplify:  iters left: 4 (423 enodes)
1545212577.727 * [exit]simplify:  Simplified to (+ (* (* (* D D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (/ c0 (/ (* w h) (* d d)))))
1545212577.727 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (/ c0 (/ (* w h) (* d d))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212577.727 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212577.728 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212577.732 * * [misc]simplify:  iters left: 5 (66 enodes)
1545212577.748 * * [misc]simplify:  iters left: 4 (279 enodes)
1545212577.924 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* D D))
1545212577.925 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* D D)))))
1545212577.925 * * * * [misc]progress:  [ 514 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212577.925 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212577.925 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212577.933 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212577.958 * * [misc]simplify:  iters left: 4 (440 enodes)
1545212578.216 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (* (/ c0 h) (* d (/ d D)))))
1545212578.216 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D)))))))) (* (/ c0 h) (* d (/ d D))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212578.216 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212578.217 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212578.221 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212578.237 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212578.415 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* D w))
1545212578.415 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* D w)))))
1545212578.415 * * * * [misc]progress:  [ 515 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212578.415 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212578.416 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212578.423 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212578.448 * * [misc]simplify:  iters left: 4 (433 enodes)
1545212578.724 * [exit]simplify:  Simplified to (+ (* (* (/ c0 (* w h)) (/ (* d d) D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D)))
1545212578.724 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ (* d d) D)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))))))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212578.724 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212578.724 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212578.729 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212578.744 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212578.915 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) D)
1545212578.915 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) D))))
1545212578.915 * * * * [misc]progress:  [ 516 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212578.916 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212578.916 * * [misc]simplify:  iters left: 6 (42 enodes)
1545212578.924 * * [misc]simplify:  iters left: 5 (112 enodes)
1545212578.949 * * [misc]simplify:  iters left: 4 (440 enodes)
1545212579.199 * [exit]simplify:  Simplified to (+ (* (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212579.199 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212579.200 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212579.200 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212579.204 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212579.220 * * [misc]simplify:  iters left: 4 (284 enodes)
1545212579.399 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* D w))
1545212579.399 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))))) (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M)))))) (* D w)))))
1545212579.399 * * * * [misc]progress:  [ 517 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212579.399 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212579.399 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212579.407 * * [misc]simplify:  iters left: 5 (108 enodes)
1545212579.432 * * [misc]simplify:  iters left: 4 (438 enodes)
1545212579.703 * [exit]simplify:  Simplified to (+ (* (/ (* d (/ c0 h)) (/ w (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))
1545212579.704 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* d (/ c0 h)) (/ w (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (* M M) (- M))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212579.704 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212579.704 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212579.708 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212579.723 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212579.895 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) D)
1545212579.895 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) D))))
1545212579.895 * * * * [misc]progress:  [ 518 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212579.896 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212579.896 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212579.903 * * [misc]simplify:  iters left: 5 (109 enodes)
1545212579.929 * * [misc]simplify:  iters left: 4 (445 enodes)
1545212580.195 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) w)))
1545212580.195 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))) (* (sqrt (sqrt (* (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) w))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212580.195 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212580.195 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212580.200 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212580.215 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212580.387 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))
1545212580.387 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (* M M) (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))))) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))))))
1545212580.387 * * * * [misc]progress:  [ 519 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212580.387 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212580.388 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212580.395 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212580.419 * * [misc]simplify:  iters left: 4 (412 enodes)
1545212580.661 * [exit]simplify:  Simplified to (+ (* (* (* (* D D) w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212580.661 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* D D) w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (* (/ c0 h) (* d d)) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212580.661 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212580.661 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212580.665 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212580.679 * * [misc]simplify:  iters left: 4 (250 enodes)
1545212580.813 * [exit]simplify:  Simplified to (* (* (* D w) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212580.813 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (* (* D w) D) (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))))
1545212580.813 * * * * [misc]progress:  [ 520 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212580.813 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212580.813 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212580.821 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212580.846 * * [misc]simplify:  iters left: 4 (396 enodes)
1545212581.071 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (/ (/ c0 h) (/ w (* d d)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212581.071 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (/ (/ c0 h) (/ w (* d d)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D D) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212581.071 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212581.071 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212581.075 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212581.088 * * [misc]simplify:  iters left: 4 (236 enodes)
1545212581.217 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D D))
1545212581.217 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* D D)))))
1545212581.217 * * * * [misc]progress:  [ 521 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212581.217 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212581.217 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212581.225 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212581.248 * * [misc]simplify:  iters left: 4 (413 enodes)
1545212581.484 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (* d (/ d D)) (/ c0 h))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212581.484 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (* (* d (/ d D)) (/ c0 h))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212581.485 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212581.485 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212581.489 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212581.502 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212581.631 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))
1545212581.631 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))))
1545212581.632 * * * * [misc]progress:  [ 522 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212581.632 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212581.632 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212581.639 * * [misc]simplify:  iters left: 5 (99 enodes)
1545212581.662 * * [misc]simplify:  iters left: 4 (395 enodes)
1545212581.903 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* d (/ d D)) (/ (/ c0 w) h))))
1545212581.903 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D)) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* d (/ d D)) (/ (/ c0 w) h)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212581.904 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212581.904 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212581.908 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212581.920 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212582.051 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212582.051 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212582.051 * * * * [misc]progress:  [ 523 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212582.052 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212582.052 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212582.059 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212582.083 * * [misc]simplify:  iters left: 4 (413 enodes)
1545212582.323 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (/ (* (/ d D) c0) (/ h d))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212582.323 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))) (/ (* (/ d D) c0) (/ h d))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212582.323 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212582.324 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212582.327 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212582.341 * * [misc]simplify:  iters left: 4 (241 enodes)
1545212582.470 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))
1545212582.470 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))))
1545212582.470 * * * * [misc]progress:  [ 524 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212582.471 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212582.471 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212582.478 * * [misc]simplify:  iters left: 5 (100 enodes)
1545212582.501 * * [misc]simplify:  iters left: 4 (396 enodes)
1545212582.734 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (/ (/ c0 h) (/ w d)) (/ d D))))
1545212582.734 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) (* (/ (/ c0 h) (/ w d)) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212582.734 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212582.734 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212582.738 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212582.751 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212582.882 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212582.882 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212582.882 * * * * [misc]progress:  [ 525 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212582.882 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212582.882 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212582.889 * * [misc]simplify:  iters left: 5 (101 enodes)
1545212582.912 * * [misc]simplify:  iters left: 4 (405 enodes)
1545212583.142 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212583.142 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)) (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* w (sqrt (sqrt (* (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212583.142 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212583.142 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212583.146 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212583.159 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212583.290 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212583.290 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D))) (* M M))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212583.290 * * * * [misc]progress:  [ 526 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))>
1545212583.290 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d)))
1545212583.291 * * [misc]simplify:  iters left: 6 (41 enodes)
1545212583.298 * * [misc]simplify:  iters left: 5 (110 enodes)
1545212583.323 * * [misc]simplify:  iters left: 4 (427 enodes)
1545212583.560 * [exit]simplify:  Simplified to (+ (* (* (* D (* D w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))))
1545212583.560 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* D (* D w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (* (* d d) (/ c0 h)) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (+ (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))) (* M M)) (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D)))))
1545212583.560 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* w D) D))
1545212583.560 * * [misc]simplify:  iters left: 6 (23 enodes)
1545212583.565 * * [misc]simplify:  iters left: 5 (63 enodes)
1545212583.579 * * [misc]simplify:  iters left: 4 (248 enodes)
1545212583.709 * [exit]simplify:  Simplified to (* (* (* D w) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212583.709 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) d))) (* (* (* D w) D) (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212583.709 * * * * [misc]progress:  [ 527 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))>
1545212583.709 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212583.709 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212583.717 * * [misc]simplify:  iters left: 5 (105 enodes)
1545212583.740 * * [misc]simplify:  iters left: 4 (409 enodes)
1545212583.975 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (* c0 (* d d)) (* h w))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212583.975 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* c0 M) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (/ (* c0 (* d d)) (* h w))) (* (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D)))))
1545212583.975 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* D D))
1545212583.976 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212583.980 * * [misc]simplify:  iters left: 5 (58 enodes)
1545212583.993 * * [misc]simplify:  iters left: 4 (234 enodes)
1545212584.113 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D D))
1545212584.113 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D D)))))
1545212584.113 * * * * [misc]progress:  [ 528 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212584.113 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212584.114 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212584.121 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212584.145 * * [misc]simplify:  iters left: 4 (426 enodes)
1545212584.390 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (/ c0 h) (/ d D)) d)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))))
1545212584.390 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* (/ c0 h) (/ d D)) d)) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212584.390 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212584.390 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212584.394 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212584.408 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212584.529 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D w))
1545212584.529 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D w)))))
1545212584.529 * * * * [misc]progress:  [ 529 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212584.529 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212584.529 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212584.536 * * [misc]simplify:  iters left: 5 (102 enodes)
1545212584.559 * * [misc]simplify:  iters left: 4 (408 enodes)
1545212584.805 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M))))) (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (* M M) (- M))) (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))))) (* (sqrt (sqrt (* (+ (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))) (* (/ (* d d) D) (/ (/ c0 h) w))))
