13.298 * [progress]: [Phase 1 of 3] Setting up.
0.001 * * * [progress]: [1/2] Preparing points
0.034 * * * [progress]: [2/2] Setting up program.
0.036 * [progress]: [Phase 2 of 3] Improving.
0.036 * [simplify]: Simplifying using  #<procedure:simplify-batch-egg> :
   (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k)))
0.039 * * [simplify]: iteration  0 :  24  enodes  (cost  7 )
0.040 * * [simplify]: iteration  1 :  48  enodes  (cost  7 )
0.042 * * [simplify]: iteration  2 :  96  enodes  (cost  6 )
0.044 * * [simplify]: iteration  3 :  256  enodes  (cost  6 )
0.049 * * [simplify]: iteration  4 :  891  enodes  (cost  6 )
0.067 * * [simplify]: iteration  5 :  3963  enodes  (cost  6 )
0.139 * * [simplify]: iteration  6 :  5002  enodes  (cost  6 )
0.140 * [simplify]: Simplified to:
   (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
0.143 * * [progress]: iteration 1 / 4
0.143 * * * [progress]: picking best candidate
0.146 * * * * [pick]: Picked  #<alt (λ (a k m) (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))>
0.146 * * * [progress]: localizing error
0.157 * * * [progress]: generating rewritten candidates
0.157 * * * * [progress]: [ 1 / 3 ] rewriting at (2)
0.190 * * * * [progress]: [ 2 / 3 ] rewriting at (2 1)
0.201 * * * * [progress]: [ 3 / 3 ] rewriting at (2 1 2 1)
0.216 * * * [progress]: generating series expansions
0.216 * * * * [progress]: [ 1 / 3 ] generating series at (2)
0.216 * [approximate]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in (k m a) around 0
0.216 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in a
0.216 * [taylor]: Taking taylor expansion of (* a (pow k m)) in a
0.216 * [taylor]: Taking taylor expansion of a in a
0.216 * [taylor]: Taking taylor expansion of (pow k m) in a
0.216 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in a
0.216 * [taylor]: Taking taylor expansion of (* m (log k)) in a
0.216 * [taylor]: Taking taylor expansion of m in a
0.216 * [taylor]: Taking taylor expansion of (log k) in a
0.216 * [taylor]: Taking taylor expansion of k in a
0.216 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in a
0.216 * [taylor]: Taking taylor expansion of (* 10.0 k) in a
0.216 * [taylor]: Taking taylor expansion of 10.0 in a
0.216 * [taylor]: Taking taylor expansion of k in a
0.216 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in a
0.216 * [taylor]: Taking taylor expansion of (pow k 2) in a
0.216 * [taylor]: Taking taylor expansion of k in a
0.216 * [taylor]: Taking taylor expansion of 1.0 in a
0.219 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in m
0.219 * [taylor]: Taking taylor expansion of (* a (pow k m)) in m
0.219 * [taylor]: Taking taylor expansion of a in m
0.219 * [taylor]: Taking taylor expansion of (pow k m) in m
0.219 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
0.219 * [taylor]: Taking taylor expansion of (* m (log k)) in m
0.219 * [taylor]: Taking taylor expansion of m in m
0.219 * [taylor]: Taking taylor expansion of (log k) in m
0.219 * [taylor]: Taking taylor expansion of k in m
0.220 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in m
0.220 * [taylor]: Taking taylor expansion of (* 10.0 k) in m
0.220 * [taylor]: Taking taylor expansion of 10.0 in m
0.220 * [taylor]: Taking taylor expansion of k in m
0.220 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in m
0.220 * [taylor]: Taking taylor expansion of (pow k 2) in m
0.220 * [taylor]: Taking taylor expansion of k in m
0.220 * [taylor]: Taking taylor expansion of 1.0 in m
0.220 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in k
0.220 * [taylor]: Taking taylor expansion of (* a (pow k m)) in k
0.220 * [taylor]: Taking taylor expansion of a in k
0.220 * [taylor]: Taking taylor expansion of (pow k m) in k
0.220 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in k
0.220 * [taylor]: Taking taylor expansion of (* m (log k)) in k
0.220 * [taylor]: Taking taylor expansion of m in k
0.220 * [taylor]: Taking taylor expansion of (log k) in k
0.220 * [taylor]: Taking taylor expansion of k in k
0.221 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
0.221 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
0.221 * [taylor]: Taking taylor expansion of 10.0 in k
0.221 * [taylor]: Taking taylor expansion of k in k
0.221 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
0.221 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.221 * [taylor]: Taking taylor expansion of k in k
0.221 * [taylor]: Taking taylor expansion of 1.0 in k
0.222 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in k
0.222 * [taylor]: Taking taylor expansion of (* a (pow k m)) in k
0.222 * [taylor]: Taking taylor expansion of a in k
0.222 * [taylor]: Taking taylor expansion of (pow k m) in k
0.222 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in k
0.222 * [taylor]: Taking taylor expansion of (* m (log k)) in k
0.222 * [taylor]: Taking taylor expansion of m in k
0.222 * [taylor]: Taking taylor expansion of (log k) in k
0.222 * [taylor]: Taking taylor expansion of k in k
0.223 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
0.223 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
0.223 * [taylor]: Taking taylor expansion of 10.0 in k
0.223 * [taylor]: Taking taylor expansion of k in k
0.223 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
0.223 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.223 * [taylor]: Taking taylor expansion of k in k
0.223 * [taylor]: Taking taylor expansion of 1.0 in k
0.224 * [taylor]: Taking taylor expansion of (* 1.0 (* a (pow k m))) in m
0.224 * [taylor]: Taking taylor expansion of 1.0 in m
0.224 * [taylor]: Taking taylor expansion of (* a (pow k m)) in m
0.224 * [taylor]: Taking taylor expansion of a in m
0.224 * [taylor]: Taking taylor expansion of (pow k m) in m
0.224 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
0.224 * [taylor]: Taking taylor expansion of (* m (log k)) in m
0.224 * [taylor]: Taking taylor expansion of m in m
0.224 * [taylor]: Taking taylor expansion of (log k) in m
0.224 * [taylor]: Taking taylor expansion of k in m
0.225 * [taylor]: Taking taylor expansion of (* 1.0 a) in a
0.225 * [taylor]: Taking taylor expansion of 1.0 in a
0.225 * [taylor]: Taking taylor expansion of a in a
0.230 * [taylor]: Taking taylor expansion of (- (* 10.0 (* a (pow k m)))) in m
0.230 * [taylor]: Taking taylor expansion of (* 10.0 (* a (pow k m))) in m
0.230 * [taylor]: Taking taylor expansion of 10.0 in m
0.230 * [taylor]: Taking taylor expansion of (* a (pow k m)) in m
0.230 * [taylor]: Taking taylor expansion of a in m
0.230 * [taylor]: Taking taylor expansion of (pow k m) in m
0.230 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
0.230 * [taylor]: Taking taylor expansion of (* m (log k)) in m
0.230 * [taylor]: Taking taylor expansion of m in m
0.230 * [taylor]: Taking taylor expansion of (log k) in m
0.230 * [taylor]: Taking taylor expansion of k in m
0.231 * [taylor]: Taking taylor expansion of (- (* 10.0 a)) in a
0.231 * [taylor]: Taking taylor expansion of (* 10.0 a) in a
0.231 * [taylor]: Taking taylor expansion of 10.0 in a
0.231 * [taylor]: Taking taylor expansion of a in a
0.233 * [taylor]: Taking taylor expansion of (* 1.0 (* a (log k))) in a
0.233 * [taylor]: Taking taylor expansion of 1.0 in a
0.233 * [taylor]: Taking taylor expansion of (* a (log k)) in a
0.233 * [taylor]: Taking taylor expansion of a in a
0.233 * [taylor]: Taking taylor expansion of (log k) in a
0.233 * [taylor]: Taking taylor expansion of k in a
0.235 * [approximate]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in (k m a) around 0
0.235 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in a
0.235 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in a
0.235 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in a
0.235 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in a
0.235 * [taylor]: Taking taylor expansion of (/ 1 m) in a
0.235 * [taylor]: Taking taylor expansion of m in a
0.235 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in a
0.235 * [taylor]: Taking taylor expansion of (/ 1 k) in a
0.235 * [taylor]: Taking taylor expansion of k in a
0.235 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in a
0.235 * [taylor]: Taking taylor expansion of a in a
0.235 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in a
0.235 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
0.235 * [taylor]: Taking taylor expansion of (pow k 2) in a
0.235 * [taylor]: Taking taylor expansion of k in a
0.236 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in a
0.236 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
0.236 * [taylor]: Taking taylor expansion of 10.0 in a
0.236 * [taylor]: Taking taylor expansion of (/ 1 k) in a
0.236 * [taylor]: Taking taylor expansion of k in a
0.236 * [taylor]: Taking taylor expansion of 1.0 in a
0.238 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in m
0.238 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in m
0.238 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in m
0.238 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in m
0.238 * [taylor]: Taking taylor expansion of (/ 1 m) in m
0.238 * [taylor]: Taking taylor expansion of m in m
0.238 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in m
0.238 * [taylor]: Taking taylor expansion of (/ 1 k) in m
0.238 * [taylor]: Taking taylor expansion of k in m
0.238 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in m
0.238 * [taylor]: Taking taylor expansion of a in m
0.238 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in m
0.238 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in m
0.238 * [taylor]: Taking taylor expansion of (pow k 2) in m
0.238 * [taylor]: Taking taylor expansion of k in m
0.239 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in m
0.239 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in m
0.239 * [taylor]: Taking taylor expansion of 10.0 in m
0.239 * [taylor]: Taking taylor expansion of (/ 1 k) in m
0.239 * [taylor]: Taking taylor expansion of k in m
0.239 * [taylor]: Taking taylor expansion of 1.0 in m
0.239 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in k
0.239 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in k
0.239 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in k
0.239 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in k
0.239 * [taylor]: Taking taylor expansion of (/ 1 m) in k
0.239 * [taylor]: Taking taylor expansion of m in k
0.239 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in k
0.239 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.239 * [taylor]: Taking taylor expansion of k in k
0.240 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
0.240 * [taylor]: Taking taylor expansion of a in k
0.240 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
0.240 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.240 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.240 * [taylor]: Taking taylor expansion of k in k
0.241 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
0.241 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.241 * [taylor]: Taking taylor expansion of 10.0 in k
0.241 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.241 * [taylor]: Taking taylor expansion of k in k
0.241 * [taylor]: Taking taylor expansion of 1.0 in k
0.242 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in k
0.242 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in k
0.242 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in k
0.242 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in k
0.242 * [taylor]: Taking taylor expansion of (/ 1 m) in k
0.242 * [taylor]: Taking taylor expansion of m in k
0.242 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in k
0.242 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.242 * [taylor]: Taking taylor expansion of k in k
0.243 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
0.243 * [taylor]: Taking taylor expansion of a in k
0.243 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
0.243 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.243 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.243 * [taylor]: Taking taylor expansion of k in k
0.243 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
0.243 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.243 * [taylor]: Taking taylor expansion of 10.0 in k
0.243 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.243 * [taylor]: Taking taylor expansion of k in k
0.244 * [taylor]: Taking taylor expansion of 1.0 in k
0.244 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log k) m))) a) in m
0.244 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
0.244 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
0.244 * [taylor]: Taking taylor expansion of -1 in m
0.244 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
0.244 * [taylor]: Taking taylor expansion of (log k) in m
0.244 * [taylor]: Taking taylor expansion of k in m
0.244 * [taylor]: Taking taylor expansion of m in m
0.244 * [taylor]: Taking taylor expansion of a in m
0.245 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log k) m))) a) in a
0.245 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in a
0.245 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in a
0.245 * [taylor]: Taking taylor expansion of -1 in a
0.245 * [taylor]: Taking taylor expansion of (/ (log k) m) in a
0.245 * [taylor]: Taking taylor expansion of (log k) in a
0.245 * [taylor]: Taking taylor expansion of k in a
0.245 * [taylor]: Taking taylor expansion of m in a
0.245 * [taylor]: Taking taylor expansion of a in a
0.249 * [taylor]: Taking taylor expansion of (- (* 10.0 (/ (exp (* -1 (/ (log k) m))) a))) in m
0.249 * [taylor]: Taking taylor expansion of (* 10.0 (/ (exp (* -1 (/ (log k) m))) a)) in m
0.249 * [taylor]: Taking taylor expansion of 10.0 in m
0.249 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log k) m))) a) in m
0.249 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
0.249 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
0.249 * [taylor]: Taking taylor expansion of -1 in m
0.249 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
0.249 * [taylor]: Taking taylor expansion of (log k) in m
0.249 * [taylor]: Taking taylor expansion of k in m
0.250 * [taylor]: Taking taylor expansion of m in m
0.250 * [taylor]: Taking taylor expansion of a in m
0.250 * [taylor]: Taking taylor expansion of (- (* 10.0 (/ (exp (* -1 (/ (log k) m))) a))) in a
0.250 * [taylor]: Taking taylor expansion of (* 10.0 (/ (exp (* -1 (/ (log k) m))) a)) in a
0.250 * [taylor]: Taking taylor expansion of 10.0 in a
0.250 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log k) m))) a) in a
0.250 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in a
0.250 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in a
0.250 * [taylor]: Taking taylor expansion of -1 in a
0.250 * [taylor]: Taking taylor expansion of (/ (log k) m) in a
0.250 * [taylor]: Taking taylor expansion of (log k) in a
0.250 * [taylor]: Taking taylor expansion of k in a
0.250 * [taylor]: Taking taylor expansion of m in a
0.250 * [taylor]: Taking taylor expansion of a in a
0.251 * [taylor]: Taking taylor expansion of 0 in a
0.260 * [taylor]: Taking taylor expansion of (* 99.0 (/ (exp (* -1 (/ (log k) m))) a)) in m
0.260 * [taylor]: Taking taylor expansion of 99.0 in m
0.260 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log k) m))) a) in m
0.260 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
0.260 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
0.260 * [taylor]: Taking taylor expansion of -1 in m
0.260 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
0.260 * [taylor]: Taking taylor expansion of (log k) in m
0.260 * [taylor]: Taking taylor expansion of k in m
0.260 * [taylor]: Taking taylor expansion of m in m
0.260 * [taylor]: Taking taylor expansion of a in m
0.260 * [taylor]: Taking taylor expansion of (* 99.0 (/ (exp (* -1 (/ (log k) m))) a)) in a
0.260 * [taylor]: Taking taylor expansion of 99.0 in a
0.260 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log k) m))) a) in a
0.260 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in a
0.260 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in a
0.260 * [taylor]: Taking taylor expansion of -1 in a
0.260 * [taylor]: Taking taylor expansion of (/ (log k) m) in a
0.260 * [taylor]: Taking taylor expansion of (log k) in a
0.260 * [taylor]: Taking taylor expansion of k in a
0.261 * [taylor]: Taking taylor expansion of m in a
0.261 * [taylor]: Taking taylor expansion of a in a
0.262 * [approximate]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in (k m a) around 0
0.262 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in a
0.262 * [taylor]: Taking taylor expansion of -1 in a
0.262 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in a
0.262 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in a
0.262 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in a
0.262 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in a
0.262 * [taylor]: Taking taylor expansion of (/ -1 m) in a
0.262 * [taylor]: Taking taylor expansion of -1 in a
0.262 * [taylor]: Taking taylor expansion of m in a
0.262 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in a
0.262 * [taylor]: Taking taylor expansion of (/ -1 k) in a
0.262 * [taylor]: Taking taylor expansion of -1 in a
0.262 * [taylor]: Taking taylor expansion of k in a
0.263 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in a
0.263 * [taylor]: Taking taylor expansion of a in a
0.263 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in a
0.263 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in a
0.263 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
0.263 * [taylor]: Taking taylor expansion of (pow k 2) in a
0.263 * [taylor]: Taking taylor expansion of k in a
0.263 * [taylor]: Taking taylor expansion of 1.0 in a
0.263 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
0.263 * [taylor]: Taking taylor expansion of 10.0 in a
0.263 * [taylor]: Taking taylor expansion of (/ 1 k) in a
0.263 * [taylor]: Taking taylor expansion of k in a
0.265 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in m
0.265 * [taylor]: Taking taylor expansion of -1 in m
0.265 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in m
0.265 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in m
0.265 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in m
0.265 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in m
0.265 * [taylor]: Taking taylor expansion of (/ -1 m) in m
0.265 * [taylor]: Taking taylor expansion of -1 in m
0.265 * [taylor]: Taking taylor expansion of m in m
0.266 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in m
0.266 * [taylor]: Taking taylor expansion of (/ -1 k) in m
0.266 * [taylor]: Taking taylor expansion of -1 in m
0.266 * [taylor]: Taking taylor expansion of k in m
0.266 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in m
0.266 * [taylor]: Taking taylor expansion of a in m
0.266 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in m
0.266 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in m
0.266 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in m
0.266 * [taylor]: Taking taylor expansion of (pow k 2) in m
0.266 * [taylor]: Taking taylor expansion of k in m
0.266 * [taylor]: Taking taylor expansion of 1.0 in m
0.266 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in m
0.266 * [taylor]: Taking taylor expansion of 10.0 in m
0.266 * [taylor]: Taking taylor expansion of (/ 1 k) in m
0.266 * [taylor]: Taking taylor expansion of k in m
0.267 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in k
0.267 * [taylor]: Taking taylor expansion of -1 in k
0.267 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in k
0.267 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in k
0.267 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in k
0.267 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in k
0.267 * [taylor]: Taking taylor expansion of (/ -1 m) in k
0.267 * [taylor]: Taking taylor expansion of -1 in k
0.267 * [taylor]: Taking taylor expansion of m in k
0.267 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in k
0.267 * [taylor]: Taking taylor expansion of (/ -1 k) in k
0.267 * [taylor]: Taking taylor expansion of -1 in k
0.267 * [taylor]: Taking taylor expansion of k in k
0.269 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
0.269 * [taylor]: Taking taylor expansion of a in k
0.269 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
0.269 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
0.269 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.269 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.269 * [taylor]: Taking taylor expansion of k in k
0.269 * [taylor]: Taking taylor expansion of 1.0 in k
0.269 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.270 * [taylor]: Taking taylor expansion of 10.0 in k
0.270 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.270 * [taylor]: Taking taylor expansion of k in k
0.271 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in k
0.271 * [taylor]: Taking taylor expansion of -1 in k
0.271 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in k
0.271 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in k
0.271 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in k
0.271 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in k
0.271 * [taylor]: Taking taylor expansion of (/ -1 m) in k
0.271 * [taylor]: Taking taylor expansion of -1 in k
0.271 * [taylor]: Taking taylor expansion of m in k
0.271 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in k
0.271 * [taylor]: Taking taylor expansion of (/ -1 k) in k
0.271 * [taylor]: Taking taylor expansion of -1 in k
0.271 * [taylor]: Taking taylor expansion of k in k
0.273 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
0.273 * [taylor]: Taking taylor expansion of a in k
0.273 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
0.273 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
0.273 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.273 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.273 * [taylor]: Taking taylor expansion of k in k
0.273 * [taylor]: Taking taylor expansion of 1.0 in k
0.273 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.273 * [taylor]: Taking taylor expansion of 10.0 in k
0.273 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.273 * [taylor]: Taking taylor expansion of k in k
