* [misc]progress:  [Phase 1 of 3] Setting up.
* * * [misc]progress:  [1/2] Preparing points
* * * [misc]progress:  [2/2] Setting up program.
* [enter]simplify:  Simplifying (* 0.5 (sqrt (* 2.0 (+ (sqrt (+ (* re re) (* im im))) re))))
* * [misc]simplify:  iters left: 6 (12 enodes)
* * [misc]simplify:  iters left: 5 (25 enodes)
* * [misc]simplify:  iters left: 4 (32 enodes)
* * [misc]simplify:  iters left: 3 (34 enodes)
* [exit]simplify:  Simplified to (* 0.5 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* [misc]progress:  [Phase 2 of 3] Improving.
* * [misc]progress:  iteration 1 / 2
* * * [misc]progress:  picking best candidate
* * * * [misc]pick:  Picked  #<alt-delta (λ (re im) (* 0.5 (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))>
* * * [misc]progress:  localizing error
* * * [misc]progress:  generating series expansions
* * * * [misc]progress:  [ 1 / 2 ] generating series at (2 2 1)
* [misc]approximate:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in re
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in re
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]approximate:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]approximate:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* * * * [misc]progress:  [ 2 / 2 ] generating series at (2 2)
* [misc]approximate:  Taking taylor expansion of (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) into (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in re
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) into (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in re
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) into (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) into (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))) into 0
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) into (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (- 0 (sqr 0) (+)) (* 2 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (- 0 (sqr 0) (+)) (* 2 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))) into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) into (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]approximate:  Taking taylor expansion of (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into 0
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (- 0 (sqr 0) (+)) (* 2 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (- 0 (sqr 0) (+)) (* 2 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]approximate:  Taking taylor expansion of (sqrt (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* [misc]backup-simplify:  Simplify (/ 0 (* 2 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into 0
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (- 0 (sqr 0) (+)) (* 2 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (- 0 (sqr 0) (+)) (* 2 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* * * [misc]progress:  generating rewritten candidates
* * * * [misc]progress:  [ 1 / 2 ] rewriting at (2 2 1)
* * * * [misc]progress:  [ 2 / 2 ] rewriting at (2 2)
* * * [misc]progress:  simplifying candidates
* * * * [misc]progress:  [ 1 / 28 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))>
* [enter]simplify:  Simplifying (* 0.5 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 6 (9 enodes)
* * [misc]simplify:  iters left: 5 (11 enodes)
* [exit]simplify:  Simplified to (* (sqrt (fma (hypot re im) 2.0 (* re 2.0))) 0.5)
* * * * [misc]progress:  [ 2 / 28 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))))>
* [enter]simplify:  Simplifying (* 0.5 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* * [misc]simplify:  iters left: 6 (12 enodes)
* * [misc]simplify:  iters left: 5 (15 enodes)
* [exit]simplify:  Simplified to (* 0.5 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* * * * [misc]progress:  [ 3 / 28 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))))>
* [enter]simplify:  Simplifying (* 0.5 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))
* * [misc]simplify:  iters left: 6 (13 enodes)
* * [misc]simplify:  iters left: 5 (14 enodes)
* [exit]simplify:  Simplified to (* (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) 0.5)
* * * * [misc]progress:  [ 4 / 28 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))>
* [enter]simplify:  Simplifying (* 0.5 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 6 (9 enodes)
* * [misc]simplify:  iters left: 5 (11 enodes)
* [exit]simplify:  Simplified to (* (sqrt (fma (hypot re im) 2.0 (* re 2.0))) 0.5)
* * * * [misc]progress:  [ 5 / 28 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))))>
* [enter]simplify:  Simplifying (* 0.5 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* * [misc]simplify:  iters left: 6 (12 enodes)
* * [misc]simplify:  iters left: 5 (15 enodes)
* [exit]simplify:  Simplified to (* 0.5 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* * * * [misc]progress:  [ 6 / 28 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))))>
* [enter]simplify:  Simplifying (* 0.5 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))
* * [misc]simplify:  iters left: 6 (13 enodes)
* * [misc]simplify:  iters left: 5 (14 enodes)
* [exit]simplify:  Simplified to (* (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) 0.5)
* * * * [misc]progress:  [ 7 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (log1p (expm1 (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (expm1 (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (expm1 (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (expm1 (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 8 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (expm1 (log1p (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (log1p (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (log1p (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (log1p (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 9 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (+ (* (hypot re im) 2.0) (* 2.0 re)))))>
* [enter]simplify:  Simplifying (* (hypot re im) 2.0)
* * [misc]simplify:  iters left: 3 (5 enodes)
* * [misc]simplify:  iters left: 2 (6 enodes)
* [exit]simplify:  Simplified to (* (hypot re im) 2.0)
* [exit]simplify:  Simplified to (* (hypot re im) 2.0)
* * * * [misc]progress:  [ 10 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1))))>