1545212584.805 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (- (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) M))))) (sqrt (sqrt (* (+ (pow (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) 3) (* (* M M) (- M))) (* (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))))) (* (sqrt (sqrt (* (+ (* (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))) (/ (* (/ c0 h) (/ d D)) (/ w (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))))) (- M (/ (* (/ c0 h) (/ d D)) (/ w (/ d D))))))) (* (/ (* d d) D) (/ (/ c0 h) w)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212584.806 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212584.806 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212584.809 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212584.822 * * [misc]simplify:  iters left: 4 (225 enodes)
1545212584.938 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)
1545212584.938 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))))
1545212584.939 * * * * [misc]progress:  [ 530 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))>
1545212584.939 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D))))
1545212584.940 * * [misc]simplify:  iters left: 6 (40 enodes)
1545212584.949 * * [misc]simplify:  iters left: 5 (107 enodes)
1545212584.973 * * [misc]simplify:  iters left: 4 (426 enodes)
1545212585.215 * [exit]simplify:  Simplified to (+ (/ (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (/ D (* (/ c0 h) (* d d)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))))
1545212585.215 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (/ (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ (+ (* M M) (* (/ (* M c0) (* h w)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (/ D (* (/ c0 h) (* d d)))) (* (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) 3) (* (* M M) (- M))) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D)))))
1545212585.215 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* w D))
1545212585.216 * * [misc]simplify:  iters left: 6 (22 enodes)
1545212585.219 * * [misc]simplify:  iters left: 5 (59 enodes)
1545212585.236 * * [misc]simplify:  iters left: 4 (239 enodes)
1545212585.355 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D w))
1545212585.355 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* D w)))))
1545212585.356 * * * * [misc]progress:  [ 531 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))>
1545212585.356 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212585.356 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212585.366 * * [misc]simplify:  iters left: 5 (103 enodes)
1545212585.389 * * [misc]simplify:  iters left: 4 (411 enodes)
1545212585.629 * [exit]simplify:  Simplified to (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* d (/ c0 h)) (/ w (/ d D)))))
1545212585.629 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (* (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* M M) (* (/ (* c0 M) (* h w)) (* (/ d D) (/ d D))))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (* d (/ c0 h)) (/ w (/ d D))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D))))
1545212585.629 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) D)
1545212585.630 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212585.633 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212585.649 * * [misc]simplify:  iters left: 4 (225 enodes)
1545212585.764 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D)
1545212585.765 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) D))))
1545212585.765 * * * * [misc]progress:  [ 532 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))>
1545212585.765 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212585.765 * * [misc]simplify:  iters left: 6 (39 enodes)
1545212585.772 * * [misc]simplify:  iters left: 5 (104 enodes)
1545212585.798 * * [misc]simplify:  iters left: 4 (418 enodes)
1545212586.035 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M))))) (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (* M M) (- M))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (sqrt (sqrt (* (+ (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212586.035 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M))))) (sqrt (sqrt (* (+ (pow (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) 3) (* (* M M) (- M))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))))) (* (sqrt (sqrt (* (+ (* (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))) (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w))))
1545212586.035 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) w)
1545212586.035 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212586.039 * * [misc]simplify:  iters left: 5 (55 enodes)
1545212586.051 * * [misc]simplify:  iters left: 4 (225 enodes)
1545212586.170 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212586.170 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))))
1545212586.170 * * * * [misc]progress:  [ 533 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))>
1545212586.170 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d)))
1545212586.170 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212586.177 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212586.195 * * [misc]simplify:  iters left: 4 (317 enodes)
1545212586.364 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ c0 h) (* d d))) (* (* (* w (* D D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212586.364 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (/ c0 h) (* d d))) (* (* (* w (* D D)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D)))))
1545212586.364 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* w D) D))
1545212586.364 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212586.368 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212586.377 * * [misc]simplify:  iters left: 4 (149 enodes)
1545212586.428 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D (* D w)))
1545212586.428 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D (* D w))))))
1545212586.428 * * * * [misc]progress:  [ 534 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))>
1545212586.429 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d)))
1545212586.429 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212586.435 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212586.453 * * [misc]simplify:  iters left: 4 (306 enodes)
1545212586.621 * [exit]simplify:  Simplified to (+ (* (/ (* d (* d c0)) (* h w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212586.621 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* d (* d c0)) (* h w)) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D)))))
1545212586.621 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* D D))
1545212586.622 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212586.624 * * [misc]simplify:  iters left: 5 (42 enodes)
1545212586.633 * * [misc]simplify:  iters left: 4 (133 enodes)
1545212586.680 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D))
1545212586.680 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* D D)))))
1545212586.680 * * * * [misc]progress:  [ 535 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212586.681 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d)))
1545212586.681 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212586.687 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212586.706 * * [misc]simplify:  iters left: 4 (323 enodes)
1545212586.878 * [exit]simplify:  Simplified to (+ (* (/ (* (/ d D) (* d c0)) h) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212586.878 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ d D) (* d c0)) h) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212586.878 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212586.878 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212586.881 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212586.889 * * [misc]simplify:  iters left: 4 (138 enodes)
1545212586.940 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))
1545212586.940 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))))
1545212586.940 * * * * [misc]progress:  [ 536 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212586.941 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212586.941 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212586.947 * * [misc]simplify:  iters left: 5 (82 enodes)
1545212586.965 * * [misc]simplify:  iters left: 4 (304 enodes)
1545212587.385 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ d D) d) (/ (/ c0 w) h))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212587.385 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (/ d D) d) (/ (/ c0 w) h))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212587.385 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212587.385 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212587.388 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212587.395 * * [misc]simplify:  iters left: 4 (128 enodes)
1545212587.443 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D)
1545212587.443 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D))))
1545212587.443 * * * * [misc]progress:  [ 537 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))>
1545212587.444 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D))))
1545212587.444 * * [misc]simplify:  iters left: 6 (35 enodes)
1545212587.450 * * [misc]simplify:  iters left: 5 (86 enodes)
1545212587.468 * * [misc]simplify:  iters left: 4 (323 enodes)
1545212587.645 * [exit]simplify:  Simplified to (+ (* (/ (* (* d c0) (/ d D)) h) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212587.645 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (* d c0) (/ d D)) h) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (* D w) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D)))))
1545212587.645 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* w D))
1545212587.645 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212587.648 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212587.657 * * [misc]simplify:  iters left: 4 (138 enodes)
1545212587.705 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w))
1545212587.705 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* D w)))))
1545212587.705 * * * * [misc]progress:  [ 538 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))>
1545212587.706 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212587.706 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212587.712 * * [misc]simplify:  iters left: 5 (83 enodes)
1545212587.730 * * [misc]simplify:  iters left: 4 (305 enodes)
1545212587.899 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (/ c0 h) (* (/ D d) (/ w d)))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))))
1545212587.899 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (/ (/ c0 h) (* (/ D d) (/ w d)))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* D (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D))))
1545212587.899 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) D)
1545212587.899 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212587.902 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212587.910 * * [misc]simplify:  iters left: 4 (128 enodes)
1545212587.959 * [exit]simplify:  Simplified to (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D)
1545212587.959 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D))))
1545212587.959 * * * * [misc]progress:  [ 539 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))>
1545212587.960 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212587.960 * * [misc]simplify:  iters left: 6 (34 enodes)
1545212587.966 * * [misc]simplify:  iters left: 5 (84 enodes)
1545212587.984 * * [misc]simplify:  iters left: 4 (314 enodes)
1545212588.153 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (/ (/ c0 h) (* (/ D d) (/ D d)))) (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)))) w)))
1545212588.153 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (/ (/ c0 h) (* (/ D d) (/ D d)))) (* (sqrt (sqrt (* (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)) (* (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M)))) w))) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w))))
1545212588.153 * [enter]simplify:  Simplifying (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) w)
1545212588.153 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212588.156 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212588.164 * * [misc]simplify:  iters left: 4 (128 enodes)
1545212588.212 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))
1545212588.212 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))))
1545212588.212 * * * * [misc]progress:  [ 540 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))>
1545212588.212 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d)))
1545212588.213 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212588.219 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212588.239 * * [misc]simplify:  iters left: 4 (336 enodes)
1545212588.392 * [exit]simplify:  Simplified to (+ (* (* (* (* D w) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (/ (* d c0) (/ h d))))
1545212588.393 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* (* D w) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (* M M) (- M)) (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3)))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (/ (* d c0) (/ h d)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)))))
1545212588.393 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D))
1545212588.393 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212588.397 * * [misc]simplify:  iters left: 5 (52 enodes)
1545212588.410 * * [misc]simplify:  iters left: 4 (174 enodes)
1545212588.479 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* w (* D D)))
1545212588.479 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))) (* w (* D D))))))
1545212588.479 * * * * [misc]progress:  [ 541 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))>
1545212588.479 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d)))
1545212588.479 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212588.486 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212588.505 * * [misc]simplify:  iters left: 4 (320 enodes)
1545212588.653 * [exit]simplify:  Simplified to (+ (* (/ (* (/ c0 h) (* d d)) w) (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M))))))))
1545212588.653 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ c0 h) (* d d)) w) (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (* M M) (- M)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)))))
1545212588.653 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D))
1545212588.653 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212588.657 * * [misc]simplify:  iters left: 5 (47 enodes)
1545212588.666 * * [misc]simplify:  iters left: 4 (158 enodes)
1545212588.732 * [exit]simplify:  Simplified to (* (* D D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212588.732 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212588.732 * * * * [misc]progress:  [ 542 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212588.732 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d)))
1545212588.732 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212588.739 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212588.760 * * [misc]simplify:  iters left: 4 (331 enodes)
1545212588.917 * [exit]simplify:  Simplified to (+ (* (/ (* (/ d D) c0) (/ h d)) (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))))
1545212588.917 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ d D) c0) (/ h d)) (sqrt (sqrt (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212588.917 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212588.917 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212588.921 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212588.931 * * [misc]simplify:  iters left: 4 (163 enodes)
1545212588.997 * [exit]simplify:  Simplified to (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))
1545212588.997 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) d))) (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))))
1545212588.997 * * * * [misc]progress:  [ 543 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212588.998 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212588.998 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212589.004 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212589.023 * * [misc]simplify:  iters left: 4 (318 enodes)
1545212589.184 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ (/ c0 h) (/ w d)) (/ d D))))
1545212589.184 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3)))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ (/ c0 h) (/ w d)) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212589.184 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212589.184 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212589.187 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212589.197 * * [misc]simplify:  iters left: 4 (153 enodes)
1545212589.261 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212589.261 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212589.262 * * * * [misc]progress:  [ 544 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))>
1545212589.262 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D))))