0.275 * [taylor]: Taking taylor expansion of (* -1 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a)) in m
0.275 * [taylor]: Taking taylor expansion of -1 in m
0.275 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a) in m
0.275 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
0.275 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
0.275 * [taylor]: Taking taylor expansion of -1 in m
0.275 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
0.275 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
0.275 * [taylor]: Taking taylor expansion of (log -1) in m
0.275 * [taylor]: Taking taylor expansion of -1 in m
0.275 * [taylor]: Taking taylor expansion of (log k) in m
0.275 * [taylor]: Taking taylor expansion of k in m
0.275 * [taylor]: Taking taylor expansion of m in m
0.277 * [taylor]: Taking taylor expansion of a in m
0.281 * [taylor]: Taking taylor expansion of (* -1 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a)) in a
0.281 * [taylor]: Taking taylor expansion of -1 in a
0.281 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a) in a
0.281 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in a
0.281 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in a
0.281 * [taylor]: Taking taylor expansion of -1 in a
0.281 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in a
0.281 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in a
0.281 * [taylor]: Taking taylor expansion of (log -1) in a
0.281 * [taylor]: Taking taylor expansion of -1 in a
0.281 * [taylor]: Taking taylor expansion of (log k) in a
0.281 * [taylor]: Taking taylor expansion of k in a
0.281 * [taylor]: Taking taylor expansion of m in a
0.282 * [taylor]: Taking taylor expansion of a in a
0.290 * [taylor]: Taking taylor expansion of (- (* 10.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a))) in m
0.290 * [taylor]: Taking taylor expansion of (* 10.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a)) in m
0.290 * [taylor]: Taking taylor expansion of 10.0 in m
0.290 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a) in m
0.290 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
0.290 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
0.290 * [taylor]: Taking taylor expansion of -1 in m
0.290 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
0.290 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
0.290 * [taylor]: Taking taylor expansion of (log -1) in m
0.290 * [taylor]: Taking taylor expansion of -1 in m
0.291 * [taylor]: Taking taylor expansion of (log k) in m
0.291 * [taylor]: Taking taylor expansion of k in m
0.291 * [taylor]: Taking taylor expansion of m in m
0.292 * [taylor]: Taking taylor expansion of a in m
0.293 * [taylor]: Taking taylor expansion of (- (* 10.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a))) in a
0.293 * [taylor]: Taking taylor expansion of (* 10.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a)) in a
0.293 * [taylor]: Taking taylor expansion of 10.0 in a
0.293 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a) in a
0.293 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in a
0.293 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in a
0.293 * [taylor]: Taking taylor expansion of -1 in a
0.293 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in a
0.293 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in a
0.293 * [taylor]: Taking taylor expansion of (log -1) in a
0.293 * [taylor]: Taking taylor expansion of -1 in a
0.294 * [taylor]: Taking taylor expansion of (log k) in a
0.294 * [taylor]: Taking taylor expansion of k in a
0.294 * [taylor]: Taking taylor expansion of m in a
0.295 * [taylor]: Taking taylor expansion of a in a
0.298 * [taylor]: Taking taylor expansion of 0 in a
0.312 * [taylor]: Taking taylor expansion of (- (* 99.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a))) in m
0.312 * [taylor]: Taking taylor expansion of (* 99.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a)) in m
0.312 * [taylor]: Taking taylor expansion of 99.0 in m
0.312 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a) in m
0.312 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
0.312 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
0.312 * [taylor]: Taking taylor expansion of -1 in m
0.312 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
0.312 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
0.312 * [taylor]: Taking taylor expansion of (log -1) in m
0.312 * [taylor]: Taking taylor expansion of -1 in m
0.313 * [taylor]: Taking taylor expansion of (log k) in m
0.313 * [taylor]: Taking taylor expansion of k in m
0.313 * [taylor]: Taking taylor expansion of m in m
0.314 * [taylor]: Taking taylor expansion of a in m
0.315 * [taylor]: Taking taylor expansion of (- (* 99.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a))) in a
0.315 * [taylor]: Taking taylor expansion of (* 99.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a)) in a
0.315 * [taylor]: Taking taylor expansion of 99.0 in a
0.315 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a) in a
0.315 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in a
0.315 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in a
0.315 * [taylor]: Taking taylor expansion of -1 in a
0.315 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in a
0.315 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in a
0.315 * [taylor]: Taking taylor expansion of (log -1) in a
0.315 * [taylor]: Taking taylor expansion of -1 in a
0.316 * [taylor]: Taking taylor expansion of (log k) in a
0.316 * [taylor]: Taking taylor expansion of k in a
0.316 * [taylor]: Taking taylor expansion of m in a
0.317 * [taylor]: Taking taylor expansion of a in a
0.320 * * * * [progress]: [ 2 / 3 ] generating series at (2 1)
0.320 * [approximate]: Taking taylor expansion of (/ (pow k m) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in (k m) around 0
0.320 * [taylor]: Taking taylor expansion of (/ (pow k m) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in m
0.321 * [taylor]: Taking taylor expansion of (pow k m) in m
0.321 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
0.321 * [taylor]: Taking taylor expansion of (* m (log k)) in m
0.321 * [taylor]: Taking taylor expansion of m in m
0.321 * [taylor]: Taking taylor expansion of (log k) in m
0.321 * [taylor]: Taking taylor expansion of k in m
0.321 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in m
0.321 * [taylor]: Taking taylor expansion of (* 10.0 k) in m
0.321 * [taylor]: Taking taylor expansion of 10.0 in m
0.322 * [taylor]: Taking taylor expansion of k in m
0.322 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in m
0.322 * [taylor]: Taking taylor expansion of (pow k 2) in m
0.322 * [taylor]: Taking taylor expansion of k in m
0.322 * [taylor]: Taking taylor expansion of 1.0 in m
0.322 * [taylor]: Taking taylor expansion of (/ (pow k m) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in k
0.322 * [taylor]: Taking taylor expansion of (pow k m) in k
0.322 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in k
0.322 * [taylor]: Taking taylor expansion of (* m (log k)) in k
0.322 * [taylor]: Taking taylor expansion of m in k
0.322 * [taylor]: Taking taylor expansion of (log k) in k
0.322 * [taylor]: Taking taylor expansion of k in k
0.323 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
0.323 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
0.323 * [taylor]: Taking taylor expansion of 10.0 in k
0.323 * [taylor]: Taking taylor expansion of k in k
0.323 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
0.323 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.323 * [taylor]: Taking taylor expansion of k in k
0.323 * [taylor]: Taking taylor expansion of 1.0 in k
0.324 * [taylor]: Taking taylor expansion of (/ (pow k m) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in k
0.324 * [taylor]: Taking taylor expansion of (pow k m) in k
0.324 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in k
0.324 * [taylor]: Taking taylor expansion of (* m (log k)) in k
0.324 * [taylor]: Taking taylor expansion of m in k
0.324 * [taylor]: Taking taylor expansion of (log k) in k
0.324 * [taylor]: Taking taylor expansion of k in k
0.324 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
0.324 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
0.324 * [taylor]: Taking taylor expansion of 10.0 in k
0.325 * [taylor]: Taking taylor expansion of k in k
0.325 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
0.325 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.325 * [taylor]: Taking taylor expansion of k in k
0.325 * [taylor]: Taking taylor expansion of 1.0 in k
0.326 * [taylor]: Taking taylor expansion of (* 1.0 (pow k m)) in m
0.326 * [taylor]: Taking taylor expansion of 1.0 in m
0.326 * [taylor]: Taking taylor expansion of (pow k m) in m
0.326 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
0.326 * [taylor]: Taking taylor expansion of (* m (log k)) in m
0.326 * [taylor]: Taking taylor expansion of m in m
0.326 * [taylor]: Taking taylor expansion of (log k) in m
0.326 * [taylor]: Taking taylor expansion of k in m
0.330 * [taylor]: Taking taylor expansion of (- (* 10.0 (pow k m))) in m
0.330 * [taylor]: Taking taylor expansion of (* 10.0 (pow k m)) in m
0.330 * [taylor]: Taking taylor expansion of 10.0 in m
0.330 * [taylor]: Taking taylor expansion of (pow k m) in m
0.330 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
0.330 * [taylor]: Taking taylor expansion of (* m (log k)) in m
0.330 * [taylor]: Taking taylor expansion of m in m
0.330 * [taylor]: Taking taylor expansion of (log k) in m
0.330 * [taylor]: Taking taylor expansion of k in m
0.333 * [approximate]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in (k m) around 0
0.333 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in m
0.333 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in m
0.333 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in m
0.333 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in m
0.333 * [taylor]: Taking taylor expansion of (/ 1 m) in m
0.333 * [taylor]: Taking taylor expansion of m in m
0.333 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in m
0.333 * [taylor]: Taking taylor expansion of (/ 1 k) in m
0.333 * [taylor]: Taking taylor expansion of k in m
0.334 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in m
0.334 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in m
0.334 * [taylor]: Taking taylor expansion of (pow k 2) in m
0.334 * [taylor]: Taking taylor expansion of k in m
0.334 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in m
0.334 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in m
0.334 * [taylor]: Taking taylor expansion of 10.0 in m
0.334 * [taylor]: Taking taylor expansion of (/ 1 k) in m
0.334 * [taylor]: Taking taylor expansion of k in m
0.334 * [taylor]: Taking taylor expansion of 1.0 in m
0.334 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
0.334 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in k
0.334 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in k
0.334 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in k
0.334 * [taylor]: Taking taylor expansion of (/ 1 m) in k
0.334 * [taylor]: Taking taylor expansion of m in k
0.335 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in k
0.335 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.335 * [taylor]: Taking taylor expansion of k in k
0.335 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
0.335 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.335 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.335 * [taylor]: Taking taylor expansion of k in k
0.336 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
0.336 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.336 * [taylor]: Taking taylor expansion of 10.0 in k
0.336 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.336 * [taylor]: Taking taylor expansion of k in k
0.336 * [taylor]: Taking taylor expansion of 1.0 in k
0.337 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
0.337 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in k
0.337 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in k
0.337 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in k
0.337 * [taylor]: Taking taylor expansion of (/ 1 m) in k
0.337 * [taylor]: Taking taylor expansion of m in k
0.337 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in k
0.337 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.337 * [taylor]: Taking taylor expansion of k in k
0.338 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
0.338 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.338 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.338 * [taylor]: Taking taylor expansion of k in k
0.338 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
0.338 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.338 * [taylor]: Taking taylor expansion of 10.0 in k
0.338 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.338 * [taylor]: Taking taylor expansion of k in k
0.339 * [taylor]: Taking taylor expansion of 1.0 in k
0.339 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
0.339 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
0.339 * [taylor]: Taking taylor expansion of -1 in m
0.339 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
0.339 * [taylor]: Taking taylor expansion of (log k) in m
0.339 * [taylor]: Taking taylor expansion of k in m
0.339 * [taylor]: Taking taylor expansion of m in m
0.344 * [taylor]: Taking taylor expansion of (- (* 10.0 (exp (* -1 (/ (log k) m))))) in m
0.344 * [taylor]: Taking taylor expansion of (* 10.0 (exp (* -1 (/ (log k) m)))) in m
0.344 * [taylor]: Taking taylor expansion of 10.0 in m
0.344 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
0.344 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
0.344 * [taylor]: Taking taylor expansion of -1 in m
0.344 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
0.344 * [taylor]: Taking taylor expansion of (log k) in m
0.344 * [taylor]: Taking taylor expansion of k in m
0.344 * [taylor]: Taking taylor expansion of m in m
0.351 * [taylor]: Taking taylor expansion of (* 99.0 (exp (* -1 (/ (log k) m)))) in m
0.351 * [taylor]: Taking taylor expansion of 99.0 in m
0.351 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
0.351 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
0.351 * [taylor]: Taking taylor expansion of -1 in m
0.351 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
0.351 * [taylor]: Taking taylor expansion of (log k) in m
0.351 * [taylor]: Taking taylor expansion of k in m
0.351 * [taylor]: Taking taylor expansion of m in m
0.353 * [approximate]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in (k m) around 0
0.353 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in m
0.353 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in m
0.353 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in m
0.353 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in m
0.353 * [taylor]: Taking taylor expansion of (/ -1 m) in m
0.353 * [taylor]: Taking taylor expansion of -1 in m
0.353 * [taylor]: Taking taylor expansion of m in m
0.353 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in m
0.353 * [taylor]: Taking taylor expansion of (/ -1 k) in m
0.353 * [taylor]: Taking taylor expansion of -1 in m
0.353 * [taylor]: Taking taylor expansion of k in m
0.353 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in m
0.353 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in m
0.353 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in m
0.353 * [taylor]: Taking taylor expansion of (pow k 2) in m
0.353 * [taylor]: Taking taylor expansion of k in m
0.353 * [taylor]: Taking taylor expansion of 1.0 in m
0.353 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in m
0.353 * [taylor]: Taking taylor expansion of 10.0 in m
0.353 * [taylor]: Taking taylor expansion of (/ 1 k) in m
0.354 * [taylor]: Taking taylor expansion of k in m
0.354 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
0.354 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in k
0.354 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in k
0.354 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in k
0.354 * [taylor]: Taking taylor expansion of (/ -1 m) in k
0.354 * [taylor]: Taking taylor expansion of -1 in k
0.354 * [taylor]: Taking taylor expansion of m in k
0.354 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in k
0.354 * [taylor]: Taking taylor expansion of (/ -1 k) in k
0.354 * [taylor]: Taking taylor expansion of -1 in k
0.354 * [taylor]: Taking taylor expansion of k in k
0.356 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
0.356 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
0.356 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.356 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.356 * [taylor]: Taking taylor expansion of k in k
0.357 * [taylor]: Taking taylor expansion of 1.0 in k
0.357 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.357 * [taylor]: Taking taylor expansion of 10.0 in k
0.357 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.357 * [taylor]: Taking taylor expansion of k in k
0.358 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
0.358 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in k
0.358 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in k
0.358 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in k
0.358 * [taylor]: Taking taylor expansion of (/ -1 m) in k
0.358 * [taylor]: Taking taylor expansion of -1 in k
0.358 * [taylor]: Taking taylor expansion of m in k
0.358 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in k
0.358 * [taylor]: Taking taylor expansion of (/ -1 k) in k
0.358 * [taylor]: Taking taylor expansion of -1 in k
0.358 * [taylor]: Taking taylor expansion of k in k
0.360 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
0.360 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
0.360 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.360 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.360 * [taylor]: Taking taylor expansion of k in k
0.360 * [taylor]: Taking taylor expansion of 1.0 in k
0.360 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.360 * [taylor]: Taking taylor expansion of 10.0 in k
0.360 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.360 * [taylor]: Taking taylor expansion of k in k
0.361 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
0.361 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
0.361 * [taylor]: Taking taylor expansion of -1 in m
0.361 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
0.362 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
0.362 * [taylor]: Taking taylor expansion of (log -1) in m
0.362 * [taylor]: Taking taylor expansion of -1 in m
0.362 * [taylor]: Taking taylor expansion of (log k) in m
0.362 * [taylor]: Taking taylor expansion of k in m
0.362 * [taylor]: Taking taylor expansion of m in m
0.370 * [taylor]: Taking taylor expansion of (* 10.0 (exp (* -1 (/ (- (log -1) (log k)) m)))) in m
0.370 * [taylor]: Taking taylor expansion of 10.0 in m
0.370 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
0.370 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
0.370 * [taylor]: Taking taylor expansion of -1 in m
0.370 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
0.370 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
0.370 * [taylor]: Taking taylor expansion of (log -1) in m
0.370 * [taylor]: Taking taylor expansion of -1 in m
0.373 * [taylor]: Taking taylor expansion of (log k) in m
0.373 * [taylor]: Taking taylor expansion of k in m
0.373 * [taylor]: Taking taylor expansion of m in m
0.384 * [taylor]: Taking taylor expansion of (* 99.0 (exp (* -1 (/ (- (log -1) (log k)) m)))) in m
0.384 * [taylor]: Taking taylor expansion of 99.0 in m
0.384 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
0.384 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
0.384 * [taylor]: Taking taylor expansion of -1 in m
0.384 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
0.384 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
0.384 * [taylor]: Taking taylor expansion of (log -1) in m
0.384 * [taylor]: Taking taylor expansion of -1 in m
0.384 * [taylor]: Taking taylor expansion of (log k) in m
0.385 * [taylor]: Taking taylor expansion of k in m
0.385 * [taylor]: Taking taylor expansion of m in m
0.388 * * * * [progress]: [ 3 / 3 ] generating series at (2 1 2 1)
0.388 * [approximate]: Taking taylor expansion of (* k (+ k 10.0)) in (k) around 0
0.388 * [taylor]: Taking taylor expansion of (* k (+ k 10.0)) in k
0.388 * [taylor]: Taking taylor expansion of k in k
0.388 * [taylor]: Taking taylor expansion of (+ k 10.0) in k
0.388 * [taylor]: Taking taylor expansion of k in k
0.388 * [taylor]: Taking taylor expansion of 10.0 in k
0.388 * [taylor]: Taking taylor expansion of (* k (+ k 10.0)) in k
0.388 * [taylor]: Taking taylor expansion of k in k
0.388 * [taylor]: Taking taylor expansion of (+ k 10.0) in k
0.389 * [taylor]: Taking taylor expansion of k in k
0.389 * [taylor]: Taking taylor expansion of 10.0 in k
0.398 * [approximate]: Taking taylor expansion of (/ (+ (/ 1 k) 10.0) k) in (k) around 0
0.398 * [taylor]: Taking taylor expansion of (/ (+ (/ 1 k) 10.0) k) in k
0.398 * [taylor]: Taking taylor expansion of (+ (/ 1 k) 10.0) in k
0.398 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.398 * [taylor]: Taking taylor expansion of k in k
0.398 * [taylor]: Taking taylor expansion of 10.0 in k
0.398 * [taylor]: Taking taylor expansion of k in k
0.399 * [taylor]: Taking taylor expansion of (/ (+ (/ 1 k) 10.0) k) in k
0.399 * [taylor]: Taking taylor expansion of (+ (/ 1 k) 10.0) in k
0.399 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.399 * [taylor]: Taking taylor expansion of k in k
0.399 * [taylor]: Taking taylor expansion of 10.0 in k
0.399 * [taylor]: Taking taylor expansion of k in k
0.410 * [approximate]: Taking taylor expansion of (* -1 (/ (- 10.0 (/ 1 k)) k)) in (k) around 0
0.410 * [taylor]: Taking taylor expansion of (* -1 (/ (- 10.0 (/ 1 k)) k)) in k
0.410 * [taylor]: Taking taylor expansion of -1 in k
0.410 * [taylor]: Taking taylor expansion of (/ (- 10.0 (/ 1 k)) k) in k
0.410 * [taylor]: Taking taylor expansion of (- 10.0 (/ 1 k)) in k
0.410 * [taylor]: Taking taylor expansion of 10.0 in k