* * * * [misc]progress:  [ 11 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (exp (log (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (log (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (log (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (log (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 12 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (log (exp (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (exp (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (exp (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (exp (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 13 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (cube (cbrt (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (cbrt (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (cbrt (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (cbrt (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 14 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (cbrt (cube (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (cube (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (10 enodes)
* * [misc]simplify:  iters left: 2 (12 enodes)
* [exit]simplify:  Simplified to (cube (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (cube (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 15 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (sqr (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (sqrt (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (sqrt (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 16 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (* 1 (fma (hypot re im) 2.0 (* 2.0 re))))))>
* * * * [misc]progress:  [ 17 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (log1p (expm1 (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (expm1 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (9 enodes)
* [exit]simplify:  Simplified to (expm1 (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (expm1 (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 18 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (expm1 (log1p (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (log1p (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (9 enodes)
* [exit]simplify:  Simplified to (log1p (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (log1p (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 19 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))>
* * * * [misc]progress:  [ 20 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (sqrt (fma (hypot re im) 2.0 (* 2.0 re))) 1)))>
* * * * [misc]progress:  [ 21 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (exp (log (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (log (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (9 enodes)
* [exit]simplify:  Simplified to (log (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (log (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 22 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (log (exp (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (exp (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (9 enodes)
* [exit]simplify:  Simplified to (exp (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (exp (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 23 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (cube (cbrt (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (cbrt (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (9 enodes)
* [exit]simplify:  Simplified to (cbrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (cbrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 24 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (cbrt (cube (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (cube (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (11 enodes)
* * [misc]simplify:  iters left: 3 (13 enodes)
* [exit]simplify:  Simplified to (* (fma (hypot re im) 2.0 (* re 2.0)) (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (* (fma (hypot re im) 2.0 (* re 2.0)) (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 25 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (* (sqrt 1) (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))))>
* [enter]simplify:  Simplifying (sqrt 1)
* * [misc]simplify:  iters left: 1 (2 enodes)
* [exit]simplify:  Simplified to (sqrt 1)
* [exit]simplify:  Simplified to (sqrt 1)
* [enter]simplify:  Simplifying (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (sqrt (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (sqrt (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 26 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqr (sqrt (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))>
* [enter]simplify:  Simplifying (sqrt (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (9 enodes)
* [exit]simplify:  Simplified to (sqrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (sqrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 27 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (fabs (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))))>
* * * * [misc]progress:  [ 28 / 28 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (* 1 (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))))>
* * * [misc]progress:  adding candidates to table
* * [misc]progress:  iteration 2 / 2
* * * [misc]progress:  picking best candidate
* * * * [misc]pick:  Picked  #<alt-delta (λ (re im) (* 0.5 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))>
* * * [misc]progress:  localizing error
* * * [misc]progress:  generating series expansions
* * * * [misc]progress:  [ 1 / 2 ] generating series at (2 2 1)
* [misc]approximate:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in re
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in re
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]approximate:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]approximate:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* * * * [misc]progress:  [ 2 / 2 ] generating series at (2 2)
* [misc]approximate:  Taking taylor expansion of (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2) in im
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) in im
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re)))) in im
* [misc]taylor:  Taking taylor expansion of 1/2 in im
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot re im) 2.0 (* 2.0 re))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot re im) 2.0 (* 2.0 re))) into (log (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re)))) into (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) into (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2) in re
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) in re
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re)))) in re
* [misc]taylor:  Taking taylor expansion of 1/2 in re
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot re im) 2.0 (* 2.0 re))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in re