1545212589.262 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212589.268 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212589.288 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212589.449 * [exit]simplify:  Simplified to (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))))))))
1545212589.449 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (+ (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M)))))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)))))
1545212589.449 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D))
1545212589.449 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212589.453 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212589.463 * * [misc]simplify:  iters left: 4 (163 enodes)
1545212589.528 * [exit]simplify:  Simplified to (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h))))))))
1545212589.528 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) d) (/ d D)))) (* (* w D) (sqrt (sqrt (+ (* (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* w h)))))))))))
1545212589.528 * * * * [misc]progress:  [ 545 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))>
1545212589.528 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212589.528 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212589.535 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212589.554 * * [misc]simplify:  iters left: 4 (322 enodes)
1545212589.715 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (* d d) D) (/ (/ c0 w) h))))
1545212589.716 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))) (* (sqrt (sqrt (+ (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (/ (* d d) D) (/ (/ c0 w) h)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D))))
1545212589.716 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D)
1545212589.716 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212589.719 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212589.728 * * [misc]simplify:  iters left: 4 (153 enodes)
1545212589.793 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212589.793 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212589.793 * * * * [misc]progress:  [ 546 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))>
1545212589.793 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212589.793 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212589.800 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212589.819 * * [misc]simplify:  iters left: 4 (329 enodes)
1545212589.976 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)))))) (* (sqrt (sqrt (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ c0 h) (* (/ d D) (/ d D)))))
1545212589.976 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (- (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) M) (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (* M M) (- M)) (pow (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) 3)))))) (* (sqrt (sqrt (+ (* (/ (* (/ d D) (/ c0 h)) (/ w (/ d D))) (/ (* (/ d D) (/ c0 h)) (/ w (/ d D)))) (+ (* (* (/ d D) (/ d D)) (/ (* c0 M) (* w h))) (* M M))))) (* (/ c0 h) (* (/ d D) (/ d D))))) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w))))
1545212589.977 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w)
1545212589.977 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212589.983 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212589.992 * * [misc]simplify:  iters left: 4 (153 enodes)
1545212590.057 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))))))))
1545212590.057 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D)))))))))))
1545212590.057 * * * * [misc]progress:  [ 547 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)))))>
1545212590.057 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d)))
1545212590.057 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212590.063 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212590.078 * * [misc]simplify:  iters left: 4 (245 enodes)
1545212590.178 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* d d))))
1545212590.178 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (* (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (* D w) D))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* (/ c0 h) (* d d)))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D)))))
1545212590.178 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* w D) D))
1545212590.178 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212590.181 * * [misc]simplify:  iters left: 5 (36 enodes)
1545212590.187 * * [misc]simplify:  iters left: 4 (88 enodes)
1545212590.207 * * [misc]simplify:  iters left: 3 (217 enodes)
1545212590.265 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ M (/ (/ (/ d D) (/ h c0)) (/ w (/ d D)))))) (* (* D D) w))
1545212590.266 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ M (/ (/ (/ d D) (/ h c0)) (/ w (/ d D)))))) (* (* D D) w)))))
1545212590.266 * * * * [misc]progress:  [ 548 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))>
1545212590.266 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d)))
1545212590.266 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212590.271 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212590.285 * * [misc]simplify:  iters left: 4 (229 enodes)
1545212590.382 * [exit]simplify:  Simplified to (+ (* (/ (/ (* d c0) h) (/ w d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212590.382 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ (* d c0) h) (/ w d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D)))))
1545212590.382 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* D D))
1545212590.382 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212590.385 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212590.390 * * [misc]simplify:  iters left: 4 (72 enodes)
1545212590.407 * * [misc]simplify:  iters left: 3 (190 enodes)
1545212590.460 * [exit]simplify:  Simplified to (* (* D D) (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))))
1545212590.460 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (sqrt (+ M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w))))))))))
1545212590.460 * * * * [misc]progress:  [ 549 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212590.460 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d)))
1545212590.460 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212590.467 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212590.482 * * [misc]simplify:  iters left: 4 (244 enodes)
1545212590.587 * [exit]simplify:  Simplified to (+ (* (/ (/ c0 (/ h d)) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))))
1545212590.587 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ c0 (/ h d)) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212590.587 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212590.587 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212590.590 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212590.595 * * [misc]simplify:  iters left: 4 (77 enodes)
1545212590.613 * * [misc]simplify:  iters left: 3 (196 enodes)
1545212590.667 * [exit]simplify:  Simplified to (* (* w D) (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))
1545212590.667 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) d))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))))))
1545212590.667 * * * * [misc]progress:  [ 550 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212590.667 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212590.668 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212590.674 * * [misc]simplify:  iters left: 5 (67 enodes)
1545212590.687 * * [misc]simplify:  iters left: 4 (226 enodes)
1545212590.790 * [exit]simplify:  Simplified to (+ (* (/ (* (/ c0 w) (/ d h)) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D)))
1545212590.790 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ c0 w) (/ d h)) (/ D d)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)))) D))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212590.791 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212590.791 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212590.793 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212590.798 * * [misc]simplify:  iters left: 4 (67 enodes)
1545212590.814 * * [misc]simplify:  iters left: 3 (186 enodes)
1545212590.867 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))) D)
1545212590.867 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))) D))))
1545212590.867 * * * * [misc]progress:  [ 551 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))>
1545212590.867 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D))))
1545212590.868 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212590.875 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212590.889 * * [misc]simplify:  iters left: 4 (242 enodes)
1545212590.991 * [exit]simplify:  Simplified to (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))))
1545212590.991 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* d (* (/ d D) (/ c0 h))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (* M M))))) (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)))))
1545212590.991 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D))
1545212590.991 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212590.994 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212590.999 * * [misc]simplify:  iters left: 4 (77 enodes)
1545212591.017 * * [misc]simplify:  iters left: 3 (196 enodes)
1545212591.071 * [exit]simplify:  Simplified to (* (* w D) (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D)))))))
1545212591.071 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) d) (/ d D)))) (* (* w D) (sqrt (sqrt (+ M (* (/ (/ d D) h) (* (/ c0 w) (/ d D))))))))))
1545212591.071 * * * * [misc]progress:  [ 552 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))>
1545212591.071 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212591.071 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212591.077 * * [misc]simplify:  iters left: 5 (68 enodes)
1545212591.092 * * [misc]simplify:  iters left: 4 (231 enodes)
1545212591.194 * [exit]simplify:  Simplified to (+ (* (/ (/ (* d c0) h) (* (/ D d) w)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212591.194 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ (* d c0) h) (* (/ D d) w)) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D))))
1545212591.194 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) D)
1545212591.195 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212591.197 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212591.202 * * [misc]simplify:  iters left: 4 (67 enodes)
1545212591.216 * * [misc]simplify:  iters left: 3 (186 enodes)
1545212591.271 * [exit]simplify:  Simplified to (* (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))) D)
1545212591.271 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))) D))))
1545212591.271 * * * * [misc]progress:  [ 553 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))>
1545212591.271 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212591.271 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212591.276 * * [misc]simplify:  iters left: 5 (69 enodes)
1545212591.292 * * [misc]simplify:  iters left: 4 (238 enodes)
1545212591.391 * [exit]simplify:  Simplified to (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))) w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))))))
1545212591.391 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (* (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)))) w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))))) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w))))
1545212591.391 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) w)
1545212591.391 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212591.394 * * [misc]simplify:  iters left: 5 (28 enodes)
1545212591.398 * * [misc]simplify:  iters left: 4 (67 enodes)
1545212591.412 * * [misc]simplify:  iters left: 3 (186 enodes)
1545212591.467 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d)))))))
1545212591.467 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (+ M (/ (/ (/ c0 h) w) (* (/ D d) (/ D d))))))))))
1545212591.468 * * * * [misc]progress:  [ 554 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* w D) D)))))>
1545212591.468 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) d)))
1545212591.468 * * [misc]simplify:  iters left: 6 (38 enodes)
1545212591.475 * * [misc]simplify:  iters left: 5 (95 enodes)
1545212591.497 * * [misc]simplify:  iters left: 4 (349 enodes)
1545212591.672 * [exit]simplify:  Simplified to (+ (* (* (* w (* D D)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (* d d) (/ c0 h))))
1545212591.672 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* w (* D D)) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (/ (* c0 M) (* w h)) (* (/ d D) (/ d D))) (* M M))))) (* (* d d) (/ c0 h)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* w D) D)))))
1545212591.672 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* w D) D))
1545212591.672 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212591.676 * * [misc]simplify:  iters left: 5 (53 enodes)
1545212591.687 * * [misc]simplify:  iters left: 4 (198 enodes)
1545212591.778 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* (* D w) D))
1545212591.778 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))) (* M M))))) (* (* D w) D)))))
1545212591.778 * * * * [misc]progress:  [ 555 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* D D)))))>
1545212591.779 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) d)))
1545212591.779 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212591.785 * * [misc]simplify:  iters left: 5 (90 enodes)
1545212591.805 * * [misc]simplify:  iters left: 4 (335 enodes)
1545212591.976 * [exit]simplify:  Simplified to (+ (* (/ (/ (* d c0) h) (/ w d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))))
1545212591.977 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ (* d c0) h) (/ w d)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ M w) (/ c0 h)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3))))))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* D D)))))
1545212591.977 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* D D))
1545212591.977 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212591.980 * * [misc]simplify:  iters left: 5 (48 enodes)
1545212591.991 * * [misc]simplify:  iters left: 4 (182 enodes)
1545212592.073 * [exit]simplify:  Simplified to (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212592.074 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212592.074 * * * * [misc]progress:  [ 556 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D)))))>
1545212592.074 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) d)))
1545212592.074 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212592.081 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212592.101 * * [misc]simplify:  iters left: 4 (350 enodes)
1545212592.280 * [exit]simplify:  Simplified to (+ (* (* (* d (/ c0 h)) (/ d D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))))
1545212592.280 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (* d (/ c0 h)) (/ d D)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D)))))
1545212592.281 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D))
1545212592.281 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212592.284 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212592.295 * * [misc]simplify:  iters left: 4 (187 enodes)
1545212592.381 * [exit]simplify:  Simplified to (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212592.381 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) d))) (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212592.381 * * * * [misc]progress:  [ 557 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D))))>
1545212592.382 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212592.382 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212592.390 * * [misc]simplify:  iters left: 5 (87 enodes)
1545212592.410 * * [misc]simplify:  iters left: 4 (333 enodes)
1545212592.587 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (/ d D) (* (/ c0 w) (/ d h)))))
1545212592.587 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (pow M 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))) (* (/ d D) (* (/ c0 w) (/ d h))))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D))))
1545212592.587 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D)
1545212592.587 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212592.593 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212592.603 * * [misc]simplify:  iters left: 4 (175 enodes)
1545212592.688 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212592.688 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))))
1545212592.689 * * * * [misc]progress:  [ 558 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D)))))>
1545212592.689 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) (/ d D))))
1545212592.689 * * [misc]simplify:  iters left: 6 (37 enodes)
1545212592.695 * * [misc]simplify:  iters left: 5 (92 enodes)
1545212592.715 * * [misc]simplify:  iters left: 4 (352 enodes)
1545212592.891 * [exit]simplify:  Simplified to (+ (* (/ (* d c0) (* (/ D d) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))))
1545212592.891 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* d c0) (* (/ D d) h)) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ M h) (/ c0 w)) (* (/ d D) (/ d D))) (* M M)))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D)))))