0.410 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.410 * [taylor]: Taking taylor expansion of k in k
0.410 * [taylor]: Taking taylor expansion of k in k
0.411 * [taylor]: Taking taylor expansion of (* -1 (/ (- 10.0 (/ 1 k)) k)) in k
0.411 * [taylor]: Taking taylor expansion of -1 in k
0.411 * [taylor]: Taking taylor expansion of (/ (- 10.0 (/ 1 k)) k) in k
0.411 * [taylor]: Taking taylor expansion of (- 10.0 (/ 1 k)) in k
0.411 * [taylor]: Taking taylor expansion of 10.0 in k
0.411 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.411 * [taylor]: Taking taylor expansion of k in k
0.412 * [taylor]: Taking taylor expansion of k in k
0.430 * * * [progress]: simplifying candidates
0.432 * [simplify]: Simplifying using  #<procedure:simplify-batch-egg> :
   (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (+ (- (* (log k) m) (log (+ (* k (+ 10.0 k)) 1.0))) (log a))
  (+ (- (* (log k) m) (log (+ (* k (+ 10.0 k)) 1.0))) (log a))
  (+ (- (log (pow k m)) (log (+ (* k (+ 10.0 k)) 1.0))) (log a))
  (+ (log (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (log a))
  (log (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (exp (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (* (/ (* (* (pow k m) (pow k m)) (pow k m)) (* (* (+ (* k (+ 10.0 k)) 1.0) (+ (* k (+ 10.0 k)) 1.0)) (+ (* k (+ 10.0 k)) 1.0))) (* (* a a) a))
  (* (* (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (* (* a a) a))
  (* (cbrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)) (cbrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)))
  (cbrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (* (* (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a) (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)) (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (sqrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (sqrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (* (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) (* (cbrt a) (cbrt a)))
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) (sqrt a))
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) 1)
  (* (cbrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (cbrt k) m) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (cbrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (cbrt k) m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow (sqrt k) m) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (sqrt k) m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow k m) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (cbrt (pow k m)) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (cbrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (cbrt (pow k m)) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (sqrt (pow k m)) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (sqrt (pow k m)) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow k m) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow k (/ m 2)) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k (/ m 2)) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ 1 (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (+ (* (* k (+ 10.0 k)) (* k (+ 10.0 k))) (- (* 1.0 1.0) (* (* k (+ 10.0 k)) 1.0))) a)
  (* (- (* k (+ 10.0 k)) 1.0) a)
  (* (pow k m) a)
  (- (* (log k) m) (log (+ (* k (+ 10.0 k)) 1.0)))
  (- (* (log k) m) (log (+ (* k (+ 10.0 k)) 1.0)))
  (- (log (pow k m)) (log (+ (* k (+ 10.0 k)) 1.0)))
  (log (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (exp (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (/ (* (* (pow k m) (pow k m)) (pow k m)) (* (* (+ (* k (+ 10.0 k)) 1.0) (+ (* k (+ 10.0 k)) 1.0)) (+ (* k (+ 10.0 k)) 1.0)))
  (* (cbrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (cbrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))))
  (cbrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (* (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (- (pow k m))
  (- (+ (* k (+ 10.0 k)) 1.0))
  (/ (pow (* (cbrt k) (cbrt k)) m) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow (cbrt k) m) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (* (cbrt k) (cbrt k)) m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (cbrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (* (cbrt k) (cbrt k)) m) 1)
  (/ (pow (cbrt k) m) (+ (* k (+ 10.0 k)) 1.0))
  (/ (pow (sqrt k) m) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow (sqrt k) m) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (sqrt k) m) 1)
  (/ (pow (sqrt k) m) (+ (* k (+ 10.0 k)) 1.0))
  (/ (pow 1 m) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow k m) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow 1 m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow 1 m) 1)
  (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))
  (/ (* (cbrt (pow k m)) (cbrt (pow k m))) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (cbrt (pow k m)) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (* (cbrt (pow k m)) (cbrt (pow k m))) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (cbrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (* (cbrt (pow k m)) (cbrt (pow k m))) 1)
  (/ (cbrt (pow k m)) (+ (* k (+ 10.0 k)) 1.0))
  (/ (sqrt (pow k m)) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (sqrt (pow k m)) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (sqrt (pow k m)) 1)
  (/ (sqrt (pow k m)) (+ (* k (+ 10.0 k)) 1.0))
  (/ 1 (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow k m) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ 1 (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ 1 1)
  (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))
  (/ (pow k (/ m 2)) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow k (/ m 2)) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k (/ m 2)) 1)
  (/ (pow k (/ m 2)) (+ (* k (+ 10.0 k)) 1.0))
  (/ 1 (+ (* k (+ 10.0 k)) 1.0))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow k m))
  (/ (pow k m) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k m) 1)
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow (cbrt k) m))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow (sqrt k) m))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow k m))
  (/ (+ (* k (+ 10.0 k)) 1.0) (cbrt (pow k m)))
  (/ (+ (* k (+ 10.0 k)) 1.0) (sqrt (pow k m)))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow k m))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow k (/ m 2)))
  (/ (pow k m) (+ (pow (* k (+ 10.0 k)) 3) (pow 1.0 3)))
  (/ (pow k m) (- (* (* k (+ 10.0 k)) (* k (+ 10.0 k))) (* 1.0 1.0)))
  (* k (+ 10.0 k))
  (+ (log k) (log (+ 10.0 k)))
  (log (* k (+ 10.0 k)))
  (exp (* k (+ 10.0 k)))
  (* (* (* k k) k) (* (* (+ 10.0 k) (+ 10.0 k)) (+ 10.0 k)))
  (* (cbrt (* k (+ 10.0 k))) (cbrt (* k (+ 10.0 k))))
  (cbrt (* k (+ 10.0 k)))
  (* (* (* k (+ 10.0 k)) (* k (+ 10.0 k))) (* k (+ 10.0 k)))
  (sqrt (* k (+ 10.0 k)))
  (sqrt (* k (+ 10.0 k)))
  (* (sqrt k) (sqrt (+ 10.0 k)))
  (* (sqrt k) (sqrt (+ 10.0 k)))
  (* k 10.0)
  (* k k)
  (* 10.0 k)
  (* k k)
  (* k (* (cbrt (+ 10.0 k)) (cbrt (+ 10.0 k))))
  (* k (sqrt (+ 10.0 k)))
  (* k 1)
  (* k 1)
  (* (cbrt k) (+ 10.0 k))
  (* (sqrt k) (+ 10.0 k))
  (* k (+ 10.0 k))
  (* k (+ (pow 10.0 3) (pow k 3)))
  (* k (- (* 10.0 10.0) (* k k)))
  (- (+ (* 1.0 (* a (* m (log k)))) (* 1.0 a)) (* 10.0 (* k a)))
  (- (+ (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 2)) (* 99.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 4)))) (* 10.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 3))))
  (- (+ (* 99.0 (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 4))) (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 2))) (* 10.0 (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 3))))
  (- (+ (* 1.0 (* m (log k))) 1.0) (* 10.0 k))
  (- (+ (/ (exp (* -1 (* m (log (/ 1 k))))) (pow k 2)) (* 99.0 (/ (exp (* -1 (* m (log (/ 1 k))))) (pow k 4)))) (* 10.0 (/ (exp (* -1 (* m (log (/ 1 k))))) (pow k 3))))
  (- (+ (/ (exp (* m (- (log -1) (log (/ -1 k))))) (pow k 2)) (* 99.0 (/ (exp (* m (- (log -1) (log (/ -1 k))))) (pow k 4)))) (* 10.0 (/ (exp (* m (- (log -1) (log (/ -1 k))))) (pow k 3))))
  (+ (* 10.0 k) (pow k 2))
  (+ (* 10.0 k) (pow k 2))
  (+ (* 10.0 k) (pow k 2))
0.440 * * [simplify]: iteration  0 :  608  enodes  (cost  1105 )
0.451 * * [simplify]: iteration  1 :  2523  enodes  (cost  1041 )
0.494 * * [simplify]: iteration  2 :  5001  enodes  (cost  1035 )
0.499 * [simplify]: Simplified to:
   (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (log (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (log (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (log (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (log (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (log (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (exp (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (pow (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a) 3)
  (pow (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a) 3)
  (* (cbrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)) (cbrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)))
  (cbrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (pow (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a) 3)
  (sqrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (sqrt (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))
  (* (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) (sqrt a))
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) (* (cbrt a) (cbrt a)))
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) (sqrt a))
  (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))
  (* (cbrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (cbrt k) m) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (cbrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (cbrt k) m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow (sqrt k) m) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow (sqrt k) m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow k m) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (cbrt (pow k m)) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (cbrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (cbrt (pow k m)) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (sqrt (pow k m)) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (sqrt (pow k m)) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow k m) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow k (/ m 2)) (cbrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0))) a)
  (* (/ (pow k (/ m 2)) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
  (* (/ 1 (+ (* k (+ 10.0 k)) 1.0)) a)
  (* a (+ (* 1.0 (- 1.0 (* k (+ 10.0 k)))) (* (* k (+ 10.0 k)) (* k (+ 10.0 k)))))
  (* (- (* k (+ 10.0 k)) 1.0) a)
  (* (pow k m) a)
  (log (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (log (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (log (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (log (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (exp (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (pow (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) 3)
  (* (cbrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))) (cbrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))))
  (cbrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (pow (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) 3)
  (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (sqrt (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)))
  (- (pow k m))
  (- (+ (* k (+ 10.0 k)) 1.0))
  (/ (pow (* (cbrt k) (cbrt k)) m) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow (cbrt k) m) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (* (cbrt k) (cbrt k)) m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (cbrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (pow (* (cbrt k) (cbrt k)) m)
  (/ (pow (cbrt k) m) (+ (* k (+ 10.0 k)) 1.0))
  (/ (pow (sqrt k) m) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow (sqrt k) m) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow (sqrt k) m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (pow (sqrt k) m)
  (/ (pow (sqrt k) m) (+ (* k (+ 10.0 k)) 1.0))
  (/ 1 (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow k m) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ 1 (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  1
  (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))
  (/ (* (cbrt (pow k m)) (cbrt (pow k m))) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (cbrt (pow k m)) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (* (cbrt (pow k m)) (cbrt (pow k m))) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (cbrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (* (cbrt (pow k m)) (cbrt (pow k m)))
  (/ (cbrt (pow k m)) (+ (* k (+ 10.0 k)) 1.0))
  (/ (sqrt (pow k m)) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (sqrt (pow k m)) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (sqrt (pow k m)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (sqrt (pow k m))
  (/ (sqrt (pow k m)) (+ (* k (+ 10.0 k)) 1.0))
  (/ 1 (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow k m) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ 1 (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  1
  (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0))
  (/ (pow k (/ m 2)) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow k (/ m 2)) (cbrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (/ (pow k (/ m 2)) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (pow k (/ m 2))
  (/ (pow k (/ m 2)) (+ (* k (+ 10.0 k)) 1.0))
  (/ 1 (+ (* k (+ 10.0 k)) 1.0))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow k m))
  (/ (pow k m) (* (cbrt (+ (* k (+ 10.0 k)) 1.0)) (cbrt (+ (* k (+ 10.0 k)) 1.0))))
  (/ (pow k m) (sqrt (+ (* k (+ 10.0 k)) 1.0)))
  (pow k m)
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow (cbrt k) m))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow (sqrt k) m))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow k m))
  (/ (+ (* k (+ 10.0 k)) 1.0) (cbrt (pow k m)))
  (/ (+ (* k (+ 10.0 k)) 1.0) (sqrt (pow k m)))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow k m))
  (/ (+ (* k (+ 10.0 k)) 1.0) (pow k (/ m 2)))
  (/ (pow k m) (+ (pow (* k (+ 10.0 k)) 3) (pow 1.0 3)))
  (/ (pow k m) (- (* (* k (+ 10.0 k)) (* k (+ 10.0 k))) (* 1.0 1.0)))
  (* k (+ 10.0 k))
  (log (* k (+ 10.0 k)))
  (log (* k (+ 10.0 k)))
  (exp (* k (+ 10.0 k)))
  (pow (* k (+ 10.0 k)) 3)
  (* (cbrt (* k (+ 10.0 k))) (cbrt (* k (+ 10.0 k))))
  (cbrt (* k (+ 10.0 k)))
  (pow (* k (+ 10.0 k)) 3)
  (sqrt (* k (+ 10.0 k)))
  (sqrt (* k (+ 10.0 k)))
  (* (sqrt k) (sqrt (+ 10.0 k)))
  (* (sqrt k) (sqrt (+ 10.0 k)))
  (* k 10.0)
  (pow k 2)
  (* k 10.0)
  (pow k 2)
  (* k (* (cbrt (+ 10.0 k)) (cbrt (+ 10.0 k))))
  (* k (sqrt (+ 10.0 k)))
  k
  k
  (* (cbrt k) (+ 10.0 k))
  (* (sqrt k) (+ 10.0 k))
  (* k (+ 10.0 k))
  (* k (+ (pow 10.0 3) (pow k 3)))
  (* k (- (* 10.0 10.0) (* k k)))
  (+ (* a (- 1.0 (* k 10.0))) (* 1.0 (* a (* m (log k)))))
  (- (+ (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 2)) (* 99.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 4)))) (* 10.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 3))))
  (- (+ (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 2)) (* 99.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 4)))) (* 10.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 3))))
  (- (+ (* 1.0 (* m (log k))) 1.0) (* 10.0 k))
  (- (+ (/ (exp (* -1 (* m (log (/ 1 k))))) (pow k 2)) (* 99.0 (/ (exp (* -1 (* m (log (/ 1 k))))) (pow k 4)))) (* 10.0 (/ (exp (* -1 (* m (log (/ 1 k))))) (pow k 3))))
  (- (+ (/ (exp (* -1 (* m (log (/ 1 k))))) (pow k 2)) (* 99.0 (/ (exp (* -1 (* m (log (/ 1 k))))) (pow k 4)))) (* 10.0 (/ (exp (* -1 (* m (log (/ 1 k))))) (pow k 3))))
  (* k (+ 10.0 k))
  (* k (+ 10.0 k))
  (* k (+ 10.0 k))
0.500 * * * [progress]: adding candidates to table
0.820 * * [progress]: iteration 2 / 4
0.820 * * * [progress]: picking best candidate
0.825 * * * * [pick]: Picked  #<alt (λ (a k m) (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))>
0.825 * * * [progress]: localizing error
0.836 * * * [progress]: generating rewritten candidates
0.836 * * * * [progress]: [ 1 / 3 ] rewriting at (2)
0.850 * * * * [progress]: [ 2 / 3 ] rewriting at (2 2)
0.862 * * * * [progress]: [ 3 / 3 ] rewriting at (2 2 1)
0.865 * * * [progress]: generating series expansions
0.866 * * * * [progress]: [ 1 / 3 ] generating series at (2)
0.866 * [approximate]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in (a k m) around 0
0.866 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in m
0.866 * [taylor]: Taking taylor expansion of (* a (pow k m)) in m
0.866 * [taylor]: Taking taylor expansion of a in m
0.866 * [taylor]: Taking taylor expansion of (pow k m) in m
0.866 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
0.866 * [taylor]: Taking taylor expansion of (* m (log k)) in m
0.866 * [taylor]: Taking taylor expansion of m in m
0.866 * [taylor]: Taking taylor expansion of (log k) in m
0.866 * [taylor]: Taking taylor expansion of k in m
0.867 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in m
0.867 * [taylor]: Taking taylor expansion of (* 10.0 k) in m
0.867 * [taylor]: Taking taylor expansion of 10.0 in m
0.867 * [taylor]: Taking taylor expansion of k in m
0.867 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in m
0.867 * [taylor]: Taking taylor expansion of (pow k 2) in m
0.867 * [taylor]: Taking taylor expansion of k in m
0.867 * [taylor]: Taking taylor expansion of 1.0 in m
0.868 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in k
0.868 * [taylor]: Taking taylor expansion of (* a (pow k m)) in k
0.868 * [taylor]: Taking taylor expansion of a in k
0.868 * [taylor]: Taking taylor expansion of (pow k m) in k
0.868 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in k
0.868 * [taylor]: Taking taylor expansion of (* m (log k)) in k
0.868 * [taylor]: Taking taylor expansion of m in k
0.868 * [taylor]: Taking taylor expansion of (log k) in k
0.868 * [taylor]: Taking taylor expansion of k in k
0.869 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
0.869 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
0.869 * [taylor]: Taking taylor expansion of 10.0 in k
0.869 * [taylor]: Taking taylor expansion of k in k
0.869 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
0.869 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.869 * [taylor]: Taking taylor expansion of k in k
0.869 * [taylor]: Taking taylor expansion of 1.0 in k
0.870 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in a
0.870 * [taylor]: Taking taylor expansion of (* a (pow k m)) in a
0.870 * [taylor]: Taking taylor expansion of a in a
0.870 * [taylor]: Taking taylor expansion of (pow k m) in a
0.870 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in a
0.870 * [taylor]: Taking taylor expansion of (* m (log k)) in a
0.870 * [taylor]: Taking taylor expansion of m in a
0.870 * [taylor]: Taking taylor expansion of (log k) in a
0.870 * [taylor]: Taking taylor expansion of k in a
0.870 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in a
0.870 * [taylor]: Taking taylor expansion of (* 10.0 k) in a
0.870 * [taylor]: Taking taylor expansion of 10.0 in a
0.870 * [taylor]: Taking taylor expansion of k in a
0.870 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in a
0.870 * [taylor]: Taking taylor expansion of (pow k 2) in a
0.870 * [taylor]: Taking taylor expansion of k in a
0.870 * [taylor]: Taking taylor expansion of 1.0 in a
0.872 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in a
0.872 * [taylor]: Taking taylor expansion of (* a (pow k m)) in a
0.872 * [taylor]: Taking taylor expansion of a in a
0.872 * [taylor]: Taking taylor expansion of (pow k m) in a
0.872 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in a
0.872 * [taylor]: Taking taylor expansion of (* m (log k)) in a
0.872 * [taylor]: Taking taylor expansion of m in a
0.872 * [taylor]: Taking taylor expansion of (log k) in a
0.872 * [taylor]: Taking taylor expansion of k in a
0.872 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in a
0.872 * [taylor]: Taking taylor expansion of (* 10.0 k) in a
0.872 * [taylor]: Taking taylor expansion of 10.0 in a
0.872 * [taylor]: Taking taylor expansion of k in a
0.872 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in a
0.872 * [taylor]: Taking taylor expansion of (pow k 2) in a
0.872 * [taylor]: Taking taylor expansion of k in a
0.872 * [taylor]: Taking taylor expansion of 1.0 in a
0.874 * [taylor]: Taking taylor expansion of (/ (pow k m) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in k
0.874 * [taylor]: Taking taylor expansion of (pow k m) in k
0.874 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in k
0.874 * [taylor]: Taking taylor expansion of (* m (log k)) in k
0.874 * [taylor]: Taking taylor expansion of m in k
0.874 * [taylor]: Taking taylor expansion of (log k) in k
0.874 * [taylor]: Taking taylor expansion of k in k
0.875 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
0.875 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
0.875 * [taylor]: Taking taylor expansion of 10.0 in k
0.875 * [taylor]: Taking taylor expansion of k in k
0.875 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
0.875 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.875 * [taylor]: Taking taylor expansion of k in k
0.875 * [taylor]: Taking taylor expansion of 1.0 in k
0.876 * [taylor]: Taking taylor expansion of (* 1.0 (pow k m)) in m
0.876 * [taylor]: Taking taylor expansion of 1.0 in m
0.876 * [taylor]: Taking taylor expansion of (pow k m) in m
0.876 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
0.876 * [taylor]: Taking taylor expansion of (* m (log k)) in m
0.876 * [taylor]: Taking taylor expansion of m in m
0.876 * [taylor]: Taking taylor expansion of (log k) in m
0.876 * [taylor]: Taking taylor expansion of k in m
0.881 * [taylor]: Taking taylor expansion of 0 in k
0.881 * [taylor]: Taking taylor expansion of 0 in m
0.885 * [taylor]: Taking taylor expansion of (- (* 10.0 (pow k m))) in m
0.885 * [taylor]: Taking taylor expansion of (* 10.0 (pow k m)) in m
0.885 * [taylor]: Taking taylor expansion of 10.0 in m
0.885 * [taylor]: Taking taylor expansion of (pow k m) in m
0.885 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
0.885 * [taylor]: Taking taylor expansion of (* m (log k)) in m