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot re im) 2.0 (* 2.0 re))) into (log (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re)))) into (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) into (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2) in re
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) in re
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re)))) in re
* [misc]taylor:  Taking taylor expansion of 1/2 in re
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot re im) 2.0 (* 2.0 re))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in re
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot re im) 2.0 (* 2.0 re))) into (log (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re)))) into (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) into (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2) in im
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) in im
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re)))) in im
* [misc]taylor:  Taking taylor expansion of 1/2 in im
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot re im) 2.0 (* 2.0 re))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot re im) 2.0 (* 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot re im) 2.0 (* 2.0 re)) into (fma (hypot re im) 2.0 (* 2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot re im) 2.0 (* 2.0 re))) into (log (fma (hypot re im) 2.0 (* 2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re)))) into (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) into (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)
* [misc]backup-simplify:  Simplify (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2) into (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)
* [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1)))) 1) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (log (fma (hypot re im) 2.0 (* 2.0 re))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) (+ (* (/ (pow 0 1) 1)))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1)))) 1) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (log (fma (hypot re im) 2.0 (* 2.0 re))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) (+ (* (/ (pow 0 1) 1)))) into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1)))) 2) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (log (fma (hypot re im) 2.0 (* 2.0 re)))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1)))) 2) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (log (fma (hypot re im) 2.0 (* 2.0 re)))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1)))) 6) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (fma (hypot re im) 2.0 (* 2.0 re))))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot re im) 2.0 (* 2.0 re))))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2) into (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)
* [misc]approximate:  Taking taylor expansion of (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) 1/2) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) 1/2) in im
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))))) in im
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))))) in im
* [misc]taylor:  Taking taylor expansion of 1/2 in im
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))) into (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2)
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) 1/2) in re
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))))) in re
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))))) in re
* [misc]taylor:  Taking taylor expansion of 1/2 in re
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))) into (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2)
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) 1/2) in re
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))))) in re
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))))) in re
* [misc]taylor:  Taking taylor expansion of 1/2 in re
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re)))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (* 2.0 (/ 1 re))) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))) into (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2)
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2) in im
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) in im
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))) in im
* [misc]taylor:  Taking taylor expansion of 1/2 in im
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) into (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) into (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))) into (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2)
* [misc]backup-simplify:  Simplify (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2) into (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2)
* [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1)))) 1) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) (+ (* (/ (pow 0 1) 1)))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1)))) 1) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) (+ (* (/ (pow 0 1) 1)))) into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1)))) 2) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1)))) 2) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1)))) 6) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2) into (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2)
* [misc]approximate:  Taking taylor expansion of (pow (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) 1/2) in (re im) around 0
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) 1/2) in im
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))))) in im
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))))) in im
* [misc]taylor:  Taking taylor expansion of 1/2 in im
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))) into (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2)
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) 1/2) in re
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))))) in re
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))))) in re
* [misc]taylor:  Taking taylor expansion of 1/2 in re
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))) into (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2)
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) 1/2) in re
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))))) in re
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))))) in re
* [misc]taylor:  Taking taylor expansion of 1/2 in re
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re))))) in re