1545212592.892 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* w D))
1545212592.892 * * [misc]simplify:  iters left: 6 (20 enodes)
1545212592.895 * * [misc]simplify:  iters left: 5 (49 enodes)
1545212592.906 * * [misc]simplify:  iters left: 4 (187 enodes)
1545212592.993 * [exit]simplify:  Simplified to (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))))
1545212592.993 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) d) (/ d D)))) (* (* D w) (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M)))))))))
1545212592.993 * * * * [misc]progress:  [ 559 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D))))>
1545212592.993 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212592.994 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212593.002 * * [misc]simplify:  iters left: 5 (88 enodes)
1545212593.022 * * [misc]simplify:  iters left: 4 (337 enodes)
1545212593.195 * [exit]simplify:  Simplified to (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (* d (/ c0 h)) (/ w (/ d D)))))
1545212593.195 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))) D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (* d (/ c0 h)) (/ w (/ d D))))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D))))
1545212593.196 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) D)
1545212593.196 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212593.199 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212593.211 * * [misc]simplify:  iters left: 4 (175 enodes)
1545212593.297 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212593.297 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))))
1545212593.297 * * * * [misc]progress:  [ 560 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) w))))>
1545212593.297 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212593.298 * * [misc]simplify:  iters left: 6 (36 enodes)
1545212593.304 * * [misc]simplify:  iters left: 5 (89 enodes)
1545212593.324 * * [misc]simplify:  iters left: 4 (344 enodes)
1545212593.502 * [exit]simplify:  Simplified to (+ (* (* w (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (/ (/ c0 h) (/ D d)) (/ D d))))
1545212593.502 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* w (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))) (* (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (/ (/ (/ c0 h) (/ D d)) (/ D d)))) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) w))))
1545212593.502 * [enter]simplify:  Simplifying (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) w)
1545212593.502 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212593.505 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212593.515 * * [misc]simplify:  iters left: 4 (175 enodes)
1545212593.600 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M))))))
1545212593.600 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))))))))
1545212593.600 * * * * [misc]progress:  [ 561 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* w D) D)))))>
1545212593.601 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) d)))
1545212593.601 * * [misc]simplify:  iters left: 6 (33 enodes)
1545212593.606 * * [misc]simplify:  iters left: 5 (78 enodes)
1545212593.625 * * [misc]simplify:  iters left: 4 (270 enodes)
1545212593.739 * [exit]simplify:  Simplified to (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* D D) w))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (* d d) (/ c0 h))))
1545212593.739 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* D D) w))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))) (* (* d d) (/ c0 h)))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* w D) D)))))
1545212593.739 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* w D) D))
1545212593.739 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212593.742 * * [misc]simplify:  iters left: 5 (37 enodes)
1545212593.749 * * [misc]simplify:  iters left: 4 (102 enodes)
1545212593.773 * * [misc]simplify:  iters left: 3 (290 enodes)
1545212593.866 * [exit]simplify:  Simplified to (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D w) D))
1545212593.866 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) d))) (* (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))) (* (* D w) D)))))
1545212593.866 * * * * [misc]progress:  [ 562 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) d))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D)))))>
1545212593.867 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) d)))
1545212593.867 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212593.872 * * [misc]simplify:  iters left: 5 (73 enodes)
1545212593.887 * * [misc]simplify:  iters left: 4 (256 enodes)
1545212594.002 * [exit]simplify:  Simplified to (+ (* (/ (* d (/ c0 h)) (/ w d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))))
1545212594.002 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* d (/ c0 h)) (/ w d)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (* (* D D) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D)))))
1545212594.002 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* D D))
1545212594.002 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212594.005 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212594.011 * * [misc]simplify:  iters left: 4 (88 enodes)
1545212594.029 * * [misc]simplify:  iters left: 3 (271 enodes)
1545212594.124 * [exit]simplify:  Simplified to (* (* D D) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w)))))))
1545212594.124 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* D D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) d))) (* (* D D) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ h (/ c0 w))))))))))
1545212594.124 * * * * [misc]progress:  [ 563 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) d))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))))>
1545212594.124 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) d)))
1545212594.124 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212594.130 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212594.145 * * [misc]simplify:  iters left: 4 (271 enodes)
1545212594.266 * [exit]simplify:  Simplified to (+ (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))))
1545212594.266 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ (* d c0) h) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))))
1545212594.266 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D))
1545212594.266 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212594.269 * * [misc]simplify:  iters left: 5 (33 enodes)
1545212594.275 * * [misc]simplify:  iters left: 4 (93 enodes)
1545212594.294 * * [misc]simplify:  iters left: 3 (275 enodes)
1545212594.390 * [exit]simplify:  Simplified to (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212594.390 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) d))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212594.390 * * * * [misc]progress:  [ 564 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D))))>
1545212594.391 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) (/ d D)) d)))
1545212594.391 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212594.396 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212594.411 * * [misc]simplify:  iters left: 4 (251 enodes)
1545212594.532 * [exit]simplify:  Simplified to (+ (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D)))
1545212594.532 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ (* d c0) h) (/ w (/ d D))) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D))))
1545212594.532 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D)
1545212594.533 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212594.535 * * [misc]simplify:  iters left: 5 (29 enodes)
1545212594.540 * * [misc]simplify:  iters left: 4 (83 enodes)
1545212594.558 * * [misc]simplify:  iters left: 3 (265 enodes)
1545212594.650 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212594.650 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) (/ d D)) d))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212594.650 * * * * [misc]progress:  [ 565 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))))>
1545212594.651 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) (/ d D))))
1545212594.651 * * [misc]simplify:  iters left: 6 (32 enodes)
1545212594.656 * * [misc]simplify:  iters left: 5 (75 enodes)
1545212594.672 * * [misc]simplify:  iters left: 4 (273 enodes)
1545212594.794 * [exit]simplify:  Simplified to (+ (* (* (/ c0 (/ h d)) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212594.794 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (/ h d)) (/ d D)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (* D w) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))) (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D)))))
1545212594.794 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* w D))
1545212594.794 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212594.797 * * [misc]simplify:  iters left: 5 (33 enodes)
1545212594.803 * * [misc]simplify:  iters left: 4 (93 enodes)
1545212594.822 * * [misc]simplify:  iters left: 3 (275 enodes)
1545212594.916 * [exit]simplify:  Simplified to (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212594.916 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* w D)) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) d) (/ d D)))) (* (* D w) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212594.916 * * * * [misc]progress:  [ 566 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D))))>
1545212594.918 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) (/ d D))))
1545212594.918 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212594.923 * * [misc]simplify:  iters left: 5 (71 enodes)
1545212594.938 * * [misc]simplify:  iters left: 4 (258 enodes)
1545212595.054 * [exit]simplify:  Simplified to (+ (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))))
1545212595.054 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (* (/ d D) (* d c0)) (* h w)) (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) (* (* (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))) D) (sqrt (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D))))
1545212595.055 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) D)
1545212595.057 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212595.060 * * [misc]simplify:  iters left: 5 (29 enodes)
1545212595.065 * * [misc]simplify:  iters left: 4 (83 enodes)
1545212595.083 * * [misc]simplify:  iters left: 3 (265 enodes)
1545212595.172 * [exit]simplify:  Simplified to (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212595.172 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) D) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ (/ c0 h) w) d) (/ d D)))) (* D (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212595.172 * * * * [misc]progress:  [ 567 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w))))>
1545212595.173 * [enter]simplify:  Simplifying (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) (/ d D))))
1545212595.173 * * [misc]simplify:  iters left: 6 (31 enodes)
1545212595.178 * * [misc]simplify:  iters left: 5 (72 enodes)
1545212595.195 * * [misc]simplify:  iters left: 4 (265 enodes)
1545212595.312 * [exit]simplify:  Simplified to (+ (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (* w (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M)))))))
1545212595.312 * [misc]simplify:  Simplified (2 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (/ (/ c0 h) (* (/ D d) (/ D d))) (sqrt (sqrt (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0)))))) (* (* w (sqrt (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M) (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))))))) (sqrt (sqrt (* (+ M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (* (- M (/ (* (/ d D) (/ d D)) (/ (* h w) c0))) (- (/ (* (/ d D) (/ d D)) (/ (* h w) c0)) M))))))) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w))))
1545212595.312 * [enter]simplify:  Simplifying (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) w)
1545212595.312 * * [misc]simplify:  iters left: 6 (15 enodes)
1545212595.315 * * [misc]simplify:  iters left: 5 (29 enodes)
1545212595.320 * * [misc]simplify:  iters left: 4 (83 enodes)
1545212595.341 * * [misc]simplify:  iters left: 3 (265 enodes)
1545212595.430 * [exit]simplify:  Simplified to (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))))
1545212595.430 * [misc]simplify:  Simplified (2 2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) w) (* (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (* (* (/ c0 h) (/ d D)) (/ d D)))) (* w (sqrt (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))))))
1545212595.430 * * * * [misc]progress:  [ 568 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (pow (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) 3) (pow (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) 3)) (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (- (* (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))) (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))))))>
1545212595.430 * * * * [misc]progress:  [ 569 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 1 (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))))>
1545212595.430 * * * * [misc]progress:  [ 570 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (- (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))) (- (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D))))))>
1545212595.430 * * * * [misc]progress:  [ 571 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))))>
1545212595.430 * * * * [misc]progress:  [ 572 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (pow (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) 1/2)) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.431 * * * * [misc]progress:  [ 573 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (pow (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) 1)) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.431 * * * * [misc]progress:  [ 574 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (log (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.431 * * * * [misc]progress:  [ 575 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (log (exp (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.431 * * * * [misc]progress:  [ 576 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (* (cbrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (cbrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.431 * * * * [misc]progress:  [ 577 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.431 * * * * [misc]progress:  [ 578 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (sqrt (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.431 * [enter]simplify:  Simplifying (sqrt (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))
1545212595.431 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212595.434 * * [misc]simplify:  iters left: 5 (34 enodes)
1545212595.440 * * [misc]simplify:  iters left: 4 (90 enodes)
1545212595.461 * * [misc]simplify:  iters left: 3 (318 enodes)
1545212595.631 * [exit]simplify:  Simplified to (fabs (cbrt (sqrt (* (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))) (- (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) M)))))
1545212595.632 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (fabs (cbrt (sqrt (* (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))) (- (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) M))))) (sqrt (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212595.632 * * * * [misc]progress:  [ 579 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.632 * [enter]simplify:  Simplifying (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212595.632 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212595.634 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212595.639 * * [misc]simplify:  iters left: 4 (67 enodes)
1545212595.652 * * [misc]simplify:  iters left: 3 (192 enodes)
1545212595.710 * [exit]simplify:  Simplified to (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))
1545212595.711 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (sqrt (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212595.711 * * * * [misc]progress:  [ 580 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.711 * [enter]simplify:  Simplifying (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))
1545212595.711 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212595.714 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212595.719 * * [misc]simplify:  iters left: 4 (86 enodes)
1545212595.742 * * [misc]simplify:  iters left: 3 (316 enodes)
1545212595.912 * [exit]simplify:  Simplified to (sqrt (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))
1545212595.912 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (sqrt (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212595.913 * * * * [misc]progress:  [ 581 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (sqrt 1) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.913 * [enter]simplify:  Simplifying (sqrt 1)
1545212595.913 * * [misc]simplify:  iters left: 1 (2 enodes)
1545212595.914 * [exit]simplify:  Simplified to 1
1545212595.914 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* 1 (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212595.914 * * * * [misc]progress:  [ 582 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212595.914 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))