0.885 * [taylor]: Taking taylor expansion of m in m
0.885 * [taylor]: Taking taylor expansion of (log k) in m
0.885 * [taylor]: Taking taylor expansion of k in m
0.888 * [approximate]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in (a k m) around 0
0.888 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in m
0.888 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in m
0.888 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in m
0.888 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in m
0.888 * [taylor]: Taking taylor expansion of (/ 1 m) in m
0.888 * [taylor]: Taking taylor expansion of m in m
0.888 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in m
0.888 * [taylor]: Taking taylor expansion of (/ 1 k) in m
0.888 * [taylor]: Taking taylor expansion of k in m
0.888 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in m
0.888 * [taylor]: Taking taylor expansion of a in m
0.888 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in m
0.888 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in m
0.888 * [taylor]: Taking taylor expansion of (pow k 2) in m
0.888 * [taylor]: Taking taylor expansion of k in m
0.889 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in m
0.889 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in m
0.889 * [taylor]: Taking taylor expansion of 10.0 in m
0.889 * [taylor]: Taking taylor expansion of (/ 1 k) in m
0.889 * [taylor]: Taking taylor expansion of k in m
0.889 * [taylor]: Taking taylor expansion of 1.0 in m
0.889 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in k
0.889 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in k
0.889 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in k
0.889 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in k
0.889 * [taylor]: Taking taylor expansion of (/ 1 m) in k
0.889 * [taylor]: Taking taylor expansion of m in k
0.889 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in k
0.889 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.889 * [taylor]: Taking taylor expansion of k in k
0.890 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
0.890 * [taylor]: Taking taylor expansion of a in k
0.890 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
0.890 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.890 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.890 * [taylor]: Taking taylor expansion of k in k
0.891 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
0.891 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.891 * [taylor]: Taking taylor expansion of 10.0 in k
0.891 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.891 * [taylor]: Taking taylor expansion of k in k
0.891 * [taylor]: Taking taylor expansion of 1.0 in k
0.892 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in a
0.892 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in a
0.892 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in a
0.892 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in a
0.892 * [taylor]: Taking taylor expansion of (/ 1 m) in a
0.892 * [taylor]: Taking taylor expansion of m in a
0.892 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in a
0.892 * [taylor]: Taking taylor expansion of (/ 1 k) in a
0.892 * [taylor]: Taking taylor expansion of k in a
0.892 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in a
0.892 * [taylor]: Taking taylor expansion of a in a
0.892 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in a
0.892 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
0.892 * [taylor]: Taking taylor expansion of (pow k 2) in a
0.892 * [taylor]: Taking taylor expansion of k in a
0.892 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in a
0.892 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
0.892 * [taylor]: Taking taylor expansion of 10.0 in a
0.892 * [taylor]: Taking taylor expansion of (/ 1 k) in a
0.892 * [taylor]: Taking taylor expansion of k in a
0.892 * [taylor]: Taking taylor expansion of 1.0 in a
0.894 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in a
0.894 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in a
0.894 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in a
0.894 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in a
0.894 * [taylor]: Taking taylor expansion of (/ 1 m) in a
0.894 * [taylor]: Taking taylor expansion of m in a
0.894 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in a
0.894 * [taylor]: Taking taylor expansion of (/ 1 k) in a
0.894 * [taylor]: Taking taylor expansion of k in a
0.895 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in a
0.895 * [taylor]: Taking taylor expansion of a in a
0.895 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in a
0.895 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
0.895 * [taylor]: Taking taylor expansion of (pow k 2) in a
0.895 * [taylor]: Taking taylor expansion of k in a
0.895 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in a
0.895 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
0.895 * [taylor]: Taking taylor expansion of 10.0 in a
0.895 * [taylor]: Taking taylor expansion of (/ 1 k) in a
0.895 * [taylor]: Taking taylor expansion of k in a
0.895 * [taylor]: Taking taylor expansion of 1.0 in a
0.897 * [taylor]: Taking taylor expansion of (/ (exp (/ (log (/ 1 k)) m)) (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
0.897 * [taylor]: Taking taylor expansion of (exp (/ (log (/ 1 k)) m)) in k
0.897 * [taylor]: Taking taylor expansion of (/ (log (/ 1 k)) m) in k
0.897 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in k
0.897 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.897 * [taylor]: Taking taylor expansion of k in k
0.898 * [taylor]: Taking taylor expansion of m in k
0.898 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
0.898 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.898 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.898 * [taylor]: Taking taylor expansion of k in k
0.899 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
0.899 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.899 * [taylor]: Taking taylor expansion of 10.0 in k
0.899 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.899 * [taylor]: Taking taylor expansion of k in k
0.899 * [taylor]: Taking taylor expansion of 1.0 in k
0.900 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
0.900 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
0.900 * [taylor]: Taking taylor expansion of -1 in m
0.900 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
0.900 * [taylor]: Taking taylor expansion of (log k) in m
0.900 * [taylor]: Taking taylor expansion of k in m
0.900 * [taylor]: Taking taylor expansion of m in m
0.904 * [taylor]: Taking taylor expansion of 0 in k
0.904 * [taylor]: Taking taylor expansion of 0 in m
0.908 * [taylor]: Taking taylor expansion of (- (* 10.0 (exp (* -1 (/ (log k) m))))) in m
0.908 * [taylor]: Taking taylor expansion of (* 10.0 (exp (* -1 (/ (log k) m)))) in m
0.908 * [taylor]: Taking taylor expansion of 10.0 in m
0.908 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
0.908 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
0.908 * [taylor]: Taking taylor expansion of -1 in m
0.908 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
0.908 * [taylor]: Taking taylor expansion of (log k) in m
0.908 * [taylor]: Taking taylor expansion of k in m
0.908 * [taylor]: Taking taylor expansion of m in m
0.915 * [taylor]: Taking taylor expansion of 0 in k
0.915 * [taylor]: Taking taylor expansion of 0 in m
0.915 * [taylor]: Taking taylor expansion of 0 in m
0.921 * [taylor]: Taking taylor expansion of (* 99.0 (exp (* -1 (/ (log k) m)))) in m
0.921 * [taylor]: Taking taylor expansion of 99.0 in m
0.921 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
0.921 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
0.921 * [taylor]: Taking taylor expansion of -1 in m
0.921 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
0.921 * [taylor]: Taking taylor expansion of (log k) in m
0.921 * [taylor]: Taking taylor expansion of k in m
0.921 * [taylor]: Taking taylor expansion of m in m
0.923 * [approximate]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in (a k m) around 0
0.923 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in m
0.923 * [taylor]: Taking taylor expansion of -1 in m
0.923 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in m
0.923 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in m
0.923 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in m
0.923 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in m
0.923 * [taylor]: Taking taylor expansion of (/ -1 m) in m
0.923 * [taylor]: Taking taylor expansion of -1 in m
0.923 * [taylor]: Taking taylor expansion of m in m
0.923 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in m
0.923 * [taylor]: Taking taylor expansion of (/ -1 k) in m
0.923 * [taylor]: Taking taylor expansion of -1 in m
0.923 * [taylor]: Taking taylor expansion of k in m
0.923 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in m
0.923 * [taylor]: Taking taylor expansion of a in m
0.923 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in m
0.923 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in m
0.923 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in m
0.923 * [taylor]: Taking taylor expansion of (pow k 2) in m
0.923 * [taylor]: Taking taylor expansion of k in m
0.924 * [taylor]: Taking taylor expansion of 1.0 in m
0.924 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in m
0.924 * [taylor]: Taking taylor expansion of 10.0 in m
0.924 * [taylor]: Taking taylor expansion of (/ 1 k) in m
0.924 * [taylor]: Taking taylor expansion of k in m
0.924 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in k
0.924 * [taylor]: Taking taylor expansion of -1 in k
0.924 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in k
0.924 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in k
0.924 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in k
0.924 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in k
0.924 * [taylor]: Taking taylor expansion of (/ -1 m) in k
0.924 * [taylor]: Taking taylor expansion of -1 in k
0.924 * [taylor]: Taking taylor expansion of m in k
0.925 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in k
0.925 * [taylor]: Taking taylor expansion of (/ -1 k) in k
0.925 * [taylor]: Taking taylor expansion of -1 in k
0.925 * [taylor]: Taking taylor expansion of k in k
0.926 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
0.926 * [taylor]: Taking taylor expansion of a in k
0.926 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
0.926 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
0.926 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.926 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.926 * [taylor]: Taking taylor expansion of k in k
0.927 * [taylor]: Taking taylor expansion of 1.0 in k
0.927 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.927 * [taylor]: Taking taylor expansion of 10.0 in k
0.927 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.927 * [taylor]: Taking taylor expansion of k in k
0.928 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in a
0.928 * [taylor]: Taking taylor expansion of -1 in a
0.928 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in a
0.928 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in a
0.928 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in a
0.928 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in a
0.928 * [taylor]: Taking taylor expansion of (/ -1 m) in a
0.928 * [taylor]: Taking taylor expansion of -1 in a
0.928 * [taylor]: Taking taylor expansion of m in a
0.928 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in a
0.928 * [taylor]: Taking taylor expansion of (/ -1 k) in a
0.928 * [taylor]: Taking taylor expansion of -1 in a
0.928 * [taylor]: Taking taylor expansion of k in a
0.929 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in a
0.929 * [taylor]: Taking taylor expansion of a in a
0.929 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in a
0.929 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in a
0.929 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
0.929 * [taylor]: Taking taylor expansion of (pow k 2) in a
0.929 * [taylor]: Taking taylor expansion of k in a
0.929 * [taylor]: Taking taylor expansion of 1.0 in a
0.929 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
0.929 * [taylor]: Taking taylor expansion of 10.0 in a
0.929 * [taylor]: Taking taylor expansion of (/ 1 k) in a
0.929 * [taylor]: Taking taylor expansion of k in a
0.931 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in a
0.931 * [taylor]: Taking taylor expansion of -1 in a
0.931 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in a
0.931 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in a
0.931 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in a
0.931 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in a
0.931 * [taylor]: Taking taylor expansion of (/ -1 m) in a
0.931 * [taylor]: Taking taylor expansion of -1 in a
0.931 * [taylor]: Taking taylor expansion of m in a
0.931 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in a
0.931 * [taylor]: Taking taylor expansion of (/ -1 k) in a
0.931 * [taylor]: Taking taylor expansion of -1 in a
0.931 * [taylor]: Taking taylor expansion of k in a
0.932 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in a
0.932 * [taylor]: Taking taylor expansion of a in a
0.932 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in a
0.932 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in a
0.932 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
0.932 * [taylor]: Taking taylor expansion of (pow k 2) in a
0.932 * [taylor]: Taking taylor expansion of k in a
0.932 * [taylor]: Taking taylor expansion of 1.0 in a
0.932 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
0.932 * [taylor]: Taking taylor expansion of 10.0 in a
0.932 * [taylor]: Taking taylor expansion of (/ 1 k) in a
0.932 * [taylor]: Taking taylor expansion of k in a
0.934 * [taylor]: Taking taylor expansion of (* -1 (/ (exp (* -1 (/ (log (/ -1 k)) m))) (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in k
0.934 * [taylor]: Taking taylor expansion of -1 in k
0.935 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log (/ -1 k)) m))) (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
0.935 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log (/ -1 k)) m))) in k
0.935 * [taylor]: Taking taylor expansion of (* -1 (/ (log (/ -1 k)) m)) in k
0.935 * [taylor]: Taking taylor expansion of -1 in k
0.935 * [taylor]: Taking taylor expansion of (/ (log (/ -1 k)) m) in k
0.935 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in k
0.935 * [taylor]: Taking taylor expansion of (/ -1 k) in k
0.935 * [taylor]: Taking taylor expansion of -1 in k
0.935 * [taylor]: Taking taylor expansion of k in k
0.935 * [taylor]: Taking taylor expansion of m in k
0.937 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
0.937 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
0.937 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.937 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.937 * [taylor]: Taking taylor expansion of k in k
0.938 * [taylor]: Taking taylor expansion of 1.0 in k
0.938 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.938 * [taylor]: Taking taylor expansion of 10.0 in k
0.938 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.938 * [taylor]: Taking taylor expansion of k in k
0.939 * [taylor]: Taking taylor expansion of (* -1 (exp (* -1 (/ (- (log -1) (log k)) m)))) in m
0.939 * [taylor]: Taking taylor expansion of -1 in m
0.939 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
0.939 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
0.939 * [taylor]: Taking taylor expansion of -1 in m
0.939 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
0.939 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
0.939 * [taylor]: Taking taylor expansion of (log -1) in m
0.940 * [taylor]: Taking taylor expansion of -1 in m
0.940 * [taylor]: Taking taylor expansion of (log k) in m
0.940 * [taylor]: Taking taylor expansion of k in m
0.940 * [taylor]: Taking taylor expansion of m in m
0.947 * [taylor]: Taking taylor expansion of 0 in k
0.947 * [taylor]: Taking taylor expansion of 0 in m
0.957 * [taylor]: Taking taylor expansion of (- (* 10.0 (exp (* -1 (/ (- (log -1) (log k)) m))))) in m
0.957 * [taylor]: Taking taylor expansion of (* 10.0 (exp (* -1 (/ (- (log -1) (log k)) m)))) in m
0.957 * [taylor]: Taking taylor expansion of 10.0 in m
0.957 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
0.957 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
0.957 * [taylor]: Taking taylor expansion of -1 in m
0.957 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
0.957 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
0.957 * [taylor]: Taking taylor expansion of (log -1) in m
0.957 * [taylor]: Taking taylor expansion of -1 in m
0.957 * [taylor]: Taking taylor expansion of (log k) in m
0.957 * [taylor]: Taking taylor expansion of k in m
0.957 * [taylor]: Taking taylor expansion of m in m
0.968 * [taylor]: Taking taylor expansion of 0 in k
0.968 * [taylor]: Taking taylor expansion of 0 in m
0.968 * [taylor]: Taking taylor expansion of 0 in m
0.978 * [taylor]: Taking taylor expansion of (- (* 99.0 (exp (* -1 (/ (- (log -1) (log k)) m))))) in m
0.978 * [taylor]: Taking taylor expansion of (* 99.0 (exp (* -1 (/ (- (log -1) (log k)) m)))) in m
0.978 * [taylor]: Taking taylor expansion of 99.0 in m
0.978 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
0.978 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
0.978 * [taylor]: Taking taylor expansion of -1 in m
0.978 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
0.978 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
0.978 * [taylor]: Taking taylor expansion of (log -1) in m
0.978 * [taylor]: Taking taylor expansion of -1 in m
0.978 * [taylor]: Taking taylor expansion of (log k) in m
0.978 * [taylor]: Taking taylor expansion of k in m
0.978 * [taylor]: Taking taylor expansion of m in m
0.982 * * * * [progress]: [ 2 / 3 ] generating series at (2 2)
0.983 * [approximate]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in (k) around 0
0.983 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
0.983 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
0.983 * [taylor]: Taking taylor expansion of 10.0 in k
0.983 * [taylor]: Taking taylor expansion of k in k
0.983 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
0.983 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.983 * [taylor]: Taking taylor expansion of k in k
0.983 * [taylor]: Taking taylor expansion of 1.0 in k
0.983 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
0.983 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
0.983 * [taylor]: Taking taylor expansion of 10.0 in k
0.983 * [taylor]: Taking taylor expansion of k in k
0.983 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
0.983 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.983 * [taylor]: Taking taylor expansion of k in k
0.983 * [taylor]: Taking taylor expansion of 1.0 in k
0.987 * [approximate]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in (k) around 0
0.987 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
0.987 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.987 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.987 * [taylor]: Taking taylor expansion of k in k
0.987 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
0.987 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.987 * [taylor]: Taking taylor expansion of 10.0 in k
0.987 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.987 * [taylor]: Taking taylor expansion of k in k
0.988 * [taylor]: Taking taylor expansion of 1.0 in k
0.988 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
0.988 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.988 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.988 * [taylor]: Taking taylor expansion of k in k
0.988 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
0.988 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.988 * [taylor]: Taking taylor expansion of 10.0 in k
0.988 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.988 * [taylor]: Taking taylor expansion of k in k
0.989 * [taylor]: Taking taylor expansion of 1.0 in k
0.993 * [approximate]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in (k) around 0
0.993 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
0.993 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
0.993 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.993 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.993 * [taylor]: Taking taylor expansion of k in k
0.994 * [taylor]: Taking taylor expansion of 1.0 in k
0.994 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.994 * [taylor]: Taking taylor expansion of 10.0 in k
0.994 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.994 * [taylor]: Taking taylor expansion of k in k
0.994 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
0.994 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
0.994 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
0.994 * [taylor]: Taking taylor expansion of (pow k 2) in k
0.994 * [taylor]: Taking taylor expansion of k in k
0.995 * [taylor]: Taking taylor expansion of 1.0 in k
0.995 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
0.995 * [taylor]: Taking taylor expansion of 10.0 in k
0.995 * [taylor]: Taking taylor expansion of (/ 1 k) in k
0.995 * [taylor]: Taking taylor expansion of k in k
1.001 * * * * [progress]: [ 3 / 3 ] generating series at (2 2 1)
1.001 * [approximate]: Taking taylor expansion of (+ (* 10.0 k) 1.0) in (k) around 0
1.001 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) 1.0) in k
1.001 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
1.001 * [taylor]: Taking taylor expansion of 10.0 in k
1.001 * [taylor]: Taking taylor expansion of k in k
1.001 * [taylor]: Taking taylor expansion of 1.0 in k
1.001 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) 1.0) in k
1.001 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
1.001 * [taylor]: Taking taylor expansion of 10.0 in k
1.001 * [taylor]: Taking taylor expansion of k in k
1.001 * [taylor]: Taking taylor expansion of 1.0 in k
1.009 * [approximate]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in (k) around 0