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) in re
* [misc]backup-simplify:  Simplify (fma (hypot (/ 1 (- re)) (/ 1 (- im))) 2.0 (* 2.0 (/ 1 (- re)))) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))) into (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2)
* [misc]taylor:  Taking taylor expansion of (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2) in im
* [misc]taylor:  Taking taylor expansion of (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) in im
* [misc]taylor:  Taking taylor expansion of (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))) in im
* [misc]taylor:  Taking taylor expansion of 1/2 in im
* [misc]backup-simplify:  Simplify 1/2 into 1/2
* [misc]taylor:  Taking taylor expansion of (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) in im
* [misc]taylor:  Taking taylor expansion of (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) in im
* [misc]backup-simplify:  Simplify (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) into (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))
* [misc]backup-simplify:  Simplify (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) into (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))
* [misc]backup-simplify:  Simplify (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))) into (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))
* [misc]backup-simplify:  Simplify (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2)
* [misc]backup-simplify:  Simplify (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2) into (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2)
* [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1)))) 1) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) (+ (* (/ (pow 0 1) 1)))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1)))) 1) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (* 0 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) (+ (* (/ (pow 0 1) 1)))) into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1)))) 2) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1)))) 2) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1)))) 6) into 0
* [misc]backup-simplify:  Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))))) into 0
* [misc]backup-simplify:  Simplify (* (exp (* 1/2 (log (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
* [misc]taylor:  Taking taylor expansion of 0 in im
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify 0 into 0
* [misc]backup-simplify:  Simplify (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2) into (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2)
* * * [misc]progress:  generating rewritten candidates
* * * * [misc]progress:  [ 1 / 2 ] rewriting at (2 2 1)
* * * * [misc]progress:  [ 2 / 2 ] rewriting at (2 2)
* * * [misc]progress:  simplifying candidates
* * * * [misc]progress:  [ 1 / 29 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))>
* [enter]simplify:  Simplifying (* 0.5 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 6 (10 enodes)
* * [misc]simplify:  iters left: 5 (13 enodes)
* [exit]simplify:  Simplified to (* 0.5 (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 2 / 29 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2)))>
* [enter]simplify:  Simplifying (* 0.5 (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 6 (13 enodes)
* * [misc]simplify:  iters left: 5 (17 enodes)
* [exit]simplify:  Simplified to (* (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) 0.5)
* * * * [misc]progress:  [ 3 / 29 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2)))>
* [enter]simplify:  Simplifying (* 0.5 (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2))
* * [misc]simplify:  iters left: 6 (14 enodes)
* * [misc]simplify:  iters left: 5 (16 enodes)
* [exit]simplify:  Simplified to (* 0.5 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))
* * * * [misc]progress:  [ 4 / 29 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))>
* [enter]simplify:  Simplifying (* 0.5 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 6 (10 enodes)
* * [misc]simplify:  iters left: 5 (13 enodes)
* [exit]simplify:  Simplified to (* 0.5 (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 5 / 29 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2)))>
* [enter]simplify:  Simplifying (* 0.5 (pow (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 6 (13 enodes)
* * [misc]simplify:  iters left: 5 (17 enodes)
* [exit]simplify:  Simplified to (* (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))) 0.5)
* * * * [misc]progress:  [ 6 / 29 ] simplifiying candidate #<alt-event (λ (re im) (* 0.5 (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2)))>
* [enter]simplify:  Simplifying (* 0.5 (pow (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)) 1/2))
* * [misc]simplify:  iters left: 6 (14 enodes)
* * [misc]simplify:  iters left: 5 (16 enodes)
* [exit]simplify:  Simplified to (* 0.5 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))
* * * * [misc]progress:  [ 7 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (log1p (expm1 (fma (hypot re im) 2.0 (* 2.0 re)))) 1/2)))>
* [enter]simplify:  Simplifying (expm1 (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (expm1 (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (expm1 (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 8 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (expm1 (log1p (fma (hypot re im) 2.0 (* 2.0 re)))) 1/2)))>
* [enter]simplify:  Simplifying (log1p (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (log1p (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (log1p (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 9 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (+ (* (hypot re im) 2.0) (* 2.0 re)) 1/2)))>
* [enter]simplify:  Simplifying (* (hypot re im) 2.0)
* * [misc]simplify:  iters left: 3 (5 enodes)
* * [misc]simplify:  iters left: 2 (6 enodes)
* [exit]simplify:  Simplified to (* (hypot re im) 2.0)
* [exit]simplify:  Simplified to (* (hypot re im) 2.0)
* * * * [misc]progress:  [ 10 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1) 1/2)))>
* * * * [misc]progress:  [ 11 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (exp (log (fma (hypot re im) 2.0 (* 2.0 re)))) 1/2)))>
* [enter]simplify:  Simplifying (log (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (log (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (log (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 12 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (log (exp (fma (hypot re im) 2.0 (* 2.0 re)))) 1/2)))>