1545212595.914 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212595.917 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212595.926 * * [misc]simplify:  iters left: 4 (159 enodes)
1545212596.007 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))
1545212596.007 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212596.007 * * * * [misc]progress:  [ 583 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.007 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))
1545212596.007 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212596.011 * * [misc]simplify:  iters left: 5 (50 enodes)
1545212596.022 * * [misc]simplify:  iters left: 4 (197 enodes)
1545212596.126 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))
1545212596.126 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212596.126 * * * * [misc]progress:  [ 584 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.126 * [enter]simplify:  Simplifying (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))
1545212596.126 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212596.130 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212596.144 * * [misc]simplify:  iters left: 4 (211 enodes)
1545212596.262 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212596.262 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212596.262 * * * * [misc]progress:  [ 585 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.263 * [enter]simplify:  Simplifying (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))
1545212596.263 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212596.266 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212596.277 * * [misc]simplify:  iters left: 4 (163 enodes)
1545212596.358 * [exit]simplify:  Simplified to (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212596.358 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212596.359 * * * * [misc]progress:  [ 586 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.359 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))
1545212596.359 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212596.362 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212596.371 * * [misc]simplify:  iters left: 4 (161 enodes)
1545212596.448 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))
1545212596.449 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212596.449 * * * * [misc]progress:  [ 587 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.449 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))
1545212596.449 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212596.452 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212596.460 * * [misc]simplify:  iters left: 4 (137 enodes)
1545212596.521 * [exit]simplify:  Simplified to (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212596.521 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212596.521 * * * * [misc]progress:  [ 588 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.522 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))
1545212596.522 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212596.525 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212596.534 * * [misc]simplify:  iters left: 4 (153 enodes)
1545212596.611 * [exit]simplify:  Simplified to (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))
1545212596.611 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212596.611 * * * * [misc]progress:  [ 589 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.611 * [enter]simplify:  Simplifying (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))
1545212596.611 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212596.617 * * [misc]simplify:  iters left: 5 (41 enodes)
1545212596.625 * * [misc]simplify:  iters left: 4 (150 enodes)
1545212596.700 * [exit]simplify:  Simplified to (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212596.700 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (/ (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212596.700 * * * * [misc]progress:  [ 590 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.701 * * * * [misc]progress:  [ 591 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (fabs (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.701 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))
1545212596.701 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212596.703 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212596.709 * * [misc]simplify:  iters left: 4 (87 enodes)
1545212596.730 * * [misc]simplify:  iters left: 3 (317 enodes)
1545212596.903 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))
1545212596.903 * [misc]simplify:  Simplified (2 2 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (fabs (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212596.903 * * * * [misc]progress:  [ 592 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* 1 (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.903 * * * * [misc]progress:  [ 593 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (pow (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) 1/2) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.903 * * * * [misc]progress:  [ 594 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (pow (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) 1) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.903 * * * * [misc]progress:  [ 595 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (exp (log (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.903 * * * * [misc]progress:  [ 596 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (log (exp (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.903 * * * * [misc]progress:  [ 597 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (* (cbrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (cbrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.903 * * * * [misc]progress:  [ 598 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (cbrt (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.904 * * * * [misc]progress:  [ 599 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (sqrt (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212596.904 * [enter]simplify:  Simplifying (sqrt (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))
1545212596.904 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212596.907 * * [misc]simplify:  iters left: 5 (34 enodes)
1545212596.913 * * [misc]simplify:  iters left: 4 (90 enodes)
1545212596.935 * * [misc]simplify:  iters left: 3 (318 enodes)
1545212597.103 * [exit]simplify:  Simplified to (fabs (cbrt (sqrt (* (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))) (- (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) M)))))
1545212597.104 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (fabs (cbrt (sqrt (* (+ M (* (/ (/ d D) w) (* (/ d D) (/ c0 h)))) (- (* (/ (/ d D) w) (* (/ d D) (/ c0 h))) M))))) (sqrt (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.104 * * * * [misc]progress:  [ 600 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (sqrt (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.104 * [enter]simplify:  Simplifying (sqrt (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))
1545212597.104 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212597.106 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212597.111 * * [misc]simplify:  iters left: 4 (67 enodes)
1545212597.124 * * [misc]simplify:  iters left: 3 (192 enodes)
1545212597.181 * [exit]simplify:  Simplified to (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))))
1545212597.181 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (sqrt (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (sqrt (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.181 * * * * [misc]progress:  [ 601 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.181 * [enter]simplify:  Simplifying (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))
1545212597.181 * * [misc]simplify:  iters left: 6 (17 enodes)
1545212597.184 * * [misc]simplify:  iters left: 5 (32 enodes)
1545212597.189 * * [misc]simplify:  iters left: 4 (86 enodes)
1545212597.210 * * [misc]simplify:  iters left: 3 (316 enodes)
1545212597.381 * [exit]simplify:  Simplified to (sqrt (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))
1545212597.381 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (sqrt (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.381 * * * * [misc]progress:  [ 602 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (sqrt 1) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.381 * [enter]simplify:  Simplifying (sqrt 1)
1545212597.382 * * [misc]simplify:  iters left: 1 (2 enodes)
1545212597.382 * [exit]simplify:  Simplified to 1
1545212597.382 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* 1 (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.383 * * * * [misc]progress:  [ 603 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.383 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))
1545212597.383 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212597.386 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212597.395 * * [misc]simplify:  iters left: 4 (159 enodes)
1545212597.474 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))
1545212597.474 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (* (- M) (* M M))) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.474 * * * * [misc]progress:  [ 604 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.474 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))
1545212597.475 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212597.478 * * [misc]simplify:  iters left: 5 (50 enodes)
1545212597.493 * * [misc]simplify:  iters left: 4 (197 enodes)
1545212597.597 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M)))))
1545212597.597 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)) (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.597 * * * * [misc]progress:  [ 605 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.597 * [enter]simplify:  Simplifying (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))
1545212597.598 * * [misc]simplify:  iters left: 6 (21 enodes)
1545212597.601 * * [misc]simplify:  iters left: 5 (51 enodes)
1545212597.613 * * [misc]simplify:  iters left: 4 (211 enodes)
1545212597.732 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212597.732 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (+ (* (- M) (* M M)) (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3)) (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.732 * * * * [misc]progress:  [ 606 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.732 * [enter]simplify:  Simplifying (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))
1545212597.732 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212597.735 * * [misc]simplify:  iters left: 5 (44 enodes)
1545212597.745 * * [misc]simplify:  iters left: 4 (163 enodes)
1545212597.827 * [exit]simplify:  Simplified to (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))))
1545212597.827 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))))) (sqrt (sqrt (* (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.827 * * * * [misc]progress:  [ 607 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.827 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3)))))
1545212597.827 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212597.830 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212597.839 * * [misc]simplify:  iters left: 4 (161 enodes)
1545212597.916 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M))))))
1545212597.916 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (+ (pow (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) 3) (* (- M) (* M M)))))) (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.916 * * * * [misc]progress:  [ 608 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.917 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M M)))))
1545212597.917 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212597.920 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212597.928 * * [misc]simplify:  iters left: 4 (137 enodes)
1545212597.989 * [exit]simplify:  Simplified to (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))))))
1545212597.989 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) (sqrt (sqrt (+ (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212597.989 * * * * [misc]progress:  [ 609 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212597.989 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))
1545212597.990 * * [misc]simplify:  iters left: 6 (19 enodes)
1545212597.993 * * [misc]simplify:  iters left: 5 (43 enodes)
1545212598.001 * * [misc]simplify:  iters left: 4 (153 enodes)
1545212598.077 * [exit]simplify:  Simplified to (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))))
1545212598.077 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212598.077 * * * * [misc]progress:  [ 610 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212598.077 * [enter]simplify:  Simplifying (sqrt (sqrt (* (- (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))
1545212598.078 * * [misc]simplify:  iters left: 6 (18 enodes)
1545212598.081 * * [misc]simplify:  iters left: 5 (41 enodes)
1545212598.089 * * [misc]simplify:  iters left: 4 (150 enodes)
1545212598.163 * [exit]simplify:  Simplified to (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))))
1545212598.163 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (/ (sqrt (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* h w))) M) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))))))) (sqrt (sqrt (- M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212598.164 * * * * [misc]progress:  [ 611 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212598.164 * * * * [misc]progress:  [ 612 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (fabs (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212598.164 * [enter]simplify:  Simplifying (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))
1545212598.164 * * [misc]simplify:  iters left: 6 (16 enodes)
1545212598.168 * * [misc]simplify:  iters left: 5 (31 enodes)
1545212598.174 * * [misc]simplify:  iters left: 4 (87 enodes)
1545212598.195 * * [misc]simplify:  iters left: 3 (317 enodes)
1545212598.365 * [exit]simplify:  Simplified to (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))
1545212598.366 * [misc]simplify:  Simplified (2 2 1 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (fabs (sqrt (sqrt (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212598.366 * * * * [misc]progress:  [ 613 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* 1 (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212598.366 * * * * [misc]progress:  [ 614 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212598.366 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212598.366 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212598.368 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212598.371 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212598.384 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212598.436 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212598.436 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212598.436 * * * * [misc]progress:  [ 615 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212598.436 * [enter]simplify:  Simplifying (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))
1545212598.436 * * [misc]simplify:  iters left: 6 (10 enodes)
1545212598.438 * * [misc]simplify:  iters left: 5 (21 enodes)
1545212598.442 * * [misc]simplify:  iters left: 4 (60 enodes)
1545212598.454 * * [misc]simplify:  iters left: 3 (179 enodes)
1545212598.506 * [exit]simplify:  Simplified to (* (/ (/ d D) w) (/ (/ d D) (/ h c0)))
1545212598.506 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ d D) w) (/ (/ d D) (/ h c0))) 1) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212598.506 * * * * [misc]progress:  [ 616 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 1) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212598.506 * * * * [misc]progress:  [ 617 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212598.506 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (+ (log (/ d D)) (log (/ d D))))
1545212598.506 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212598.508 * * [misc]simplify:  iters left: 5 (23 enodes)
1545212598.511 * * [misc]simplify:  iters left: 4 (49 enodes)
1545212598.520 * * [misc]simplify:  iters left: 3 (125 enodes)
1545212598.556 * * [misc]simplify:  iters left: 2 (471 enodes)
1545212598.856 * [exit]simplify:  Simplified to (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))
1545212598.856 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (+ (log (/ d D)) (log (/ d D))) (log (/ c0 (* w h))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212598.856 * * * * [misc]progress:  [ 618 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212598.856 * [enter]simplify:  Simplifying (+ (log (/ (/ c0 h) w)) (log (* (/ d D) (/ d D))))
1545212598.856 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212598.858 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212598.862 * * [misc]simplify:  iters left: 4 (53 enodes)
1545212598.872 * * [misc]simplify:  iters left: 3 (114 enodes)
1545212598.897 * * [misc]simplify:  iters left: 2 (347 enodes)