1.009 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
1.009 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.009 * [taylor]: Taking taylor expansion of 10.0 in k
1.009 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.009 * [taylor]: Taking taylor expansion of k in k
1.009 * [taylor]: Taking taylor expansion of 1.0 in k
1.009 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
1.009 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.009 * [taylor]: Taking taylor expansion of 10.0 in k
1.009 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.009 * [taylor]: Taking taylor expansion of k in k
1.010 * [taylor]: Taking taylor expansion of 1.0 in k
1.020 * [approximate]: Taking taylor expansion of (- 1.0 (* 10.0 (/ 1 k))) in (k) around 0
1.020 * [taylor]: Taking taylor expansion of (- 1.0 (* 10.0 (/ 1 k))) in k
1.020 * [taylor]: Taking taylor expansion of 1.0 in k
1.020 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.020 * [taylor]: Taking taylor expansion of 10.0 in k
1.020 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.020 * [taylor]: Taking taylor expansion of k in k
1.021 * [taylor]: Taking taylor expansion of (- 1.0 (* 10.0 (/ 1 k))) in k
1.021 * [taylor]: Taking taylor expansion of 1.0 in k
1.021 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.021 * [taylor]: Taking taylor expansion of 10.0 in k
1.021 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.021 * [taylor]: Taking taylor expansion of k in k
1.034 * * * [progress]: simplifying candidates
1.035 * [simplify]: Simplifying using  #<procedure:simplify-batch-egg> :
   (- (+ (log a) (* (log k) m)) (log (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (- (+ (log a) (* (log k) m)) (log (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (- (+ (log a) (log (pow k m))) (log (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (- (log (* a (pow k m))) (log (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (log (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (exp (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (/ (* (* (* a a) a) (* (* (pow k m) (pow k m)) (pow k m))) (* (* (+ (+ 1.0 (* 10.0 k)) (* k k)) (+ (+ 1.0 (* 10.0 k)) (* k k))) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (/ (* (* (* a (pow k m)) (* a (pow k m))) (* a (pow k m))) (* (* (+ (+ 1.0 (* 10.0 k)) (* k k)) (+ (+ 1.0 (* 10.0 k)) (* k k))) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (* (cbrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k)))) (cbrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k)))))
  (cbrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (* (* (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))) (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k)))) (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (sqrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (sqrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (- (* a (pow k m)))
  (- (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (/ a (* (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))) (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k)))))
  (/ (pow k m) (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (/ a (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (/ (pow k m) (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (/ a 1)
  (/ (pow k m) (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (/ 1 (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (/ (+ (+ 1.0 (* 10.0 k)) (* k k)) (* a (pow k m)))
  (/ (* a (pow k m)) (* (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))) (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k)))))
  (/ (* a (pow k m)) (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (/ (* a (pow k m)) 1)
  (/ (+ (+ 1.0 (* 10.0 k)) (* k k)) (pow k m))
  (/ (* a (pow k m)) (+ (pow (+ 1.0 (* 10.0 k)) 3) (pow (* k k) 3)))
  (/ (* a (pow k m)) (- (* (+ 1.0 (* 10.0 k)) (+ 1.0 (* 10.0 k))) (* (* k k) (* k k))))
  (* (* (exp 1.0) (exp (* 10.0 k))) (exp (* k k)))
  (* (exp (+ 1.0 (* 10.0 k))) (exp (* k k)))
  (log (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (exp (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (* (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))) (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (* (* (+ (+ 1.0 (* 10.0 k)) (* k k)) (+ (+ 1.0 (* 10.0 k)) (* k k))) (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (+ (pow (+ 1.0 (* 10.0 k)) 3) (pow (* k k) 3))
  (+ (* (+ 1.0 (* 10.0 k)) (+ 1.0 (* 10.0 k))) (- (* (* k k) (* k k)) (* (+ 1.0 (* 10.0 k)) (* k k))))
  (- (* (+ 1.0 (* 10.0 k)) (+ 1.0 (* 10.0 k))) (* (* k k) (* k k)))
  (- (+ 1.0 (* 10.0 k)) (* k k))
  (+ (* 10.0 k) (* k k))
  (* (exp 1.0) (exp (* 10.0 k)))
  (log (+ 1.0 (* 10.0 k)))
  (exp (+ 1.0 (* 10.0 k)))
  (* (cbrt (+ 1.0 (* 10.0 k))) (cbrt (+ 1.0 (* 10.0 k))))
  (cbrt (+ 1.0 (* 10.0 k)))
  (* (* (+ 1.0 (* 10.0 k)) (+ 1.0 (* 10.0 k))) (+ 1.0 (* 10.0 k)))
  (sqrt (+ 1.0 (* 10.0 k)))
  (sqrt (+ 1.0 (* 10.0 k)))
  (+ (pow 1.0 3) (pow (* 10.0 k) 3))
  (+ (* 1.0 1.0) (- (* (* 10.0 k) (* 10.0 k)) (* 1.0 (* 10.0 k))))
  (- (* 1.0 1.0) (* (* 10.0 k) (* 10.0 k)))
  (- 1.0 (* 10.0 k))
  (- (+ (* 1.0 (* a (* m (log k)))) (* 1.0 a)) (* 10.0 (* k a)))
  (- (+ (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 2)) (* 99.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 4)))) (* 10.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 3))))
  (- (+ (* 99.0 (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 4))) (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 2))) (* 10.0 (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 3))))
  (+ (* 10.0 k) (+ (pow k 2) 1.0))
  (+ (* 10.0 k) (+ (pow k 2) 1.0))
  (+ (* 10.0 k) (+ (pow k 2) 1.0))
  (+ (* 10.0 k) 1.0)
  (+ (* 10.0 k) 1.0)
  (+ (* 10.0 k) 1.0)
1.044 * * [simplify]: iteration  0 :  404  enodes  (cost  484 )
1.052 * * [simplify]: iteration  1 :  1787  enodes  (cost  427 )
1.083 * * [simplify]: iteration  2 :  5001  enodes  (cost  418 )
1.085 * [simplify]: Simplified to:
   (log (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (log (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (log (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (log (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (log (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (pow (exp (/ a (+ 1.0 (* k (+ 10.0 k))))) (pow k m))
  (pow (/ (pow k m) (/ (+ 1.0 (* k (+ 10.0 k))) a)) 3)
  (pow (/ (pow k m) (/ (+ 1.0 (* k (+ 10.0 k))) a)) 3)
  (* (cbrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k)))) (cbrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k)))))
  (cbrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (pow (/ (pow k m) (/ (+ 1.0 (* k (+ 10.0 k))) a)) 3)
  (sqrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (sqrt (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (- (* a (pow k m)))
  (- (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (/ a (* (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))) (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k)))))
  (/ (pow k m) (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (/ a (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (/ (pow k m) (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  a
  (/ (pow k m) (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (/ 1 (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))
  (/ (* a (pow k m)) (* (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))) (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k)))))
  (/ (* a (pow k m)) (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (* a (pow k m))
  (/ (+ (+ 1.0 (* 10.0 k)) (* k k)) (pow k m))
  (/ (* a (pow k m)) (+ (pow (+ 1.0 (* 10.0 k)) 3) (pow (* k k) 3)))
  (* (/ (pow k m) (* (+ (* k (- 10.0 k)) 1.0) (+ 1.0 (* k (+ 10.0 k))))) a)
  (exp (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (exp (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (log (* (+ 1.0 (* k (+ 10.0 k))) 1))
  (exp (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (* (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))) (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k))))
  (cbrt (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (pow (+ 1.0 (* k (+ 10.0 k))) 3)
  (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (sqrt (+ (+ 1.0 (* 10.0 k)) (* k k)))
  (+ (pow (+ 1.0 (* 10.0 k)) 3) (pow (* k k) 3))
  (+ (* (pow k 2) (- (pow k 2) (+ 1.0 (* 10.0 k)))) (* (+ 1.0 (* 10.0 k)) (+ 1.0 (* 10.0 k))))
  (* (+ (* k (- 10.0 k)) 1.0) (+ 1.0 (* k (+ 10.0 k))))
  (+ (* k (- 10.0 k)) 1.0)
  (* k (+ 10.0 k))
  (exp (+ 1.0 (* 10.0 k)))
  (log (+ 1.0 (* 10.0 k)))
  (exp (+ 1.0 (* 10.0 k)))
  (* (cbrt (+ 1.0 (* 10.0 k))) (cbrt (+ 1.0 (* 10.0 k))))
  (cbrt (+ 1.0 (* 10.0 k)))
  (pow (+ 1.0 (* 10.0 k)) 3)
  (sqrt (+ 1.0 (* 10.0 k)))
  (sqrt (+ 1.0 (* 10.0 k)))
  (+ (pow 1.0 3) (pow (* 10.0 k) 3))
  (+ (* (* 10.0 k) (- (* 10.0 k) 1.0)) (* 1.0 1.0))
  (- (* 1.0 1.0) (* (* 10.0 k) (* 10.0 k)))
  (- 1.0 (* 10.0 k))
  (* a (+ (* 1.0 (log (pow k m))) (- 1.0 (* 10.0 k))))
  (- (+ (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 2)) (* 99.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 4)))) (* 10.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 3))))
  (- (+ (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 2)) (* 99.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 4)))) (* 10.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 3))))
  (+ 1.0 (* k (+ 10.0 k)))
  (+ 1.0 (* k (+ 10.0 k)))
  (+ 1.0 (* k (+ 10.0 k)))
  (+ 1.0 (* 10.0 k))
  (+ 1.0 (* 10.0 k))
  (+ 1.0 (* 10.0 k))
1.085 * * * [progress]: adding candidates to table
1.218 * * [progress]: iteration 3 / 4
1.218 * * * [progress]: picking best candidate
1.220 * * * * [pick]: Picked  #<alt (λ (a k m) (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))>
1.220 * * * [progress]: localizing error
1.235 * * * [progress]: generating rewritten candidates
1.236 * * * * [progress]: [ 1 / 3 ] rewriting at (2 2 1)
1.245 * * * * [progress]: [ 2 / 3 ] rewriting at (2)
1.271 * * * * [progress]: [ 3 / 3 ] rewriting at (2 2 1 1 2)
1.326 * * * [progress]: generating series expansions
1.326 * * * * [progress]: [ 1 / 3 ] generating series at (2 2 1)
1.326 * [approximate]: Taking taylor expansion of (/ (+ (* 10.0 k) (+ (pow k 2) 1.0)) a) in (k a) around 0
1.326 * [taylor]: Taking taylor expansion of (/ (+ (* 10.0 k) (+ (pow k 2) 1.0)) a) in a
1.326 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in a
1.326 * [taylor]: Taking taylor expansion of (* 10.0 k) in a
1.326 * [taylor]: Taking taylor expansion of 10.0 in a
1.326 * [taylor]: Taking taylor expansion of k in a
1.326 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in a
1.326 * [taylor]: Taking taylor expansion of (pow k 2) in a
1.327 * [taylor]: Taking taylor expansion of k in a
1.327 * [taylor]: Taking taylor expansion of 1.0 in a
1.327 * [taylor]: Taking taylor expansion of a in a
1.327 * [taylor]: Taking taylor expansion of (/ (+ (* 10.0 k) (+ (pow k 2) 1.0)) a) in k
1.327 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
1.327 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
1.327 * [taylor]: Taking taylor expansion of 10.0 in k
1.327 * [taylor]: Taking taylor expansion of k in k
1.327 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
1.327 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.327 * [taylor]: Taking taylor expansion of k in k
1.327 * [taylor]: Taking taylor expansion of 1.0 in k
1.327 * [taylor]: Taking taylor expansion of a in k
1.328 * [taylor]: Taking taylor expansion of (/ (+ (* 10.0 k) (+ (pow k 2) 1.0)) a) in k
1.328 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
1.328 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
1.328 * [taylor]: Taking taylor expansion of 10.0 in k
1.328 * [taylor]: Taking taylor expansion of k in k
1.328 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
1.329 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.329 * [taylor]: Taking taylor expansion of k in k
1.329 * [taylor]: Taking taylor expansion of 1.0 in k
1.329 * [taylor]: Taking taylor expansion of a in k
1.330 * [taylor]: Taking taylor expansion of (/ 1.0 a) in a
1.330 * [taylor]: Taking taylor expansion of 1.0 in a
1.330 * [taylor]: Taking taylor expansion of a in a
1.331 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 a)) in a
1.331 * [taylor]: Taking taylor expansion of 10.0 in a
1.331 * [taylor]: Taking taylor expansion of (/ 1 a) in a
1.331 * [taylor]: Taking taylor expansion of a in a
1.334 * [taylor]: Taking taylor expansion of (/ 1 a) in a
1.334 * [taylor]: Taking taylor expansion of a in a
1.335 * [approximate]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in (k a) around 0
1.335 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in a
1.335 * [taylor]: Taking taylor expansion of a in a
1.335 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in a
1.335 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
1.335 * [taylor]: Taking taylor expansion of (pow k 2) in a
1.335 * [taylor]: Taking taylor expansion of k in a
1.335 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in a
1.335 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
1.335 * [taylor]: Taking taylor expansion of 10.0 in a
1.335 * [taylor]: Taking taylor expansion of (/ 1 k) in a
1.335 * [taylor]: Taking taylor expansion of k in a
1.335 * [taylor]: Taking taylor expansion of 1.0 in a
1.335 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
1.335 * [taylor]: Taking taylor expansion of a in k
1.335 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
1.335 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
1.335 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.335 * [taylor]: Taking taylor expansion of k in k
1.336 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
1.336 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.336 * [taylor]: Taking taylor expansion of 10.0 in k
1.336 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.336 * [taylor]: Taking taylor expansion of k in k
1.336 * [taylor]: Taking taylor expansion of 1.0 in k
1.336 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
1.336 * [taylor]: Taking taylor expansion of a in k
1.336 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
1.336 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
1.336 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.336 * [taylor]: Taking taylor expansion of k in k
1.337 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
1.337 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.337 * [taylor]: Taking taylor expansion of 10.0 in k
1.337 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.337 * [taylor]: Taking taylor expansion of k in k
1.337 * [taylor]: Taking taylor expansion of 1.0 in k
1.338 * [taylor]: Taking taylor expansion of a in a
1.340 * [taylor]: Taking taylor expansion of (* 10.0 a) in a
1.340 * [taylor]: Taking taylor expansion of 10.0 in a
1.340 * [taylor]: Taking taylor expansion of a in a
1.343 * [taylor]: Taking taylor expansion of (* 1.0 a) in a
1.343 * [taylor]: Taking taylor expansion of 1.0 in a
1.343 * [taylor]: Taking taylor expansion of a in a
1.348 * [taylor]: Taking taylor expansion of 0 in a
1.349 * [approximate]: Taking taylor expansion of (* -1 (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in (k a) around 0
1.349 * [taylor]: Taking taylor expansion of (* -1 (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in a
1.349 * [taylor]: Taking taylor expansion of -1 in a
1.349 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in a
1.349 * [taylor]: Taking taylor expansion of a in a
1.349 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in a
1.349 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in a
1.349 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
1.349 * [taylor]: Taking taylor expansion of (pow k 2) in a
1.349 * [taylor]: Taking taylor expansion of k in a
1.349 * [taylor]: Taking taylor expansion of 1.0 in a
1.349 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
1.349 * [taylor]: Taking taylor expansion of 10.0 in a
1.349 * [taylor]: Taking taylor expansion of (/ 1 k) in a
1.349 * [taylor]: Taking taylor expansion of k in a
1.350 * [taylor]: Taking taylor expansion of (* -1 (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in k
1.350 * [taylor]: Taking taylor expansion of -1 in k
1.350 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
1.350 * [taylor]: Taking taylor expansion of a in k
1.350 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
1.350 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
1.350 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
1.350 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.350 * [taylor]: Taking taylor expansion of k in k
1.350 * [taylor]: Taking taylor expansion of 1.0 in k
1.350 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.350 * [taylor]: Taking taylor expansion of 10.0 in k
1.350 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.350 * [taylor]: Taking taylor expansion of k in k
1.351 * [taylor]: Taking taylor expansion of (* -1 (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in k
1.351 * [taylor]: Taking taylor expansion of -1 in k
1.351 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
1.351 * [taylor]: Taking taylor expansion of a in k
1.351 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
1.351 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
1.351 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
1.351 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.351 * [taylor]: Taking taylor expansion of k in k
1.351 * [taylor]: Taking taylor expansion of 1.0 in k
1.351 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.351 * [taylor]: Taking taylor expansion of 10.0 in k
1.351 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.351 * [taylor]: Taking taylor expansion of k in k
1.352 * [taylor]: Taking taylor expansion of (* -1 a) in a
1.352 * [taylor]: Taking taylor expansion of -1 in a
1.352 * [taylor]: Taking taylor expansion of a in a
1.355 * [taylor]: Taking taylor expansion of (* 10.0 a) in a
1.355 * [taylor]: Taking taylor expansion of 10.0 in a
1.355 * [taylor]: Taking taylor expansion of a in a
1.359 * [taylor]: Taking taylor expansion of (- (* 1.0 a)) in a
1.359 * [taylor]: Taking taylor expansion of (* 1.0 a) in a
1.359 * [taylor]: Taking taylor expansion of 1.0 in a
1.359 * [taylor]: Taking taylor expansion of a in a
1.365 * [taylor]: Taking taylor expansion of 0 in a
1.367 * * * * [progress]: [ 2 / 3 ] generating series at (2)
1.367 * [approximate]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in (k a m) around 0
1.367 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in m
1.367 * [taylor]: Taking taylor expansion of (* a (pow k m)) in m
1.367 * [taylor]: Taking taylor expansion of a in m
1.367 * [taylor]: Taking taylor expansion of (pow k m) in m
1.367 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
1.367 * [taylor]: Taking taylor expansion of (* m (log k)) in m
1.367 * [taylor]: Taking taylor expansion of m in m
1.367 * [taylor]: Taking taylor expansion of (log k) in m
1.367 * [taylor]: Taking taylor expansion of k in m
1.368 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in m
1.368 * [taylor]: Taking taylor expansion of (* 10.0 k) in m
1.368 * [taylor]: Taking taylor expansion of 10.0 in m
1.368 * [taylor]: Taking taylor expansion of k in m
1.368 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in m
1.368 * [taylor]: Taking taylor expansion of (pow k 2) in m
1.368 * [taylor]: Taking taylor expansion of k in m
1.368 * [taylor]: Taking taylor expansion of 1.0 in m
1.369 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in a
1.369 * [taylor]: Taking taylor expansion of (* a (pow k m)) in a
1.369 * [taylor]: Taking taylor expansion of a in a
1.369 * [taylor]: Taking taylor expansion of (pow k m) in a
1.369 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in a
1.369 * [taylor]: Taking taylor expansion of (* m (log k)) in a
1.369 * [taylor]: Taking taylor expansion of m in a
1.369 * [taylor]: Taking taylor expansion of (log k) in a
1.369 * [taylor]: Taking taylor expansion of k in a
1.369 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in a
1.369 * [taylor]: Taking taylor expansion of (* 10.0 k) in a
1.369 * [taylor]: Taking taylor expansion of 10.0 in a
1.369 * [taylor]: Taking taylor expansion of k in a
1.369 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in a
1.369 * [taylor]: Taking taylor expansion of (pow k 2) in a
1.369 * [taylor]: Taking taylor expansion of k in a
1.369 * [taylor]: Taking taylor expansion of 1.0 in a
1.371 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in k
1.371 * [taylor]: Taking taylor expansion of (* a (pow k m)) in k
1.371 * [taylor]: Taking taylor expansion of a in k
1.371 * [taylor]: Taking taylor expansion of (pow k m) in k
1.371 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in k
1.371 * [taylor]: Taking taylor expansion of (* m (log k)) in k
1.371 * [taylor]: Taking taylor expansion of m in k
1.371 * [taylor]: Taking taylor expansion of (log k) in k
1.371 * [taylor]: Taking taylor expansion of k in k
1.372 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
1.372 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
1.372 * [taylor]: Taking taylor expansion of 10.0 in k
1.372 * [taylor]: Taking taylor expansion of k in k
1.372 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
1.372 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.372 * [taylor]: Taking taylor expansion of k in k
1.372 * [taylor]: Taking taylor expansion of 1.0 in k
1.373 * [taylor]: Taking taylor expansion of (/ (* a (pow k m)) (+ (* 10.0 k) (+ (pow k 2) 1.0))) in k
1.373 * [taylor]: Taking taylor expansion of (* a (pow k m)) in k
1.373 * [taylor]: Taking taylor expansion of a in k
1.373 * [taylor]: Taking taylor expansion of (pow k m) in k
1.373 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in k
1.373 * [taylor]: Taking taylor expansion of (* m (log k)) in k
1.373 * [taylor]: Taking taylor expansion of m in k
1.373 * [taylor]: Taking taylor expansion of (log k) in k
1.373 * [taylor]: Taking taylor expansion of k in k
1.374 * [taylor]: Taking taylor expansion of (+ (* 10.0 k) (+ (pow k 2) 1.0)) in k
1.374 * [taylor]: Taking taylor expansion of (* 10.0 k) in k
1.374 * [taylor]: Taking taylor expansion of 10.0 in k
1.374 * [taylor]: Taking taylor expansion of k in k