* [enter]simplify:  Simplifying (exp (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (exp (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (exp (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 13 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (cube (cbrt (fma (hypot re im) 2.0 (* 2.0 re)))) 1/2)))>
* [enter]simplify:  Simplifying (cbrt (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (cbrt (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (cbrt (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 14 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (cbrt (cube (fma (hypot re im) 2.0 (* 2.0 re)))) 1/2)))>
* [enter]simplify:  Simplifying (cube (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (10 enodes)
* * [misc]simplify:  iters left: 2 (12 enodes)
* [exit]simplify:  Simplified to (cube (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (cube (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 15 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (sqr (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))) 1/2)))>
* [enter]simplify:  Simplifying (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (sqrt (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (sqrt (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 16 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (* 1 (fma (hypot re im) 2.0 (* 2.0 re))) 1/2)))>
* * * * [misc]progress:  [ 17 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (log1p (expm1 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))))>
* [enter]simplify:  Simplifying (expm1 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 5 (9 enodes)
* * [misc]simplify:  iters left: 4 (11 enodes)
* [exit]simplify:  Simplified to (expm1 (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (expm1 (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 18 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (expm1 (log1p (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))))>
* [enter]simplify:  Simplifying (log1p (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 5 (9 enodes)
* * [misc]simplify:  iters left: 4 (11 enodes)
* [exit]simplify:  Simplified to (log1p (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (log1p (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 19 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (exp (* (log (fma (hypot re im) 2.0 (* 2.0 re))) 1/2))))>
* [enter]simplify:  Simplifying (* (log (fma (hypot re im) 2.0 (* 2.0 re))) 1/2)
* * [misc]simplify:  iters left: 6 (9 enodes)
* * [misc]simplify:  iters left: 5 (11 enodes)
* [exit]simplify:  Simplified to (* (log (fma (hypot re im) 2.0 (* re 2.0))) 1/2)
* [exit]simplify:  Simplified to (* (log (fma (hypot re im) 2.0 (* re 2.0))) 1/2)
* * * * [misc]progress:  [ 20 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (exp (* (log (fma (hypot re im) 2.0 (* 2.0 re))) 1/2))))>
* [enter]simplify:  Simplifying (* (log (fma (hypot re im) 2.0 (* 2.0 re))) 1/2)
* * [misc]simplify:  iters left: 6 (9 enodes)
* * [misc]simplify:  iters left: 5 (11 enodes)
* [exit]simplify:  Simplified to (* (log (fma (hypot re im) 2.0 (* re 2.0))) 1/2)
* [exit]simplify:  Simplified to (* (log (fma (hypot re im) 2.0 (* re 2.0))) 1/2)
* * * * [misc]progress:  [ 21 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (* (pow 1 1/2) (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))))>
* [enter]simplify:  Simplifying (pow 1 1/2)
* * [misc]simplify:  iters left: 1 (3 enodes)
* [exit]simplify:  Simplified to (sqrt 1)
* [exit]simplify:  Simplified to (sqrt 1)
* [enter]simplify:  Simplifying (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)
* * [misc]simplify:  iters left: 4 (8 enodes)
* * [misc]simplify:  iters left: 3 (10 enodes)
* [exit]simplify:  Simplified to (sqrt (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (sqrt (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 22 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))>
* * * * [misc]progress:  [ 23 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (pow (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2) 1)))>
* * * * [misc]progress:  [ 24 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (exp (log (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))))>
* [enter]simplify:  Simplifying (log (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 5 (9 enodes)
* * [misc]simplify:  iters left: 4 (13 enodes)
* * [misc]simplify:  iters left: 3 (14 enodes)
* [exit]simplify:  Simplified to (log (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (log (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 25 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (log (exp (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))))>
* [enter]simplify:  Simplifying (exp (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 5 (9 enodes)
* * [misc]simplify:  iters left: 4 (11 enodes)
* [exit]simplify:  Simplified to (exp (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (exp (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 26 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (cube (cbrt (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))))>
* [enter]simplify:  Simplifying (cbrt (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 5 (9 enodes)
* * [misc]simplify:  iters left: 4 (11 enodes)
* [exit]simplify:  Simplified to (cbrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (cbrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 27 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (cbrt (cube (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))))>
* [enter]simplify:  Simplifying (cube (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 5 (9 enodes)
* * [misc]simplify:  iters left: 4 (13 enodes)
* * [misc]simplify:  iters left: 3 (15 enodes)
* [exit]simplify:  Simplified to (* (sqrt (fma (hypot re im) 2.0 (* re 2.0))) (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (* (sqrt (fma (hypot re im) 2.0 (* re 2.0))) (fma (hypot re im) 2.0 (* re 2.0)))
* * * * [misc]progress:  [ 28 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (sqr (sqrt (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))))>
* [enter]simplify:  Simplifying (sqrt (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))
* * [misc]simplify:  iters left: 5 (9 enodes)
* * [misc]simplify:  iters left: 4 (11 enodes)
* [exit]simplify:  Simplified to (sqrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (sqrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* * * * [misc]progress:  [ 29 / 29 ] simplifiying candidate #<alt-delta (λ (re im) (* 0.5 (* 1 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2))))>
* * * [misc]progress:  adding candidates to table
* [misc]progress:  [Phase 3 of 3] Extracting.