1545212599.054 * [exit]simplify:  Simplified to (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))
1545212599.054 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (+ (log (* (/ d D) (/ d D))) (log (/ (/ c0 h) w)))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.054 * * * * [misc]progress:  [ 619 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (exp (log (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.054 * * * * [misc]progress:  [ 620 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (log (exp (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.054 * * * * [misc]progress:  [ 621 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.055 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (/ d D)) (* (* (/ d D) (/ d D)) (/ d D))))
1545212599.055 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212599.057 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212599.068 * * [misc]simplify:  iters left: 4 (164 enodes)
1545212599.137 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212599.137 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.137 * * * * [misc]progress:  [ 622 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.137 * [enter]simplify:  Simplifying (* (* (* (/ (/ c0 h) w) (/ (/ c0 h) w)) (/ (/ c0 h) w)) (* (* (* (/ d D) (/ d D)) (* (/ d D) (/ d D))) (* (/ d D) (/ d D))))
1545212599.137 * * [misc]simplify:  iters left: 6 (14 enodes)
1545212599.140 * * [misc]simplify:  iters left: 5 (39 enodes)
1545212599.149 * * [misc]simplify:  iters left: 4 (170 enodes)
1545212599.220 * [exit]simplify:  Simplified to (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))
1545212599.220 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (pow (/ d D) 3) (pow (/ d D) 3)) (pow (/ (/ c0 h) w) 3))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.220 * * * * [misc]progress:  [ 623 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (cbrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.220 * * * * [misc]progress:  [ 624 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (cbrt (* (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.221 * * * * [misc]progress:  [ 625 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (sqrt (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.221 * * * * [misc]progress:  [ 626 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d d)) (* w (* D D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.221 * [enter]simplify:  Simplifying (* (/ c0 h) (* d d))
1545212599.221 * * [misc]simplify:  iters left: 4 (6 enodes)
1545212599.222 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212599.224 * * [misc]simplify:  iters left: 2 (20 enodes)
1545212599.226 * * [misc]simplify:  iters left: 1 (28 enodes)
1545212599.230 * [exit]simplify:  Simplified to (/ (* d d) (/ h c0))
1545212599.230 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (/ (* d d) (/ h c0)) (* w (* D D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.230 * [enter]simplify:  Simplifying (* w (* D D))
1545212599.230 * * [misc]simplify:  iters left: 4 (4 enodes)
1545212599.231 * * [misc]simplify:  iters left: 3 (7 enodes)
1545212599.232 * * [misc]simplify:  iters left: 2 (9 enodes)
1545212599.233 * [exit]simplify:  Simplified to (* w (* D D))
1545212599.233 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d d)) (* w (* D D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.233 * * * * [misc]progress:  [ 627 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) d)) (* w D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.233 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) d))
1545212599.233 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212599.234 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212599.237 * * [misc]simplify:  iters left: 4 (40 enodes)
1545212599.244 * * [misc]simplify:  iters left: 3 (79 enodes)
1545212599.256 * * [misc]simplify:  iters left: 2 (132 enodes)
1545212599.281 * * [misc]simplify:  iters left: 1 (191 enodes)
1545212599.324 * [exit]simplify:  Simplified to (* (* d (/ d h)) (/ c0 D))
1545212599.324 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (* d (/ d h)) (/ c0 D)) (* w D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.324 * [enter]simplify:  Simplifying (* w D)
1545212599.324 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212599.325 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212599.325 * [exit]simplify:  Simplified to (* w D)
1545212599.325 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) d)) (* w D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.325 * * * * [misc]progress:  [ 628 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d (/ d D))) (* w D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.325 * [enter]simplify:  Simplifying (* (/ c0 h) (* d (/ d D)))
1545212599.325 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212599.327 * * [misc]simplify:  iters left: 5 (16 enodes)
1545212599.330 * * [misc]simplify:  iters left: 4 (41 enodes)
1545212599.338 * * [misc]simplify:  iters left: 3 (75 enodes)
1545212599.349 * * [misc]simplify:  iters left: 2 (125 enodes)
1545212599.370 * * [misc]simplify:  iters left: 1 (181 enodes)
1545212599.412 * [exit]simplify:  Simplified to (* (/ d D) (* c0 (/ d h)))
1545212599.413 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ d D) (* c0 (/ d h))) (* w D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.413 * [enter]simplify:  Simplifying (* w D)
1545212599.413 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212599.413 * * [misc]simplify:  iters left: 1 (4 enodes)
1545212599.414 * [exit]simplify:  Simplified to (* w D)
1545212599.414 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* d (/ d D))) (* w D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.414 * * * * [misc]progress:  [ 629 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.414 * * * * [misc]progress:  [ 630 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.414 * [enter]simplify:  Simplifying (/ d D)
1545212599.414 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212599.415 * [exit]simplify:  Simplified to (/ d D)
1545212599.415 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.415 * * * * [misc]progress:  [ 631 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.415 * [enter]simplify:  Simplifying (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212599.415 * * [misc]simplify:  iters left: 6 (7 enodes)
1545212599.416 * * [misc]simplify:  iters left: 5 (9 enodes)
1545212599.417 * * [misc]simplify:  iters left: 4 (12 enodes)
1545212599.419 * [exit]simplify:  Simplified to (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w)))
1545212599.419 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (cbrt (/ (/ c0 h) w)) (cbrt (/ (/ c0 h) w))) (* (cbrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.419 * * * * [misc]progress:  [ 632 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.419 * [enter]simplify:  Simplifying (sqrt (/ (/ c0 h) w))
1545212599.419 * * [misc]simplify:  iters left: 5 (6 enodes)
1545212599.420 * * [misc]simplify:  iters left: 4 (8 enodes)
1545212599.421 * * [misc]simplify:  iters left: 3 (11 enodes)
1545212599.422 * [exit]simplify:  Simplified to (sqrt (/ (/ c0 h) w))
1545212599.423 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (sqrt (/ (/ c0 h) w)) (* (sqrt (/ (/ c0 h) w)) (* (/ d D) (/ d D)))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.423 * * * * [misc]progress:  [ 633 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* 1 (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.423 * * * * [misc]progress:  [ 634 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.423 * [enter]simplify:  Simplifying (/ c0 h)
1545212599.423 * * [misc]simplify:  iters left: 2 (3 enodes)
1545212599.423 * [exit]simplify:  Simplified to (/ c0 h)
1545212599.423 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ c0 h) (* (/ 1 w) (* (/ d D) (/ d D)))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.423 * * * * [misc]progress:  [ 635 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d d)) (* D D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.423 * [enter]simplify:  Simplifying (* D D)
1545212599.423 * * [misc]simplify:  iters left: 2 (2 enodes)
1545212599.424 * [exit]simplify:  Simplified to (* D D)
1545212599.424 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d d)) (* D D)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.424 * * * * [misc]progress:  [ 636 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.424 * * * * [misc]progress:  [ 637 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ (/ c0 h) w) (* d (/ d D))) D) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.424 * * * * [misc]progress:  [ 638 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (/ c0 h) (* (/ d D) (/ d D))) w) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.424 * [enter]simplify:  Simplifying (* (/ c0 h) (* (/ d D) (/ d D)))
1545212599.424 * * [misc]simplify:  iters left: 6 (8 enodes)
1545212599.426 * * [misc]simplify:  iters left: 5 (17 enodes)
1545212599.429 * * [misc]simplify:  iters left: 4 (46 enodes)
1545212599.436 * * [misc]simplify:  iters left: 3 (102 enodes)
1545212599.456 * * [misc]simplify:  iters left: 2 (213 enodes)
1545212599.514 * * [misc]simplify:  iters left: 1 (420 enodes)
1545212599.690 * [exit]simplify:  Simplified to (* (* (/ c0 h) (/ d D)) (/ d D))
1545212599.690 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* (* (/ c0 h) (/ d D)) (/ d D)) w) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.690 * * * * [misc]progress:  [ 639 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.690 * * * * [misc]progress:  [ 640 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))>
1545212599.690 * [enter]simplify:  Simplifying (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))
1545212599.690 * * [misc]simplify:  iters left: 6 (13 enodes)
1545212599.692 * * [misc]simplify:  iters left: 5 (30 enodes)
1545212599.700 * * [misc]simplify:  iters left: 4 (134 enodes)
1545212599.772 * [exit]simplify:  Simplified to (* (/ (* 2 c0) (* w h)) (* (/ d D) (/ d D)))
1545212599.772 * [misc]simplify:  Simplified (2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (/ (* 2 c0) (* w h)) (* (/ d D) (/ d D)))))
1545212599.772 * * * * [misc]progress:  [ 641 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (sqrt -1) M)))>
1545212599.773 * [enter]simplify:  Simplifying (* (sqrt -1) M)
1545212599.773 * * [misc]simplify:  iters left: 3 (4 enodes)
1545212599.774 * * [misc]simplify:  iters left: 2 (5 enodes)
1545212599.775 * [exit]simplify:  Simplified to (* M (sqrt -1))
1545212599.775 * [misc]simplify:  Simplified (2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* M (sqrt -1))))
1545212599.775 * * * * [misc]progress:  [ 642 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* -1 (* (sqrt -1) M))))>
1545212599.775 * [enter]simplify:  Simplifying (* -1 (* (sqrt -1) M))
1545212599.775 * * [misc]simplify:  iters left: 5 (5 enodes)
1545212599.776 * * [misc]simplify:  iters left: 4 (10 enodes)
1545212599.778 * * [misc]simplify:  iters left: 3 (21 enodes)
1545212599.781 * * [misc]simplify:  iters left: 2 (22 enodes)
1545212599.783 * [exit]simplify:  Simplified to (* (- M) (sqrt -1))
1545212599.783 * [misc]simplify:  Simplified (2 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* (- M) (sqrt -1))))
1545212599.783 * * * * [misc]progress:  [ 643 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.784 * [enter]simplify:  Simplifying (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))))
1545212599.784 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212599.788 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212599.795 * * [misc]simplify:  iters left: 4 (99 enodes)
1545212599.819 * * [misc]simplify:  iters left: 3 (274 enodes)
1545212599.924 * [exit]simplify:  Simplified to (exp (+ (+ (+ (* (log d) 1) (* (log c0) 1/2)) (* (- (log D)) 1)) (* 1/2 (- (+ (log h) (log w))))))
1545212599.924 * [misc]simplify:  Simplified (2 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (+ (+ (+ (* (log d) 1) (* (log c0) 1/2)) (* (- (log D)) 1)) (* 1/2 (- (+ (log h) (log w))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212599.924 * * * * [misc]progress:  [ 644 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (exp (* 1/4 (- (log -1) (* 2 (log (/ 1 M))))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212599.924 * [enter]simplify:  Simplifying (exp (* 1/4 (- (log -1) (* 2 (log (/ 1 M))))))
1545212599.924 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212599.927 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212599.931 * * [misc]simplify:  iters left: 4 (42 enodes)
1545212599.938 * * [misc]simplify:  iters left: 3 (68 enodes)
1545212599.951 * * [misc]simplify:  iters left: 2 (126 enodes)
1545212599.974 * * [misc]simplify:  iters left: 1 (206 enodes)
1545212600.044 * [exit]simplify:  Simplified to (* (sqrt M) (pow -1 1/4))
1545212600.044 * [misc]simplify:  Simplified (2 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* (sqrt M) (pow -1 1/4))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212600.044 * * * * [misc]progress:  [ 645 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (* +nan.0 (sqrt -1))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212600.044 * [enter]simplify:  Simplifying (* +nan.0 (sqrt -1))
1545212600.044 * [misc]simplify:  Simplified (2 2 1 2) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) +nan.0) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212600.044 * * * * [misc]progress:  [ 646 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w))))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212600.044 * [enter]simplify:  Simplifying (exp (* 1/4 (- (+ (* 2 (log c0)) (* 4 (log d))) (+ (* 4 (log D)) (+ (* 2 (log h)) (* 2 (log w)))))))
1545212600.044 * * [misc]simplify:  iters left: 6 (24 enodes)
1545212600.048 * * [misc]simplify:  iters left: 5 (45 enodes)
1545212600.056 * * [misc]simplify:  iters left: 4 (99 enodes)
1545212600.079 * * [misc]simplify:  iters left: 3 (274 enodes)
1545212600.184 * [exit]simplify:  Simplified to (exp (+ (+ (+ (* (log d) 1) (* (log c0) 1/2)) (* (- (log D)) 1)) (* 1/2 (- (+ (log h) (log w))))))
1545212600.184 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (exp (+ (+ (+ (* (log d) 1) (* (log c0) 1/2)) (* (- (log D)) 1)) (* 1/2 (- (+ (log h) (log w)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212600.184 * * * * [misc]progress:  [ 647 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (exp (* 1/4 (- (log -1) (* 2 (log (/ 1 M)))))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212600.185 * [enter]simplify:  Simplifying (exp (* 1/4 (- (log -1) (* 2 (log (/ 1 M))))))
1545212600.185 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212600.187 * * [misc]simplify:  iters left: 5 (24 enodes)
1545212600.191 * * [misc]simplify:  iters left: 4 (42 enodes)
1545212600.198 * * [misc]simplify:  iters left: 3 (68 enodes)
1545212600.211 * * [misc]simplify:  iters left: 2 (126 enodes)
1545212600.232 * * [misc]simplify:  iters left: 1 (206 enodes)
1545212600.301 * [exit]simplify:  Simplified to (* (sqrt M) (pow -1 1/4))
1545212600.301 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (sqrt M) (pow -1 1/4)) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212600.301 * * * * [misc]progress:  [ 648 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* +nan.0 (sqrt -1)) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212600.301 * [enter]simplify:  Simplifying (* +nan.0 (sqrt -1))
1545212600.301 * [misc]simplify:  Simplified (2 2 1 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* +nan.0 (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212600.301 * * * * [misc]progress:  [ 649 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212600.302 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212600.302 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212600.304 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212600.309 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212600.341 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212600.855 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212600.855 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212600.855 * * * * [misc]progress:  [ 650 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212600.855 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212600.855 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212600.857 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212600.864 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212600.894 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212601.162 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212601.162 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212601.162 * * * * [misc]progress:  [ 651 / 651 ] simplifiying candidate #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))>
1545212601.162 * [enter]simplify:  Simplifying (/ (* c0 (pow d 2)) (* (pow D 2) (* w h)))
1545212601.162 * * [misc]simplify:  iters left: 6 (12 enodes)
1545212601.164 * * [misc]simplify:  iters left: 5 (26 enodes)
1545212601.169 * * [misc]simplify:  iters left: 4 (98 enodes)
1545212601.199 * * [misc]simplify:  iters left: 3 (434 enodes)
1545212601.467 * [exit]simplify:  Simplified to (* (/ (/ c0 w) h) (* (/ d D) (/ d D)))
1545212601.467 * [misc]simplify:  Simplified (2 2 1 2 1 1 2 1) to (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 w) h) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))
1545212601.468 * * * [misc]progress:  adding candidates to table
1545212618.720 * [misc]progress:  [Phase 3 of 3] Extracting.