1.374 * [taylor]: Taking taylor expansion of (+ (pow k 2) 1.0) in k
1.374 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.374 * [taylor]: Taking taylor expansion of k in k
1.374 * [taylor]: Taking taylor expansion of 1.0 in k
1.375 * [taylor]: Taking taylor expansion of (* 1.0 (* a (pow k m))) in a
1.375 * [taylor]: Taking taylor expansion of 1.0 in a
1.375 * [taylor]: Taking taylor expansion of (* a (pow k m)) in a
1.375 * [taylor]: Taking taylor expansion of a in a
1.375 * [taylor]: Taking taylor expansion of (pow k m) in a
1.375 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in a
1.375 * [taylor]: Taking taylor expansion of (* m (log k)) in a
1.375 * [taylor]: Taking taylor expansion of m in a
1.375 * [taylor]: Taking taylor expansion of (log k) in a
1.375 * [taylor]: Taking taylor expansion of k in a
1.377 * [taylor]: Taking taylor expansion of (* 1.0 (pow k m)) in m
1.377 * [taylor]: Taking taylor expansion of 1.0 in m
1.377 * [taylor]: Taking taylor expansion of (pow k m) in m
1.377 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
1.377 * [taylor]: Taking taylor expansion of (* m (log k)) in m
1.377 * [taylor]: Taking taylor expansion of m in m
1.377 * [taylor]: Taking taylor expansion of (log k) in m
1.377 * [taylor]: Taking taylor expansion of k in m
1.382 * [taylor]: Taking taylor expansion of (- (* 10.0 (* a (pow k m)))) in a
1.382 * [taylor]: Taking taylor expansion of (* 10.0 (* a (pow k m))) in a
1.382 * [taylor]: Taking taylor expansion of 10.0 in a
1.382 * [taylor]: Taking taylor expansion of (* a (pow k m)) in a
1.382 * [taylor]: Taking taylor expansion of a in a
1.382 * [taylor]: Taking taylor expansion of (pow k m) in a
1.382 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in a
1.382 * [taylor]: Taking taylor expansion of (* m (log k)) in a
1.382 * [taylor]: Taking taylor expansion of m in a
1.382 * [taylor]: Taking taylor expansion of (log k) in a
1.382 * [taylor]: Taking taylor expansion of k in a
1.384 * [taylor]: Taking taylor expansion of (- (* 10.0 (pow k m))) in m
1.384 * [taylor]: Taking taylor expansion of (* 10.0 (pow k m)) in m
1.384 * [taylor]: Taking taylor expansion of 10.0 in m
1.384 * [taylor]: Taking taylor expansion of (pow k m) in m
1.384 * [taylor]: Taking taylor expansion of (exp (* m (log k))) in m
1.384 * [taylor]: Taking taylor expansion of (* m (log k)) in m
1.384 * [taylor]: Taking taylor expansion of m in m
1.384 * [taylor]: Taking taylor expansion of (log k) in m
1.384 * [taylor]: Taking taylor expansion of k in m
1.389 * [taylor]: Taking taylor expansion of 0 in m
1.394 * [approximate]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in (k a m) around 0
1.394 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in m
1.395 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in m
1.395 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in m
1.395 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in m
1.395 * [taylor]: Taking taylor expansion of (/ 1 m) in m
1.395 * [taylor]: Taking taylor expansion of m in m
1.395 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in m
1.395 * [taylor]: Taking taylor expansion of (/ 1 k) in m
1.395 * [taylor]: Taking taylor expansion of k in m
1.395 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in m
1.395 * [taylor]: Taking taylor expansion of a in m
1.395 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in m
1.395 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in m
1.395 * [taylor]: Taking taylor expansion of (pow k 2) in m
1.395 * [taylor]: Taking taylor expansion of k in m
1.395 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in m
1.395 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in m
1.396 * [taylor]: Taking taylor expansion of 10.0 in m
1.396 * [taylor]: Taking taylor expansion of (/ 1 k) in m
1.396 * [taylor]: Taking taylor expansion of k in m
1.396 * [taylor]: Taking taylor expansion of 1.0 in m
1.396 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in a
1.396 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in a
1.396 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in a
1.396 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in a
1.396 * [taylor]: Taking taylor expansion of (/ 1 m) in a
1.396 * [taylor]: Taking taylor expansion of m in a
1.396 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in a
1.396 * [taylor]: Taking taylor expansion of (/ 1 k) in a
1.396 * [taylor]: Taking taylor expansion of k in a
1.397 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in a
1.397 * [taylor]: Taking taylor expansion of a in a
1.397 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in a
1.397 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
1.397 * [taylor]: Taking taylor expansion of (pow k 2) in a
1.397 * [taylor]: Taking taylor expansion of k in a
1.397 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in a
1.397 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
1.397 * [taylor]: Taking taylor expansion of 10.0 in a
1.397 * [taylor]: Taking taylor expansion of (/ 1 k) in a
1.397 * [taylor]: Taking taylor expansion of k in a
1.397 * [taylor]: Taking taylor expansion of 1.0 in a
1.399 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in k
1.399 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in k
1.399 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in k
1.399 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in k
1.399 * [taylor]: Taking taylor expansion of (/ 1 m) in k
1.399 * [taylor]: Taking taylor expansion of m in k
1.399 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in k
1.399 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.399 * [taylor]: Taking taylor expansion of k in k
1.400 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
1.400 * [taylor]: Taking taylor expansion of a in k
1.400 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
1.400 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
1.400 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.400 * [taylor]: Taking taylor expansion of k in k
1.401 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
1.401 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.401 * [taylor]: Taking taylor expansion of 10.0 in k
1.401 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.401 * [taylor]: Taking taylor expansion of k in k
1.401 * [taylor]: Taking taylor expansion of 1.0 in k
1.401 * [taylor]: Taking taylor expansion of (/ (pow (/ 1 k) (/ 1 m)) (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)))) in k
1.401 * [taylor]: Taking taylor expansion of (pow (/ 1 k) (/ 1 m)) in k
1.401 * [taylor]: Taking taylor expansion of (exp (* (/ 1 m) (log (/ 1 k)))) in k
1.401 * [taylor]: Taking taylor expansion of (* (/ 1 m) (log (/ 1 k))) in k
1.401 * [taylor]: Taking taylor expansion of (/ 1 m) in k
1.401 * [taylor]: Taking taylor expansion of m in k
1.401 * [taylor]: Taking taylor expansion of (log (/ 1 k)) in k
1.401 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.401 * [taylor]: Taking taylor expansion of k in k
1.402 * [taylor]: Taking taylor expansion of (* a (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0))) in k
1.402 * [taylor]: Taking taylor expansion of a in k
1.402 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) (+ (* 10.0 (/ 1 k)) 1.0)) in k
1.402 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
1.402 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.402 * [taylor]: Taking taylor expansion of k in k
1.403 * [taylor]: Taking taylor expansion of (+ (* 10.0 (/ 1 k)) 1.0) in k
1.403 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.403 * [taylor]: Taking taylor expansion of 10.0 in k
1.403 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.403 * [taylor]: Taking taylor expansion of k in k
1.403 * [taylor]: Taking taylor expansion of 1.0 in k
1.404 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log k) m))) a) in a
1.404 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in a
1.404 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in a
1.404 * [taylor]: Taking taylor expansion of -1 in a
1.404 * [taylor]: Taking taylor expansion of (/ (log k) m) in a
1.404 * [taylor]: Taking taylor expansion of (log k) in a
1.404 * [taylor]: Taking taylor expansion of k in a
1.404 * [taylor]: Taking taylor expansion of m in a
1.404 * [taylor]: Taking taylor expansion of a in a
1.404 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
1.404 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
1.404 * [taylor]: Taking taylor expansion of -1 in m
1.404 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
1.404 * [taylor]: Taking taylor expansion of (log k) in m
1.404 * [taylor]: Taking taylor expansion of k in m
1.404 * [taylor]: Taking taylor expansion of m in m
1.409 * [taylor]: Taking taylor expansion of (- (* 10.0 (/ (exp (* -1 (/ (log k) m))) a))) in a
1.409 * [taylor]: Taking taylor expansion of (* 10.0 (/ (exp (* -1 (/ (log k) m))) a)) in a
1.409 * [taylor]: Taking taylor expansion of 10.0 in a
1.409 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log k) m))) a) in a
1.409 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in a
1.409 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in a
1.409 * [taylor]: Taking taylor expansion of -1 in a
1.409 * [taylor]: Taking taylor expansion of (/ (log k) m) in a
1.409 * [taylor]: Taking taylor expansion of (log k) in a
1.409 * [taylor]: Taking taylor expansion of k in a
1.409 * [taylor]: Taking taylor expansion of m in a
1.409 * [taylor]: Taking taylor expansion of a in a
1.409 * [taylor]: Taking taylor expansion of (- (* 10.0 (exp (* -1 (/ (log k) m))))) in m
1.409 * [taylor]: Taking taylor expansion of (* 10.0 (exp (* -1 (/ (log k) m)))) in m
1.409 * [taylor]: Taking taylor expansion of 10.0 in m
1.409 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
1.409 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
1.409 * [taylor]: Taking taylor expansion of -1 in m
1.409 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
1.409 * [taylor]: Taking taylor expansion of (log k) in m
1.409 * [taylor]: Taking taylor expansion of k in m
1.409 * [taylor]: Taking taylor expansion of m in m
1.412 * [taylor]: Taking taylor expansion of 0 in m
1.418 * [taylor]: Taking taylor expansion of (* 99.0 (/ (exp (* -1 (/ (log k) m))) a)) in a
1.418 * [taylor]: Taking taylor expansion of 99.0 in a
1.418 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (log k) m))) a) in a
1.418 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in a
1.418 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in a
1.418 * [taylor]: Taking taylor expansion of -1 in a
1.418 * [taylor]: Taking taylor expansion of (/ (log k) m) in a
1.418 * [taylor]: Taking taylor expansion of (log k) in a
1.418 * [taylor]: Taking taylor expansion of k in a
1.418 * [taylor]: Taking taylor expansion of m in a
1.419 * [taylor]: Taking taylor expansion of a in a
1.419 * [taylor]: Taking taylor expansion of (* 99.0 (exp (* -1 (/ (log k) m)))) in m
1.419 * [taylor]: Taking taylor expansion of 99.0 in m
1.419 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (log k) m))) in m
1.419 * [taylor]: Taking taylor expansion of (* -1 (/ (log k) m)) in m
1.419 * [taylor]: Taking taylor expansion of -1 in m
1.419 * [taylor]: Taking taylor expansion of (/ (log k) m) in m
1.419 * [taylor]: Taking taylor expansion of (log k) in m
1.419 * [taylor]: Taking taylor expansion of k in m
1.419 * [taylor]: Taking taylor expansion of m in m
1.420 * [approximate]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in (k a m) around 0
1.420 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in m
1.420 * [taylor]: Taking taylor expansion of -1 in m
1.420 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in m
1.420 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in m
1.420 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in m
1.421 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in m
1.421 * [taylor]: Taking taylor expansion of (/ -1 m) in m
1.421 * [taylor]: Taking taylor expansion of -1 in m
1.421 * [taylor]: Taking taylor expansion of m in m
1.421 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in m
1.421 * [taylor]: Taking taylor expansion of (/ -1 k) in m
1.421 * [taylor]: Taking taylor expansion of -1 in m
1.421 * [taylor]: Taking taylor expansion of k in m
1.421 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in m
1.421 * [taylor]: Taking taylor expansion of a in m
1.421 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in m
1.421 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in m
1.421 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in m
1.421 * [taylor]: Taking taylor expansion of (pow k 2) in m
1.421 * [taylor]: Taking taylor expansion of k in m
1.421 * [taylor]: Taking taylor expansion of 1.0 in m
1.421 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in m
1.421 * [taylor]: Taking taylor expansion of 10.0 in m
1.421 * [taylor]: Taking taylor expansion of (/ 1 k) in m
1.421 * [taylor]: Taking taylor expansion of k in m
1.422 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in a
1.422 * [taylor]: Taking taylor expansion of -1 in a
1.422 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in a
1.422 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in a
1.422 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in a
1.422 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in a
1.422 * [taylor]: Taking taylor expansion of (/ -1 m) in a
1.422 * [taylor]: Taking taylor expansion of -1 in a
1.422 * [taylor]: Taking taylor expansion of m in a
1.422 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in a
1.422 * [taylor]: Taking taylor expansion of (/ -1 k) in a
1.422 * [taylor]: Taking taylor expansion of -1 in a
1.422 * [taylor]: Taking taylor expansion of k in a
1.423 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in a
1.423 * [taylor]: Taking taylor expansion of a in a
1.423 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in a
1.423 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in a
1.423 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in a
1.423 * [taylor]: Taking taylor expansion of (pow k 2) in a
1.423 * [taylor]: Taking taylor expansion of k in a
1.423 * [taylor]: Taking taylor expansion of 1.0 in a
1.423 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in a
1.423 * [taylor]: Taking taylor expansion of 10.0 in a
1.423 * [taylor]: Taking taylor expansion of (/ 1 k) in a
1.423 * [taylor]: Taking taylor expansion of k in a
1.425 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in k
1.425 * [taylor]: Taking taylor expansion of -1 in k
1.425 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in k
1.425 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in k
1.425 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in k
1.425 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in k
1.425 * [taylor]: Taking taylor expansion of (/ -1 m) in k
1.425 * [taylor]: Taking taylor expansion of -1 in k
1.425 * [taylor]: Taking taylor expansion of m in k
1.425 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in k
1.425 * [taylor]: Taking taylor expansion of (/ -1 k) in k
1.425 * [taylor]: Taking taylor expansion of -1 in k
1.425 * [taylor]: Taking taylor expansion of k in k
1.427 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
1.427 * [taylor]: Taking taylor expansion of a in k
1.427 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
1.427 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
1.427 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
1.427 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.427 * [taylor]: Taking taylor expansion of k in k
1.428 * [taylor]: Taking taylor expansion of 1.0 in k
1.428 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.428 * [taylor]: Taking taylor expansion of 10.0 in k
1.428 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.428 * [taylor]: Taking taylor expansion of k in k
1.429 * [taylor]: Taking taylor expansion of (* -1 (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))))) in k
1.429 * [taylor]: Taking taylor expansion of -1 in k
1.429 * [taylor]: Taking taylor expansion of (/ (pow (/ -1 k) (/ -1 m)) (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))))) in k
1.429 * [taylor]: Taking taylor expansion of (pow (/ -1 k) (/ -1 m)) in k
1.429 * [taylor]: Taking taylor expansion of (exp (* (/ -1 m) (log (/ -1 k)))) in k
1.429 * [taylor]: Taking taylor expansion of (* (/ -1 m) (log (/ -1 k))) in k
1.429 * [taylor]: Taking taylor expansion of (/ -1 m) in k
1.429 * [taylor]: Taking taylor expansion of -1 in k
1.429 * [taylor]: Taking taylor expansion of m in k
1.429 * [taylor]: Taking taylor expansion of (log (/ -1 k)) in k
1.429 * [taylor]: Taking taylor expansion of (/ -1 k) in k
1.429 * [taylor]: Taking taylor expansion of -1 in k
1.429 * [taylor]: Taking taylor expansion of k in k
1.431 * [taylor]: Taking taylor expansion of (* a (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k)))) in k
1.431 * [taylor]: Taking taylor expansion of a in k
1.431 * [taylor]: Taking taylor expansion of (- (+ (/ 1 (pow k 2)) 1.0) (* 10.0 (/ 1 k))) in k
1.431 * [taylor]: Taking taylor expansion of (+ (/ 1 (pow k 2)) 1.0) in k
1.431 * [taylor]: Taking taylor expansion of (/ 1 (pow k 2)) in k
1.431 * [taylor]: Taking taylor expansion of (pow k 2) in k
1.431 * [taylor]: Taking taylor expansion of k in k
1.431 * [taylor]: Taking taylor expansion of 1.0 in k
1.432 * [taylor]: Taking taylor expansion of (* 10.0 (/ 1 k)) in k
1.432 * [taylor]: Taking taylor expansion of 10.0 in k
1.432 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.432 * [taylor]: Taking taylor expansion of k in k
1.433 * [taylor]: Taking taylor expansion of (* -1 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a)) in a
1.433 * [taylor]: Taking taylor expansion of -1 in a
1.433 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a) in a
1.433 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in a
1.433 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in a
1.433 * [taylor]: Taking taylor expansion of -1 in a
1.433 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in a
1.433 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in a
1.433 * [taylor]: Taking taylor expansion of (log -1) in a
1.433 * [taylor]: Taking taylor expansion of -1 in a
1.434 * [taylor]: Taking taylor expansion of (log k) in a
1.434 * [taylor]: Taking taylor expansion of k in a
1.434 * [taylor]: Taking taylor expansion of m in a
1.435 * [taylor]: Taking taylor expansion of a in a
1.436 * [taylor]: Taking taylor expansion of (* -1 (exp (* -1 (/ (- (log -1) (log k)) m)))) in m
1.436 * [taylor]: Taking taylor expansion of -1 in m
1.436 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
1.436 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
1.436 * [taylor]: Taking taylor expansion of -1 in m
1.436 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
1.436 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
1.436 * [taylor]: Taking taylor expansion of (log -1) in m
1.436 * [taylor]: Taking taylor expansion of -1 in m
1.436 * [taylor]: Taking taylor expansion of (log k) in m
1.436 * [taylor]: Taking taylor expansion of k in m
1.436 * [taylor]: Taking taylor expansion of m in m
1.445 * [taylor]: Taking taylor expansion of (- (* 10.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a))) in a
1.445 * [taylor]: Taking taylor expansion of (* 10.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a)) in a
1.445 * [taylor]: Taking taylor expansion of 10.0 in a
1.445 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a) in a
1.445 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in a
1.445 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in a
1.445 * [taylor]: Taking taylor expansion of -1 in a
1.445 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in a
1.445 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in a
1.445 * [taylor]: Taking taylor expansion of (log -1) in a
1.445 * [taylor]: Taking taylor expansion of -1 in a
1.445 * [taylor]: Taking taylor expansion of (log k) in a
1.445 * [taylor]: Taking taylor expansion of k in a
1.445 * [taylor]: Taking taylor expansion of m in a
1.447 * [taylor]: Taking taylor expansion of a in a
1.448 * [taylor]: Taking taylor expansion of (- (* 10.0 (exp (* -1 (/ (- (log -1) (log k)) m))))) in m
1.448 * [taylor]: Taking taylor expansion of (* 10.0 (exp (* -1 (/ (- (log -1) (log k)) m)))) in m
1.448 * [taylor]: Taking taylor expansion of 10.0 in m
1.448 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
1.448 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
1.448 * [taylor]: Taking taylor expansion of -1 in m
1.448 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
1.448 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
1.448 * [taylor]: Taking taylor expansion of (log -1) in m
1.448 * [taylor]: Taking taylor expansion of -1 in m
1.448 * [taylor]: Taking taylor expansion of (log k) in m
1.448 * [taylor]: Taking taylor expansion of k in m
1.448 * [taylor]: Taking taylor expansion of m in m
1.456 * [taylor]: Taking taylor expansion of 0 in m
1.465 * [taylor]: Taking taylor expansion of (- (* 99.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a))) in a
1.465 * [taylor]: Taking taylor expansion of (* 99.0 (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a)) in a
1.465 * [taylor]: Taking taylor expansion of 99.0 in a
1.465 * [taylor]: Taking taylor expansion of (/ (exp (* -1 (/ (- (log -1) (log k)) m))) a) in a
1.466 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in a
1.466 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in a
1.466 * [taylor]: Taking taylor expansion of -1 in a
1.466 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in a
1.466 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in a
1.466 * [taylor]: Taking taylor expansion of (log -1) in a
1.466 * [taylor]: Taking taylor expansion of -1 in a
1.466 * [taylor]: Taking taylor expansion of (log k) in a
1.466 * [taylor]: Taking taylor expansion of k in a
1.466 * [taylor]: Taking taylor expansion of m in a
1.467 * [taylor]: Taking taylor expansion of a in a
1.468 * [taylor]: Taking taylor expansion of (- (* 99.0 (exp (* -1 (/ (- (log -1) (log k)) m))))) in m
1.468 * [taylor]: Taking taylor expansion of (* 99.0 (exp (* -1 (/ (- (log -1) (log k)) m)))) in m
1.468 * [taylor]: Taking taylor expansion of 99.0 in m