* * [misc]regime-changes:  Finding splitpoints for: (#<alt-event (λ (re im) (* 0.5 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re)))))> #<alt-delta (λ (re im) (* 0.5 (expm1 (log1p (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))> #<alt-event (λ (re im) (* 0.5 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re)))))> #<alt-delta (λ (re im) (* 0.5 (sqr (sqrt (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))> #<alt-delta (λ (re im) (* 0.5 (sqrt (exp (log (fma (hypot re im) 2.0 (* 2.0 re)))))))> #<alt-delta (λ (re im) (* 0.5 (cube (cbrt (sqrt (fma (hypot re im) 2.0 (* 2.0 re)))))))> #<alt-delta (λ (re im) (* 0.5 (sqrt (cube (cbrt (fma (hypot re im) 2.0 (* 2.0 re)))))))> #<alt-delta (λ (re im) (* 0.5 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))>)
* [misc]regimes:  Found splitpoints: (#s(sp 0 re +inf.0)) , with alts (#<alt-delta (λ (re im) (* 0.5 (pow (fma (hypot re im) 2.0 (* 2.0 re)) 1/2)))>)
* [enter]simplify:  Simplifying (* 0.5 (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))))
* * [misc]simplify:  iters left: 6 (13 enodes)
* * [misc]simplify:  iters left: 5 (14 enodes)
* [exit]simplify:  Simplified to (* (sqrt (fma (hypot (/ -1 re) (/ -1 im)) 2.0 (/ -2.0 re))) 0.5)
* [enter]simplify:  Simplifying (log1p (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (9 enodes)
* [exit]simplify:  Simplified to (log1p (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (log1p (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [enter]simplify:  Simplifying (* 0.5 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* * [misc]simplify:  iters left: 6 (12 enodes)
* * [misc]simplify:  iters left: 5 (15 enodes)
* [exit]simplify:  Simplified to (* 0.5 (sqrt (fma (hypot (/ 1 re) (/ 1 im)) 2.0 (/ 2.0 re))))
* [enter]simplify:  Simplifying (sqrt (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (9 enodes)
* [exit]simplify:  Simplified to (sqrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (sqrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [enter]simplify:  Simplifying (log (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (log (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (log (fma (hypot re im) 2.0 (* re 2.0)))
* [enter]simplify:  Simplifying (cbrt (sqrt (fma (hypot re im) 2.0 (* 2.0 re))))
* * [misc]simplify:  iters left: 5 (8 enodes)
* * [misc]simplify:  iters left: 4 (9 enodes)
* [exit]simplify:  Simplified to (cbrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [exit]simplify:  Simplified to (cbrt (sqrt (fma (hypot re im) 2.0 (* re 2.0))))
* [enter]simplify:  Simplifying (cbrt (fma (hypot re im) 2.0 (* 2.0 re)))
* * [misc]simplify:  iters left: 4 (7 enodes)
* * [misc]simplify:  iters left: 3 (8 enodes)
* [exit]simplify:  Simplified to (cbrt (fma (hypot re im) 2.0 (* re 2.0)))
* [exit]simplify:  Simplified to (cbrt (fma (hypot re im) 2.0 (* re 2.0)))