1545212618.720 * * [misc]regime:  Finding splitpoints for: (#<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))>)
1545212618.755 * * * [misc]regime-changes:  Trying 6 branch expressions: (M D h d w c0)
1545212618.755 * * * * [misc]regimes:  Trying to branch on M from (#<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))>)
1545212618.918 * * * * [misc]regimes:  Trying to branch on D from (#<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))>)
1545212619.100 * * * * [misc]regimes:  Trying to branch on h from (#<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))>)
1545212619.271 * * * * [misc]regimes:  Trying to branch on d from (#<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))>)
1545212619.451 * * * * [misc]regimes:  Trying to branch on w from (#<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))>)
1545212619.614 * * * * [misc]regimes:  Trying to branch on c0 from (#<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))>)
1545212619.786 * * * [misc]regime:  Found split indices: #<option (#s(si 4 42) #s(si 13 66) #s(si 1 150) #s(si 4 256))>
1545212619.788 * [misc]binary-search:  Improving bounds with binary search for D and (#<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))>)
1545212619.789 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212619.804 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.804 * * * * [misc]points:  Sampling 11 additional inputs, on iter 1 have 5 / 16
1545212619.828 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.828 * * * * [misc]points:  Sampling 4 additional inputs, on iter 2 have 13 / 16
1545212619.836 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.836 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 15 / 16
1545212619.846 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.846 * * * * [exit]points:  Sampled 18 points with exact outputs
1545212619.849 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212619.865 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.865 * * * * [misc]points:  Sampling 11 additional inputs, on iter 1 have 5 / 16
1545212619.898 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.898 * * * * [misc]points:  Sampling 7 additional inputs, on iter 2 have 9 / 16
1545212619.908 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.908 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 12 / 16
1545212619.915 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.915 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 14 / 16
1545212619.921 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.921 * * * * [misc]points:  Sampling 4 additional inputs, on iter 5 have 15 / 16
1545212619.929 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.929 * * * * [exit]points:  Sampled 17 points with exact outputs
1545212619.933 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212619.956 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.956 * * * * [misc]points:  Sampling 11 additional inputs, on iter 1 have 5 / 16
1545212619.970 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212619.970 * * * * [misc]points:  Sampling 6 additional inputs, on iter 2 have 10 / 16
1545212620.004 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.004 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 12 / 16
1545212620.015 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.015 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 15 / 16
1545212620.019 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.019 * * * * [misc]points:  Sampling 4 additional inputs, on iter 5 have 15 / 16
1545212620.027 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.027 * * * * [exit]points:  Sampled 18 points with exact outputs
1545212620.031 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.049 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.049 * * * * [misc]points:  Sampling 8 additional inputs, on iter 1 have 8 / 16
1545212620.055 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.055 * * * * [misc]points:  Sampling 4 additional inputs, on iter 2 have 12 / 16
1545212620.059 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.059 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 13 / 16
1545212620.067 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.067 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 15 / 16
1545212620.073 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.073 * * * * [exit]points:  Sampled 17 points with exact outputs
1545212620.077 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.114 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.114 * * * * [misc]points:  Sampling 9 additional inputs, on iter 1 have 7 / 16
1545212620.126 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.126 * * * * [misc]points:  Sampling 6 additional inputs, on iter 2 have 10 / 16
1545212620.133 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.133 * * * * [misc]points:  Sampling 5 additional inputs, on iter 3 have 11 / 16
1545212620.139 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.139 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 14 / 16
1545212620.146 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.146 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.150 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.164 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.164 * * * * [misc]points:  Sampling 13 additional inputs, on iter 1 have 3 / 16
1545212620.182 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.182 * * * * [misc]points:  Sampling 7 additional inputs, on iter 2 have 9 / 16
1545212620.217 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.217 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 13 / 16
1545212620.223 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.223 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 14 / 16
1545212620.231 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.231 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.235 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.253 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.253 * * * * [misc]points:  Sampling 10 additional inputs, on iter 1 have 6 / 16
1545212620.266 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.266 * * * * [misc]points:  Sampling 6 additional inputs, on iter 2 have 10 / 16
1545212620.273 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.273 * * * * [misc]points:  Sampling 5 additional inputs, on iter 3 have 11 / 16
1545212620.279 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.279 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 13 / 16
1545212620.286 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.286 * * * * [misc]points:  Sampling 4 additional inputs, on iter 5 have 15 / 16
1545212620.292 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.292 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.296 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.335 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.335 * * * * [misc]points:  Sampling 9 additional inputs, on iter 1 have 7 / 16
1545212620.346 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.346 * * * * [misc]points:  Sampling 8 additional inputs, on iter 2 have 8 / 16
1545212620.359 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.359 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 12 / 16
1545212620.364 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.364 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 13 / 16
1545212620.368 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.368 * * * * [misc]points:  Sampling 4 additional inputs, on iter 5 have 15 / 16
1545212620.374 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.374 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.378 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.396 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.396 * * * * [misc]points:  Sampling 10 additional inputs, on iter 1 have 6 / 16
1545212620.430 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.430 * * * * [misc]points:  Sampling 4 additional inputs, on iter 2 have 12 / 16
1545212620.435 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.435 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 12 / 16
1545212620.443 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.443 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 13 / 16
1545212620.447 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.447 * * * * [misc]points:  Sampling 4 additional inputs, on iter 5 have 13 / 16
1545212620.451 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.451 * * * * [misc]points:  Sampling 4 additional inputs, on iter 6 have 13 / 16
1545212620.457 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.457 * * * * [misc]points:  Sampling 4 additional inputs, on iter 7 have 15 / 16
1545212620.461 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.461 * * * * [exit]points:  Sampled 17 points with exact outputs
1545212620.465 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.482 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.482 * * * * [misc]points:  Sampling 12 additional inputs, on iter 1 have 4 / 16
1545212620.498 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.498 * * * * [misc]points:  Sampling 5 additional inputs, on iter 2 have 11 / 16
1545212620.507 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.507 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 13 / 16
1545212620.535 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.535 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.539 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.557 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.557 * * * * [misc]points:  Sampling 13 additional inputs, on iter 1 have 3 / 16
1545212620.579 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.579 * * * * [misc]points:  Sampling 5 additional inputs, on iter 2 have 11 / 16
1545212620.588 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.588 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 14 / 16
1545212620.594 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.594 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.598 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.642 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.642 * * * * [misc]points:  Sampling 8 additional inputs, on iter 1 have 8 / 16
1545212620.657 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.657 * * * * [misc]points:  Sampling 4 additional inputs, on iter 2 have 12 / 16
1545212620.665 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.665 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 14 / 16
1545212620.669 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.669 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 14 / 16
1545212620.677 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.677 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.682 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.699 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.699 * * * * [misc]points:  Sampling 11 additional inputs, on iter 1 have 5 / 16
1545212620.717 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.717 * * * * [misc]points:  Sampling 6 additional inputs, on iter 2 have 10 / 16
1545212620.752 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.752 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 12 / 16
1545212620.756 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.756 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 14 / 16
1545212620.765 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.765 * * * * [misc]points:  Sampling 4 additional inputs, on iter 5 have 15 / 16
1545212620.772 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.772 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.776 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.797 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.797 * * * * [misc]points:  Sampling 11 additional inputs, on iter 1 have 5 / 16
1545212620.814 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.814 * * * * [misc]points:  Sampling 5 additional inputs, on iter 2 have 11 / 16
1545212620.820 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.820 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 15 / 16
1545212620.826 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.826 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.830 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.872 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.873 * * * * [misc]points:  Sampling 8 additional inputs, on iter 1 have 8 / 16
1545212620.882 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.882 * * * * [misc]points:  Sampling 5 additional inputs, on iter 2 have 11 / 16
1545212620.891 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.891 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 12 / 16
1545212620.898 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.898 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 14 / 16
1545212620.906 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.906 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212620.910 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212620.925 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212620.925 * * * * [misc]points:  Sampling 12 additional inputs, on iter 1 have 4 / 16
1545212621.204 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.204 * * * * [misc]points:  Sampling 6 additional inputs, on iter 2 have 10 / 16