1.468 * [taylor]: Taking taylor expansion of (exp (* -1 (/ (- (log -1) (log k)) m))) in m
1.468 * [taylor]: Taking taylor expansion of (* -1 (/ (- (log -1) (log k)) m)) in m
1.468 * [taylor]: Taking taylor expansion of -1 in m
1.468 * [taylor]: Taking taylor expansion of (/ (- (log -1) (log k)) m) in m
1.468 * [taylor]: Taking taylor expansion of (- (log -1) (log k)) in m
1.468 * [taylor]: Taking taylor expansion of (log -1) in m
1.468 * [taylor]: Taking taylor expansion of -1 in m
1.469 * [taylor]: Taking taylor expansion of (log k) in m
1.469 * [taylor]: Taking taylor expansion of k in m
1.469 * [taylor]: Taking taylor expansion of m in m
1.473 * * * * [progress]: [ 3 / 3 ] generating series at (2 2 1 1 2)
1.473 * [approximate]: Taking taylor expansion of (* k (+ k 10.0)) in (k) around 0
1.473 * [taylor]: Taking taylor expansion of (* k (+ k 10.0)) in k
1.473 * [taylor]: Taking taylor expansion of k in k
1.473 * [taylor]: Taking taylor expansion of (+ k 10.0) in k
1.473 * [taylor]: Taking taylor expansion of k in k
1.473 * [taylor]: Taking taylor expansion of 10.0 in k
1.473 * [taylor]: Taking taylor expansion of (* k (+ k 10.0)) in k
1.473 * [taylor]: Taking taylor expansion of k in k
1.473 * [taylor]: Taking taylor expansion of (+ k 10.0) in k
1.473 * [taylor]: Taking taylor expansion of k in k
1.473 * [taylor]: Taking taylor expansion of 10.0 in k
1.485 * [approximate]: Taking taylor expansion of (/ (+ (/ 1 k) 10.0) k) in (k) around 0
1.485 * [taylor]: Taking taylor expansion of (/ (+ (/ 1 k) 10.0) k) in k
1.485 * [taylor]: Taking taylor expansion of (+ (/ 1 k) 10.0) in k
1.485 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.485 * [taylor]: Taking taylor expansion of k in k
1.486 * [taylor]: Taking taylor expansion of 10.0 in k
1.486 * [taylor]: Taking taylor expansion of k in k
1.486 * [taylor]: Taking taylor expansion of (/ (+ (/ 1 k) 10.0) k) in k
1.486 * [taylor]: Taking taylor expansion of (+ (/ 1 k) 10.0) in k
1.486 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.486 * [taylor]: Taking taylor expansion of k in k
1.487 * [taylor]: Taking taylor expansion of 10.0 in k
1.487 * [taylor]: Taking taylor expansion of k in k
1.498 * [approximate]: Taking taylor expansion of (* -1 (/ (- 10.0 (/ 1 k)) k)) in (k) around 0
1.498 * [taylor]: Taking taylor expansion of (* -1 (/ (- 10.0 (/ 1 k)) k)) in k
1.498 * [taylor]: Taking taylor expansion of -1 in k
1.498 * [taylor]: Taking taylor expansion of (/ (- 10.0 (/ 1 k)) k) in k
1.498 * [taylor]: Taking taylor expansion of (- 10.0 (/ 1 k)) in k
1.498 * [taylor]: Taking taylor expansion of 10.0 in k
1.498 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.498 * [taylor]: Taking taylor expansion of k in k
1.498 * [taylor]: Taking taylor expansion of k in k
1.499 * [taylor]: Taking taylor expansion of (* -1 (/ (- 10.0 (/ 1 k)) k)) in k
1.499 * [taylor]: Taking taylor expansion of -1 in k
1.499 * [taylor]: Taking taylor expansion of (/ (- 10.0 (/ 1 k)) k) in k
1.499 * [taylor]: Taking taylor expansion of (- 10.0 (/ 1 k)) in k
1.499 * [taylor]: Taking taylor expansion of 10.0 in k
1.499 * [taylor]: Taking taylor expansion of (/ 1 k) in k
1.499 * [taylor]: Taking taylor expansion of k in k
1.499 * [taylor]: Taking taylor expansion of k in k
1.519 * * * [progress]: simplifying candidates
1.528 * [simplify]: Simplifying using  #<procedure:simplify-batch-egg> :
   (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a))
  (log (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (exp (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (/ (* (* (+ 1.0 (* k (+ 10.0 k))) (+ 1.0 (* k (+ 10.0 k)))) (+ 1.0 (* k (+ 10.0 k)))) (* (* a a) a))
  (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)))
  (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (* (* (/ (+ 1.0 (* k (+ 10.0 k))) a) (/ (+ 1.0 (* k (+ 10.0 k))) a)) (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (- (+ 1.0 (* k (+ 10.0 k))))
  (- a)
  (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a)))
  (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a))
  (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a))
  (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a))
  (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1)
  (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a)
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a)))
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a))
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a))
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a))
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1)
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a)
  (/ 1 (* (cbrt a) (cbrt a)))
  (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a))
  (/ 1 (sqrt a))
  (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a))
  (/ 1 1)
  (/ (+ 1.0 (* k (+ 10.0 k))) a)
  (/ 1 a)
  (/ a (+ 1.0 (* k (+ 10.0 k))))
  (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt a) (cbrt a)))
  (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a))
  (/ (+ 1.0 (* k (+ 10.0 k))) 1)
  (/ a (cbrt (+ 1.0 (* k (+ 10.0 k)))))
  (/ a (sqrt (+ 1.0 (* k (+ 10.0 k)))))
  (/ a (+ 1.0 (* k (+ 10.0 k))))
  (* a (+ (* 1.0 1.0) (- (* (* k (+ 10.0 k)) (* k (+ 10.0 k))) (* 1.0 (* k (+ 10.0 k))))))
  (* a (- 1.0 (* k (+ 10.0 k))))
  (- 1)
  (- (- (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a)) (* (log k) m)))
  (- (- (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a)) (* (log k) m)))
  (- (- (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a)) (log (pow k m))))
  (- (- (log (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (log k) m)))
  (- (- (log (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (log k) m)))
  (- (- (log (/ (+ 1.0 (* k (+ 10.0 k))) a)) (log (pow k m))))
  (- (log (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (- 0 (- (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a)) (* (log k) m)))
  (- 0 (- (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a)) (* (log k) m)))
  (- 0 (- (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a)) (log (pow k m))))
  (- 0 (- (log (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (log k) m)))
  (- 0 (- (log (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (log k) m)))
  (- 0 (- (log (/ (+ 1.0 (* k (+ 10.0 k))) a)) (log (pow k m))))
  (- 0 (log (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (- (log 1) (- (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a)) (* (log k) m)))
  (- (log 1) (- (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a)) (* (log k) m)))
  (- (log 1) (- (- (log (+ 1.0 (* k (+ 10.0 k)))) (log a)) (log (pow k m))))
  (- (log 1) (- (log (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (log k) m)))
  (- (log 1) (- (log (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (log k) m)))
  (- (log 1) (- (log (/ (+ 1.0 (* k (+ 10.0 k))) a)) (log (pow k m))))
  (- (log 1) (log (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (exp (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (* (* 1 1) 1) (/ (/ (* (* (+ 1.0 (* k (+ 10.0 k))) (+ 1.0 (* k (+ 10.0 k)))) (+ 1.0 (* k (+ 10.0 k)))) (* (* a a) a)) (* (* (pow k m) (pow k m)) (pow k m))))
  (/ (* (* 1 1) 1) (/ (* (* (/ (+ 1.0 (* k (+ 10.0 k))) a) (/ (+ 1.0 (* k (+ 10.0 k))) a)) (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (* (pow k m) (pow k m)) (pow k m))))
  (/ (* (* 1 1) 1) (* (* (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (* (cbrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))) (cbrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (cbrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (* (* (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))) (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (sqrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (sqrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (- 1)
  (- (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (* (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (/ (cbrt 1) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (cbrt 1) (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow 1 m)))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) 1))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow 1 m)))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) 1))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) 1))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow 1 m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) 1))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow 1 m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) 1))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) 1))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow 1 m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) 1))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow 1 m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) 1))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) 1))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (pow 1 m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) 1))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 1) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 1) (pow 1 m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 1) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 1) 1))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 1) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ 1 (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ 1 (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ 1 (pow 1 m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ 1 (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ 1 (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ 1 1))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ 1 (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ 1 a) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ 1 a) (pow (sqrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (pow 1 m)))
  (/ (cbrt 1) (/ (/ 1 a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ 1 a) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ 1 a) (sqrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) 1))
  (/ (cbrt 1) (/ (/ 1 a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ 1 a) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) 1)
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (/ (cbrt 1) (/ 1 (pow k m)))
  (/ (sqrt 1) (* (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (/ (sqrt 1) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (sqrt 1) (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (sqrt 1) (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (sqrt 1) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow 1 m)))
  (/ (sqrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (sqrt 1) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) 1))
  (/ (sqrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (sqrt 1) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow 1 m)))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) 1))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) 1))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow 1 m)))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) 1))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow 1 m)))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) 1))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (sqrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) 1))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow 1 m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) 1))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow 1 m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) 1))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ 1 (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (/ 1 (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ 1 (* (cbrt a) (cbrt a))) 1))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ 1 (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (/ 1 (sqrt a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ 1 (sqrt a)) (pow 1 m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ 1 (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (/ 1 (sqrt a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ 1 (sqrt a)) 1))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (/ (sqrt 1) (/ (/ 1 (sqrt a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ 1 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (/ 1 1) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ 1 1) (pow 1 m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (sqrt 1) (/ (/ 1 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (/ 1 1) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ 1 1) 1))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (sqrt 1) (/ (/ 1 1) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (/ (sqrt 1) (/ 1 (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ 1 (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ 1 (pow 1 m)))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (sqrt 1) (/ 1 (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (/ (sqrt 1) (/ 1 (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  (/ (sqrt 1) (/ 1 1))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (sqrt 1) (/ 1 (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (sqrt 1) (/ (/ 1 a) (pow (cbrt k) m)))
  (/ (sqrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (/ 1 a) (pow (sqrt k) m)))
  (/ (sqrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) (pow 1 m)))
  (/ (sqrt 1) (/ (/ 1 a) (pow k m)))
  (/ (sqrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (sqrt 1) (/ (/ 1 a) (cbrt (pow k m))))
  (/ (sqrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (/ 1 a) (sqrt (pow k m))))
  (/ (sqrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) 1))
  (/ (sqrt 1) (/ (/ 1 a) (pow k m)))
  (/ (sqrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) (pow k (/ m 2))))
  (/ (sqrt 1) (/ (/ 1 a) (pow k (/ m 2))))
  (/ (sqrt 1) 1)
  (/ (sqrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (sqrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (/ (sqrt 1) (/ 1 (pow k m)))
  (/ 1 (* (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (/ 1 (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (sqrt k) m)))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow 1 m)))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (sqrt (pow k m))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) 1))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow k (/ m 2))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow 1 m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) 1))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) 1))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow 1 m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) 1))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow (sqrt k) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow 1 m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (sqrt (pow k m))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) 1))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow k (/ m 2))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) 1))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow 1 m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) 1))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow 1 m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) 1))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) 1))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ 1 (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ 1 (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ 1 (sqrt a)) (pow 1 m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ 1 (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ 1 (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ 1 (sqrt a)) 1))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ 1 (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ 1 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (/ 1 (/ (/ 1 1) (pow (sqrt k) m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  (/ 1 (/ (/ 1 1) (pow 1 m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ 1 (/ (/ 1 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (/ 1 (/ (/ 1 1) (sqrt (pow k m))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  (/ 1 (/ (/ 1 1) 1))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ 1 (/ (/ 1 1) (pow k (/ m 2))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (/ 1 (/ 1 (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (/ 1 (/ 1 (pow (sqrt k) m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  (/ 1 (/ 1 (pow 1 m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ 1 (/ 1 (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (/ 1 (/ 1 (sqrt (pow k m))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  (/ 1 (/ 1 1))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ 1 (/ 1 (pow k (/ m 2))))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ 1 a) (pow (cbrt k) m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (sqrt k) m)))
  (/ 1 (/ (/ 1 a) (pow (sqrt k) m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow 1 m)))
  (/ 1 (/ (/ 1 a) (pow k m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ 1 a) (cbrt (pow k m))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt (pow k m))))
  (/ 1 (/ (/ 1 a) (sqrt (pow k m))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) 1))
  (/ 1 (/ (/ 1 a) (pow k m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow k (/ m 2))))
  (/ 1 (/ (/ 1 a) (pow k (/ m 2))))
  (/ 1 1)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (/ 1 (/ 1 (pow k m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)) 1)
  (/ 1 (* (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (/ 1 (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (sqrt k) m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow 1 m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (sqrt (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) 1))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow k (/ m 2))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow 1 m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) 1))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) 1))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow 1 m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) 1))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow (sqrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow 1 m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (sqrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) 1))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) 1) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) 1))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow 1 m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) 1))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow 1 m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) 1))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) 1) (pow k (/ m 2))))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (pow 1 m)))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) 1))
  (/ 1 (/ (/ 1 (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ 1 (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ 1 (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ 1 (sqrt a)) (pow 1 m)))
  (/ 1 (/ (/ 1 (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ 1 (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ 1 (sqrt a)) 1))
  (/ 1 (/ (/ 1 (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ 1 1) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ 1 1) (pow (sqrt k) m)))
  (/ 1 (/ (/ 1 1) (pow 1 m)))
  (/ 1 (/ (/ 1 1) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ 1 1) (sqrt (pow k m))))
  (/ 1 (/ (/ 1 1) 1))
  (/ 1 (/ (/ 1 1) (pow k (/ m 2))))
  (/ 1 (/ 1 (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ 1 (pow (sqrt k) m)))
  (/ 1 (/ 1 (pow 1 m)))
  (/ 1 (/ 1 (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ 1 (sqrt (pow k m))))
  (/ 1 (/ 1 1))
  (/ 1 (/ 1 (pow k (/ m 2))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (sqrt k) m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow 1 m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt (pow k m))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) 1))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow k (/ m 2))))
  (/ 1 1)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (/ (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)) (cbrt 1))
  (/ (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)) (sqrt 1))
  (/ (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)) 1)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (* k (+ 10.0 k))
  (+ (log k) (log (+ 10.0 k)))
  (log (* k (+ 10.0 k)))
  (exp (* k (+ 10.0 k)))
  (* (* (* k k) k) (* (* (+ 10.0 k) (+ 10.0 k)) (+ 10.0 k)))
  (* (cbrt (* k (+ 10.0 k))) (cbrt (* k (+ 10.0 k))))
  (cbrt (* k (+ 10.0 k)))
  (* (* (* k (+ 10.0 k)) (* k (+ 10.0 k))) (* k (+ 10.0 k)))
  (sqrt (* k (+ 10.0 k)))
  (sqrt (* k (+ 10.0 k)))
  (* (sqrt k) (sqrt (+ 10.0 k)))
  (* (sqrt k) (sqrt (+ 10.0 k)))
  (* k 10.0)
  (* k k)
  (* 10.0 k)
  (* k k)
  (* k (* (cbrt (+ 10.0 k)) (cbrt (+ 10.0 k))))
  (* k (sqrt (+ 10.0 k)))
  (* k 1)
  (* k 1)
  (* (cbrt k) (+ 10.0 k))
  (* (sqrt k) (+ 10.0 k))
  (* k (+ 10.0 k))
  (* k (+ (pow 10.0 3) (pow k 3)))
  (* k (- (* 10.0 10.0) (* k k)))
  (+ (/ (pow k 2) a) (+ (* 1.0 (/ 1 a)) (* 10.0 (/ k a))))
  (+ (/ (pow k 2) a) (+ (* 1.0 (/ 1 a)) (* 10.0 (/ k a))))
  (+ (/ (pow k 2) a) (+ (* 1.0 (/ 1 a)) (* 10.0 (/ k a))))
  (- (+ (* 1.0 (* a (* m (log k)))) (* 1.0 a)) (* 10.0 (* k a)))
  (- (+ (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 2)) (* 99.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 4)))) (* 10.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 3))))
  (- (+ (* 99.0 (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 4))) (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 2))) (* 10.0 (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 3))))
  (+ (* 10.0 k) (pow k 2))
  (+ (* 10.0 k) (pow k 2))
  (+ (* 10.0 k) (pow k 2))
1.560 * * [simplify]: iteration  0 :  2087  enodes  (cost  7315 )
1.589 * * [simplify]: iteration  1 :  5001  enodes  (cost  6920 )
1.621 * [simplify]: Simplified to:
   (log (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (log (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (exp (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (pow (/ (+ 1.0 (* k (+ 10.0 k))) a) 3)