1545212621.217 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.217 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 13 / 16
1545212621.225 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.225 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 14 / 16
1545212621.231 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.231 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212621.235 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212621.255 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.255 * * * * [misc]points:  Sampling 8 additional inputs, on iter 1 have 8 / 16
1545212621.266 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.266 * * * * [misc]points:  Sampling 6 additional inputs, on iter 2 have 10 / 16
1545212621.275 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.275 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 13 / 16
1545212621.280 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.280 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 14 / 16
1545212621.306 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.307 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212621.311 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212621.334 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.334 * * * * [misc]points:  Sampling 10 additional inputs, on iter 1 have 6 / 16
1545212621.348 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.348 * * * * [misc]points:  Sampling 6 additional inputs, on iter 2 have 10 / 16
1545212621.355 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.355 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 13 / 16
1545212621.363 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.364 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212621.368 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212621.409 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.410 * * * * [misc]points:  Sampling 7 additional inputs, on iter 1 have 9 / 16
1545212621.421 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.421 * * * * [misc]points:  Sampling 6 additional inputs, on iter 2 have 10 / 16
1545212621.435 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.435 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 15 / 16
1545212621.440 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.440 * * * * [exit]points:  Sampled 18 points with exact outputs
1545212621.445 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212621.474 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.474 * * * * [misc]points:  Sampling 7 additional inputs, on iter 1 have 9 / 16
1545212621.487 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.487 * * * * [misc]points:  Sampling 4 additional inputs, on iter 2 have 13 / 16
1545212621.515 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.515 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 15 / 16
1545212621.527 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.527 * * * * [exit]points:  Sampled 17 points with exact outputs
1545212621.533 * * * * [misc]points:  Sampling 16 additional inputs, on iter 0 have 0 / 16
1545212621.559 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.560 * * * * [misc]points:  Sampling 4 additional inputs, on iter 1 have 12 / 16
1545212621.564 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.564 * * * * [misc]points:  Sampling 4 additional inputs, on iter 2 have 12 / 16
1545212621.568 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.568 * * * * [misc]points:  Sampling 4 additional inputs, on iter 3 have 12 / 16
1545212621.574 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.574 * * * * [misc]points:  Sampling 4 additional inputs, on iter 4 have 13 / 16
1545212621.582 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.582 * * * * [misc]points:  Sampling 4 additional inputs, on iter 5 have 15 / 16
1545212621.588 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212621.588 * * * * [exit]points:  Sampled 16 points with exact outputs
1545212621.593 * [misc]regimes:  Found splitpoints: (#s(sp 4 D -3.0365187498466197e-31) #s(sp 13 D -1.448081804081321e-136) #s(sp 1 D 6.4228499417539e-200) #s(sp 4 D +nan.0)) , with alts (#<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (/ c0 (* w h)) (/ d (/ D d))) (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (- (* (* (/ d D) (/ d D)) (* (/ M h) (/ c0 w))) (* M M))))) (* (sqrt (* (- (* (* (/ d D) (/ d D)) (/ c0 (* w h))) M) (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* w h))) 3) (pow M 3)))) D)) (* (sqrt (- (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- (* (* (/ d D) (/ d D)) (* (/ M w) (/ c0 h))) (* M M)))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (/ (* (/ (/ c0 h) w) (* d (/ d D))) D)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) (sqrt (* (+ M (/ (/ c0 (* w h)) (* (/ D d) (/ D d)))) (- (/ (/ c0 (* w h)) (* (/ D d) (/ D d))) M))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (- (* (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)) (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))) (* M M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h))))) (* D w)) (* (sqrt (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 w) h)))) (/ (* (* d c0) (/ d D)) h))) (* (* w D) (sqrt (+ M (/ (* (/ d D) c0) (/ (* w h) (/ d D)))))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* w (sqrt (* (- (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))) M) (* (+ M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))) (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h)))))))) (* (* (/ c0 h) (* (/ d D) (/ d D))) (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) w))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (* (* (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M)))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (cbrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (* (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))) (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (+ M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w))))) D) (* (/ (/ (* d c0) (* h w)) (/ D d)) (sqrt (- M (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)))))) (* (sqrt (- M (/ (* (/ d D) (/ d D)) (/ w (/ c0 h))))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (* (sqrt (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3) (pow M 3))))) (sqrt (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (* (* w D) D)) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* (/ c0 h) d) d))) (* (* (sqrt (sqrt (+ (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (+ (* M M) (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))))) (sqrt (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))))) (* (* w D) D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* d (/ d D))) D))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow M 3) (pow (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) 3)) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* w D)) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* (* (/ c0 h) d) (/ d D)))) (* (sqrt (+ (* M M) (- (* (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (* M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))))) (* w D)))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (exp (log (+ (sqrt (* (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D)))) (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (/ (* (/ (/ c0 h) w) (* (/ d D) d)) D))))))> #<alt (λ (c0 w h D d M) (* (/ (/ c0 2) w) (/ (+ (* (sqrt (* (+ (pow (* (* (/ d D) (/ d D)) (/ c0 (* h w))) 3) (* (- M) (* M M))) (* (+ M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w))))))) D) (* (* (/ d (/ D d)) (/ c0 (* h w))) (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* (* (* (/ d D) (/ d D)) (/ c0 (* h w))) (* (* (/ d D) (/ d D)) (/ c0 (* h w)))) (+ (* M M) (* (* (/ d D) (/ d D)) (/ (* M c0) (* h w))))))))) (* (sqrt (* (- M (* (* (/ d D) (/ d D)) (/ c0 (* w h)))) (+ (+ (* M M) (* (/ (* M c0) (* w h)) (* (/ d D) (/ d D)))) (* (* (* (/ d D) (/ d D)) (/ c0 (* w h))) (* (* (/ d D) (/ d D)) (/ c0 (* w h))))))) D))))>)
1545212621.594 * [enter]simplify:  Simplifying (if (<= D -3.0365187498466197e-31) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))) (if (<= D -1.448081804081321e-136) (* (/ (/ c0 2) w) (* 2 (/ (* c0 (pow d 2)) (* (pow D 2) (* w h))))) (if (<= D 6.4228499417539e-200) (* (/ (/ c0 2) w) (+ (* (sqrt (+ M (* (/ (/ c0 h) w) (* (/ d D) (/ d D))))) (sqrt (- (* (/ (/ c0 h) w) (* (/ d D) (/ d D))) M))) (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)))) (* (/ (/ c0 2) w) (log (exp (+ (sqrt (* (+ M (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)))))))))
1545212621.594 * * [misc]simplify:  iters left: 6 (52 enodes)
1545212621.597 * * [misc]simplify:  iters left: 5 (70 enodes)
1545212621.601 * [exit]simplify:  Simplified to (if (<= D -3.0365187498466197e-31) (* (log (exp (+ (sqrt (* (+ (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))))) (/ (/ c0 2) w)) (if (<= D -1.448081804081321e-136) (* (* 2 (/ (* c0 (pow d 2)) (* (* h w) (pow D 2)))) (/ (/ c0 2) w)) (if (<= D 6.4228499417539e-200) (* (/ (/ c0 2) w) (+ (* (* (/ (/ c0 h) w) (/ d D)) (/ d D)) (* (sqrt (+ (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M)) (sqrt (- (* (* (/ d D) (/ d D)) (/ (/ c0 h) w)) M))))) (* (log (exp (+ (sqrt (* (+ (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M) (- (* (* (/ d D) (/ c0 w)) (/ (/ d D) h)) M))) (* (* (/ d D) (/ c0 w)) (/ (/ d D) h))))) (/ (/ c0 2) w)))))
1545212621.601 * * * * [misc]points:  Sampling 8000 additional inputs, on iter 0 have 0 / 8000
1545212633.380 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212633.382 * * * * [misc]points:  Sampling 5492 additional inputs, on iter 1 have 2508 / 8000
1545212641.496 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212641.498 * * * * [misc]points:  Sampling 3829 additional inputs, on iter 2 have 4171 / 8000
1545212646.982 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212646.983 * * * * [misc]points:  Sampling 2664 additional inputs, on iter 3 have 5336 / 8000
1545212650.879 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212650.880 * * * * [misc]points:  Sampling 1887 additional inputs, on iter 4 have 6113 / 8000
1545212653.386 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212653.386 * * * * [misc]points:  Sampling 1305 additional inputs, on iter 5 have 6695 / 8000
1545212655.483 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212655.483 * * * * [misc]points:  Sampling 887 additional inputs, on iter 6 have 7113 / 8000
1545212656.773 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212656.774 * * * * [misc]points:  Sampling 624 additional inputs, on iter 7 have 7376 / 8000
1545212657.800 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212657.800 * * * * [misc]points:  Sampling 434 additional inputs, on iter 8 have 7566 / 8000
1545212658.348 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212658.349 * * * * [misc]points:  Sampling 301 additional inputs, on iter 9 have 7699 / 8000
1545212658.704 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212658.704 * * * * [misc]points:  Sampling 208 additional inputs, on iter 10 have 7792 / 8000
1545212659.198 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.198 * * * * [misc]points:  Sampling 139 additional inputs, on iter 11 have 7861 / 8000
1545212659.383 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.383 * * * * [misc]points:  Sampling 95 additional inputs, on iter 12 have 7905 / 8000
1545212659.512 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.513 * * * * [misc]points:  Sampling 65 additional inputs, on iter 13 have 7935 / 8000
1545212659.604 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.604 * * * * [misc]points:  Sampling 43 additional inputs, on iter 14 have 7957 / 8000
1545212659.648 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.648 * * * * [misc]points:  Sampling 29 additional inputs, on iter 15 have 7971 / 8000
1545212659.669 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.669 * * * * [misc]points:  Sampling 23 additional inputs, on iter 16 have 7977 / 8000
1545212659.722 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.722 * * * * [misc]points:  Sampling 15 additional inputs, on iter 17 have 7985 / 8000
1545212659.740 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.740 * * * * [misc]points:  Sampling 10 additional inputs, on iter 18 have 7990 / 8000
1545212659.746 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.747 * * * * [misc]points:  Sampling 8 additional inputs, on iter 19 have 7992 / 8000
1545212659.754 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.754 * * * * [misc]points:  Sampling 6 additional inputs, on iter 20 have 7994 / 8000
1545212659.761 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.761 * * * * [misc]points:  Sampling 4 additional inputs, on iter 21 have 7998 / 8000
1545212659.767 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.767 * * * * [misc]points:  Sampling 4 additional inputs, on iter 22 have 7999 / 8000
1545212659.773 * * * * [misc]points:  Filtering points with unrepresentable outputs
1545212659.773 * * * * [exit]points:  Sampled 8000 points with exact outputs
1545212661.724 * [misc]regime-testing:  Baseline error score: 55.62460329117592
1545212661.724 * [misc]regime-testing:  End program error score: 55.260200495436315
1545212661.725 * [misc]regime-testing:  Oracle error score: 46.95462397894091