  (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)))
  (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (pow (/ (+ 1.0 (* k (+ 10.0 k))) a) 3)
  (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (- (+ 1.0 (* k (+ 10.0 k))))
  (- a)
  (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a)))
  (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a))
  (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a))
  (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a))
  (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))
  (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a)
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a)))
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a))
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a))
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a))
  (sqrt (+ 1.0 (* k (+ 10.0 k))))
  (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a)
  (/ 1 (* (cbrt a) (cbrt a)))
  (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a))
  (/ 1 (sqrt a))
  (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a))
  1
  (/ (+ 1.0 (* k (+ 10.0 k))) a)
  (/ 1 a)
  (/ a (+ 1.0 (* k (+ 10.0 k))))
  (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt a) (cbrt a)))
  (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a))
  (+ 1.0 (* k (+ 10.0 k)))
  (/ a (cbrt (+ 1.0 (* k (+ 10.0 k)))))
  (/ a (sqrt (+ 1.0 (* k (+ 10.0 k)))))
  (/ a (+ 1.0 (* k (+ 10.0 k))))
  (* (+ (* (* k (+ 10.0 k)) (- (* k (+ 10.0 k)) 1.0)) (* 1.0 1.0)) a)
  (* a (- 1.0 (* k (+ 10.0 k))))
  (- 1)
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (log (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (exp (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (pow (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) 3)
  (pow (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) 3)
  (pow (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) 3)
  (* (cbrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))) (cbrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (cbrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (pow (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) 3)
  (sqrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (sqrt (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (- 1)
  (- (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (* (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (/ (cbrt 1) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (cbrt 1) (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (cbrt 1)))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (cbrt 1)))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt 1)))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt 1)))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (* (/ (* (cbrt 1) (cbrt 1)) (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow (* (cbrt k) (cbrt k)) m))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (* (/ (* (cbrt 1) (cbrt 1)) (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow (sqrt k) m))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (cbrt 1) (/ (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (cbrt (pow k m))) (cbrt (pow k m))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (* (/ (* (cbrt 1) (cbrt 1)) (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (sqrt (pow k m)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ (* (cbrt 1) (cbrt 1)) (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow k (/ m 2)))
  (/ (cbrt 1) (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (* (/ (* (cbrt 1) (cbrt 1)) (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow (* (cbrt k) (cbrt k)) m))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (* (/ (* (cbrt 1) (cbrt 1)) (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow (sqrt k) m))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (/ (cbrt 1) (/ (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (pow k m))) (cbrt (pow k m))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (* (/ (* (cbrt 1) (cbrt 1)) (sqrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt (pow k m)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ (* (cbrt 1) (cbrt 1)) (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow k (/ m 2)))
  (/ (cbrt 1) (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ 1 (* (cbrt a) (cbrt a))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ 1 (* (cbrt a) (cbrt a))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ 1 (sqrt a)) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ 1 (sqrt a)) (cbrt 1)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (/ 1 (sqrt a)) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k (/ m 2))))
  (* (* (cbrt 1) (cbrt 1)) (pow (* (cbrt k) (cbrt k)) m))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (* (* (cbrt 1) (cbrt 1)) (pow (sqrt k) m))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  (* (cbrt 1) (cbrt 1))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (* (* (cbrt 1) (cbrt 1)) (* (cbrt (pow k m)) (cbrt (pow k m))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (* (* (cbrt 1) (cbrt 1)) (sqrt (pow k m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  (* (cbrt 1) (cbrt 1))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (* (* (cbrt 1) (cbrt 1)) (pow k (/ m 2)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (* (* (cbrt 1) (cbrt 1)) (pow (* (cbrt k) (cbrt k)) m))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (* (* (cbrt 1) (cbrt 1)) (pow (sqrt k) m))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  (* (cbrt 1) (cbrt 1))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (* (* (cbrt 1) (cbrt 1)) (* (cbrt (pow k m)) (cbrt (pow k m))))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (* (* (cbrt 1) (cbrt 1)) (sqrt (pow k m)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  (* (cbrt 1) (cbrt 1))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (* (* (cbrt 1) (cbrt 1)) (pow k (/ m 2)))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ (cbrt 1) (/ (/ 1 a) (pow (cbrt k) m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (/ 1 a) (pow (sqrt k) m)))
  (/ (cbrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ 1 a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ (cbrt 1) (/ (/ 1 a) (cbrt (pow k m))))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (/ 1 a) (sqrt (pow k m))))
  (/ (cbrt 1) (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt 1)))
  (/ (cbrt 1) (/ (/ 1 a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) (pow k (/ m 2))))
  (/ (cbrt 1) (/ (/ 1 a) (pow k (/ m 2))))
  (* (cbrt 1) (cbrt 1))
  (/ (cbrt 1) (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (* (cbrt 1) (cbrt 1)) (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (* (cbrt 1) (pow k m))
  (/ 1 (* (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (/ 1 (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (sqrt k) m)))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (sqrt (pow k m))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow k (/ m 2))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow (* (cbrt k) (cbrt k)) m))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow (sqrt k) m))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (* (cbrt (pow k m)) (cbrt (pow k m))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (sqrt (pow k m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow k (/ m 2)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow (* (cbrt k) (cbrt k)) m))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow (sqrt k) m))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt (pow k m)) (cbrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow k (/ m 2)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (* (pow (* (cbrt k) (cbrt k)) m) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (cbrt k) m)))
  (* (pow (sqrt k) m) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (sqrt k) m)))
  (* (cbrt a) (cbrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (* (* (cbrt (pow k m)) (cbrt (pow k m))) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (cbrt (pow k m))))
  (* (sqrt (pow k m)) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (sqrt (pow k m))))
  (* (cbrt a) (cbrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (* (pow k (/ m 2)) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k (/ m 2))))
  (* (pow (* (cbrt k) (cbrt k)) m) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (cbrt k) m)))
  (* (pow (sqrt k) m) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (sqrt k) m)))
  (sqrt a)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (* (* (cbrt (pow k m)) (cbrt (pow k m))) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (cbrt (pow k m))))
  (* (sqrt (pow k m)) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (sqrt (pow k m))))
  (sqrt a)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (* (pow k (/ m 2)) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k (/ m 2))))
  (pow (* (cbrt k) (cbrt k)) m)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (pow (sqrt k) m)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (* (cbrt (pow k m)) (cbrt (pow k m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (sqrt (pow k m))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (pow k (/ m 2))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (pow (* (cbrt k) (cbrt k)) m)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (pow (sqrt k) m)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (* (cbrt (pow k m)) (cbrt (pow k m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (sqrt (pow k m))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (pow k (/ m 2))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (* (cbrt k) (cbrt k)) m)))
  (* (pow (cbrt k) m) a)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (sqrt k) m)))
  (* (pow (sqrt k) m) a)
  (/ 1 (+ 1.0 (* k (+ 10.0 k))))
  (* (pow k m) a)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (* (cbrt (pow k m)) a)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt (pow k m))))
  (* (sqrt (pow k m)) a)
  (/ 1 (+ 1.0 (* k (+ 10.0 k))))
  (* (pow k m) a)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow k (/ m 2))))
  (* (pow k (/ m 2)) a)
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (pow k m)
  (/ 1 (* (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (/ 1 (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (sqrt k) m)))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (sqrt (pow k m))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow k (/ m 2))))
  (/ 1 (/ (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (cbrt k) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (pow k m))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow (* (cbrt k) (cbrt k)) m))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow (sqrt k) m))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (* (cbrt (pow k m)) (cbrt (pow k m))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (sqrt (pow k m)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow k (/ m 2)))
  (/ 1 (/ (/ (cbrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (cbrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (cbrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow (* (cbrt k) (cbrt k)) m))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (cbrt k) m)))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow (sqrt k) m))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow (sqrt k) m)))
  (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt (pow k m)) (cbrt (pow k m))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (cbrt (pow k m))))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt (pow k m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (sqrt (pow k m))))
  (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k m)))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow k (/ m 2)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) a) (pow k (/ m 2))))
  (* (pow (* (cbrt k) (cbrt k)) m) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (cbrt k) m)))
  (* (pow (sqrt k) m) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow (sqrt k) m)))
  (* (cbrt a) (cbrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (* (* (cbrt (pow k m)) (cbrt (pow k m))) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (cbrt (pow k m))))
  (* (sqrt (pow k m)) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (sqrt (pow k m))))
  (* (cbrt a) (cbrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k m)))
  (* (pow k (/ m 2)) (* (cbrt a) (cbrt a)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (cbrt a)) (pow k (/ m 2))))
  (* (pow (* (cbrt k) (cbrt k)) m) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (cbrt k) m)))
  (* (pow (sqrt k) m) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow (sqrt k) m)))
  (sqrt a)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (* (* (cbrt (pow k m)) (cbrt (pow k m))) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (cbrt (pow k m))))
  (* (sqrt (pow k m)) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (sqrt (pow k m))))
  (sqrt a)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k m)))
  (* (pow k (/ m 2)) (sqrt a))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt a)) (pow k (/ m 2))))
  (pow (* (cbrt k) (cbrt k)) m)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (pow (sqrt k) m)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (* (cbrt (pow k m)) (cbrt (pow k m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (sqrt (pow k m))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (pow k (/ m 2))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (pow (* (cbrt k) (cbrt k)) m)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (cbrt k) m)))
  (pow (sqrt k) m)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow (sqrt k) m)))
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (* (cbrt (pow k m)) (cbrt (pow k m)))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (cbrt (pow k m))))
  (sqrt (pow k m))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (sqrt (pow k m))))
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (pow k (/ m 2))
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k (/ m 2))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (* (cbrt k) (cbrt k)) m)))
  (* (pow (cbrt k) m) a)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (sqrt k) m)))
  (* (pow (sqrt k) m) a)
  (/ 1 (+ 1.0 (* k (+ 10.0 k))))
  (* (pow k m) a)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (* (cbrt (pow k m)) a)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt (pow k m))))
  (* (sqrt (pow k m)) a)
  (/ 1 (+ 1.0 (* k (+ 10.0 k))))
  (* (pow k m) a)
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow k (/ m 2))))
  (* (pow k (/ m 2)) a)
  1
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (pow k m)
  (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))
  (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))
  (/ 1 (* (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))) (cbrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)))))
  (/ 1 (sqrt (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow (sqrt k) m)))
  (/ 1 (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (sqrt (pow k m))))
  (/ 1 (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))))
  (/ 1 (/ (* (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (cbrt (/ (+ 1.0 (* k (+ 10.0 k))) a))) (pow k (/ m 2))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow (sqrt k) m)))
  (/ 1 (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (sqrt (pow k m))))
  (/ 1 (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)))
  (/ 1 (/ (sqrt (/ (+ 1.0 (* k (+ 10.0 k))) a)) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)))
  (/ 1 (/ (/ (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt a)) (pow k (/ m 2))))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow (* (cbrt k) (cbrt k)) m))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow (sqrt k) m))
  (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (* (cbrt (pow k m)) (cbrt (pow k m))))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (sqrt (pow k m)))
  (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k))))))
  (* (/ 1 (* (cbrt (+ 1.0 (* k (+ 10.0 k)))) (cbrt (+ 1.0 (* k (+ 10.0 k)))))) (pow k (/ m 2)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (* (cbrt a) (cbrt a))) (pow k (/ m 2))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow (sqrt k) m)))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (sqrt (pow k m))))
  (/ 1 (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)))
  (/ 1 (/ (/ (sqrt (+ 1.0 (* k (+ 10.0 k)))) (sqrt a)) (pow k (/ m 2))))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow (* (cbrt k) (cbrt k)) m))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow (sqrt k) m))
  (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k)))))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (* (cbrt (pow k m)) (cbrt (pow k m))))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (sqrt (pow k m)))
  (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k)))))
  (* (/ 1 (sqrt (+ 1.0 (* k (+ 10.0 k))))) (pow k (/ m 2)))
  (* (pow (* (cbrt k) (cbrt k)) m) (* (cbrt a) (cbrt a)))
  (* (pow (sqrt k) m) (* (cbrt a) (cbrt a)))
  (* (cbrt a) (cbrt a))
  (* (* (cbrt (pow k m)) (cbrt (pow k m))) (* (cbrt a) (cbrt a)))
  (* (sqrt (pow k m)) (* (cbrt a) (cbrt a)))
  (* (cbrt a) (cbrt a))
  (* (pow k (/ m 2)) (* (cbrt a) (cbrt a)))
  (* (pow (* (cbrt k) (cbrt k)) m) (sqrt a))
  (* (pow (sqrt k) m) (sqrt a))
  (sqrt a)
  (* (* (cbrt (pow k m)) (cbrt (pow k m))) (sqrt a))
  (* (sqrt (pow k m)) (sqrt a))
  (sqrt a)
  (* (pow k (/ m 2)) (sqrt a))
  (pow (* (cbrt k) (cbrt k)) m)
  (pow (sqrt k) m)
  1
  (* (cbrt (pow k m)) (cbrt (pow k m)))
  (sqrt (pow k m))
  1
  (pow k (/ m 2))
  (pow (* (cbrt k) (cbrt k)) m)
  (pow (sqrt k) m)
  1
  (* (cbrt (pow k m)) (cbrt (pow k m)))
  (sqrt (pow k m))
  1
  (pow k (/ m 2))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (* (cbrt k) (cbrt k)) m)))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow (sqrt k) m)))
  (/ 1 (+ 1.0 (* k (+ 10.0 k))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (* (cbrt (pow k m)) (cbrt (pow k m)))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (sqrt (pow k m))))
  (/ 1 (+ 1.0 (* k (+ 10.0 k))))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) (pow k (/ m 2))))
  1
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (/ (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m)) (cbrt 1))
  (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))
  (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))
  (/ 1 (/ (+ 1.0 (* k (+ 10.0 k))) a))
  (* k (+ 10.0 k))
  (log (* k (+ 10.0 k)))
  (log (* k (+ 10.0 k)))
  (exp (* k (+ 10.0 k)))
  (pow (* k (+ 10.0 k)) 3)
  (* (cbrt (* k (+ 10.0 k))) (cbrt (* k (+ 10.0 k))))
  (cbrt (* k (+ 10.0 k)))
  (pow (* k (+ 10.0 k)) 3)
  (sqrt (* k (+ 10.0 k)))
  (sqrt (* k (+ 10.0 k)))
  (* (sqrt k) (sqrt (+ 10.0 k)))
  (* (sqrt k) (sqrt (+ 10.0 k)))
  (* k 10.0)
  (pow k 2)
  (* k 10.0)
  (pow k 2)
  (* k (* (cbrt (+ 10.0 k)) (cbrt (+ 10.0 k))))
  (* k (sqrt (+ 10.0 k)))
  k
  k
  (* (cbrt k) (+ 10.0 k))
  (* (sqrt k) (+ 10.0 k))
  (* k (+ 10.0 k))
  (* k (+ (pow 10.0 3) (pow k 3)))
  (* k (- (* 10.0 10.0) (* k k)))
  (+ (/ (pow k 2) a) (+ (* 1.0 (/ 1 a)) (* 10.0 (/ k a))))
  (+ (/ (pow k 2) a) (+ (* 1.0 (/ 1 a)) (* 10.0 (/ k a))))
  (+ (/ (pow k 2) a) (+ (* 1.0 (/ 1 a)) (* 10.0 (/ k a))))
  (- (+ (* 1.0 (* a (* m (log k)))) (* 1.0 a)) (* 10.0 (* k a)))
  (- (+ (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 2)) (* 99.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 4)))) (* 10.0 (/ (* a (exp (* -1 (* m (log (/ 1 k)))))) (pow k 3))))
  (- (+ (* 99.0 (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 4))) (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 2))) (* 10.0 (/ (* a (exp (* m (- (log -1) (log (/ -1 k)))))) (pow k 3))))
  (* k (+ 10.0 k))
  (* k (+ 10.0 k))
  (* k (+ 10.0 k))
1.626 * * * [progress]: adding candidates to table
2.659 * [progress]: [Phase 3 of 3] Extracting.
2.659 * * [regime]: Finding splitpoints for: (#<alt (λ (a k m) (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))> #<alt (λ (a k m) (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))> #<alt (λ (a k m) (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))>)
2.660 * * * [regime-changes]: Trying 4 branch expressions: ((/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))) m k a)
2.660 * * * * [regimes]: Trying to branch on (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))) from (#<alt (λ (a k m) (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))> #<alt (λ (a k m) (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))> #<alt (λ (a k m) (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))>)
2.678 * * * * [regimes]: Trying to branch on m from (#<alt (λ (a k m) (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))> #<alt (λ (a k m) (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))> #<alt (λ (a k m) (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))>)
2.693 * * * * [regimes]: Trying to branch on k from (#<alt (λ (a k m) (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))> #<alt (λ (a k m) (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))> #<alt (λ (a k m) (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))>)
2.711 * * * * [regimes]: Trying to branch on a from (#<alt (λ (a k m) (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a))> #<alt (λ (a k m) (/ 1 (/ (/ (+ 1.0 (* k (+ 10.0 k))) a) (pow k m))))> #<alt (λ (a k m) (/ (* a (pow k m)) (+ (+ 1.0 (* 10.0 k)) (* k k))))>)
2.727 * * * [regime]: Found split indices: #<option (#s(si 0 255))>
2.727 * [simplify]: Simplifying using  #<procedure:simplify-batch-egg> :
   (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
2.728 * * [simplify]: iteration  0 :  15  enodes  (cost  6 )
2.728 * * [simplify]: iteration  1 :  15  enodes  (cost  6 )
2.728 * [simplify]: Simplified to:
   (* (/ (pow k m) (+ (* k (+ 10.0 k)) 1.0)) a)
3.867 * [regime-testing]: Baseline error score: 2.137235366957227
3.868 * [regime-testing]: Oracle error score: 2.102201554646283
3.869 * [regime-testing]: End program error score: 2.137235366957227