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Require Import Coq.nsatz.Nsatz.
Goal False.
(* the first (succeeding) goal was reached by clearing one hypothesis in the second goal which overflows 6GB of stack space *)
let sugar := constr:( 0%Z ) in
let nparams := constr:( (-1)%Z ) in
let reified_goal := constr:(
(Ring_polynom.PEsub (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4) (Ring_polynom.PEX Z 2))
(Ring_polynom.PEX Z 5)) (Ring_polynom.PEX Z 3))
(Ring_polynom.PEX Z 6))) ) in
let power := constr:( N.one ) in
let reified_givens := constr:(
(Ring_polynom.PEmul
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4) (Ring_polynom.PEX Z 2))
(Ring_polynom.PEX Z 5)) (Ring_polynom.PEX Z 3))
(Ring_polynom.PEX Z 6)))
(Ring_polynom.PEsub (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4) (Ring_polynom.PEX Z 2))
(Ring_polynom.PEX Z 5)) (Ring_polynom.PEX Z 3))
(Ring_polynom.PEX Z 6)))
:: Ring_polynom.PEsub
(Ring_polynom.PEmul
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEX Z 2)) (Ring_polynom.PEX Z 5))
(Ring_polynom.PEX Z 3)) (Ring_polynom.PEX Z 6)))
(Ring_polynom.PEX Z 10)) (Ring_polynom.PEc 1%Z)
:: Ring_polynom.PEsub
(Ring_polynom.PEmul
(Ring_polynom.PEsub (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEX Z 2)) (Ring_polynom.PEX Z 5))
(Ring_polynom.PEX Z 3)) (Ring_polynom.PEX Z 6)))
(Ring_polynom.PEX Z 9)) (Ring_polynom.PEc 1%Z)
:: Ring_polynom.PEsub
(Ring_polynom.PEadd
(Ring_polynom.PEmul (Ring_polynom.PEX Z 1)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 7)
(Ring_polynom.PEX Z 7)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 8) (Ring_polynom.PEX Z 8)))
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 7)
(Ring_polynom.PEX Z 7)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 8)
(Ring_polynom.PEX Z 8))))
:: Ring_polynom.PEsub
(Ring_polynom.PEadd
(Ring_polynom.PEmul (Ring_polynom.PEX Z 1)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 5)
(Ring_polynom.PEX Z 5)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 6)
(Ring_polynom.PEX Z 6)))
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 5)
(Ring_polynom.PEX Z 5)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 6)
(Ring_polynom.PEX Z 6))))
:: Ring_polynom.PEsub
(Ring_polynom.PEadd
(Ring_polynom.PEmul (Ring_polynom.PEX Z 1)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 2)
(Ring_polynom.PEX Z 2)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 3)
(Ring_polynom.PEX Z 3)))
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 2)
(Ring_polynom.PEX Z 2)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 3)
(Ring_polynom.PEX Z 3)))) :: nil)%list ) in
Nsatz.nsatz_compute
(@cons _ (@Ring_polynom.PEc _ sugar) (@cons _ (@Ring_polynom.PEc _ nparams) (@cons _ (@Ring_polynom.PEpow _ reified_goal power) reified_givens))).
let sugar := constr:( 0%Z ) in
let nparams := constr:( (-1)%Z ) in
let reified_goal := constr:(
(Ring_polynom.PEsub (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4) (Ring_polynom.PEX Z 2))
(Ring_polynom.PEX Z 5)) (Ring_polynom.PEX Z 3))
(Ring_polynom.PEX Z 6))) ) in
let power := constr:( N.one ) in
let reified_givens := constr:(
(Ring_polynom.PEmul
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4) (Ring_polynom.PEX Z 2))
(Ring_polynom.PEX Z 5)) (Ring_polynom.PEX Z 3))
(Ring_polynom.PEX Z 6)))
(Ring_polynom.PEsub (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4) (Ring_polynom.PEX Z 2))
(Ring_polynom.PEX Z 5)) (Ring_polynom.PEX Z 3))
(Ring_polynom.PEX Z 6)))
:: Ring_polynom.PEadd
(Ring_polynom.PEmul
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEX Z 2)) (Ring_polynom.PEX Z 5))
(Ring_polynom.PEX Z 3)) (Ring_polynom.PEX Z 6)))
(Ring_polynom.PEsub (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEX Z 2)) (Ring_polynom.PEX Z 5))
(Ring_polynom.PEX Z 3)) (Ring_polynom.PEX Z 6))))
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEadd
(Ring_polynom.PEmul (Ring_polynom.PEX Z 2)
(Ring_polynom.PEX Z 6))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 3)
(Ring_polynom.PEX Z 5)))) (Ring_polynom.PEX Z 7))
(Ring_polynom.PEsub
(Ring_polynom.PEmul (Ring_polynom.PEX Z 3) (Ring_polynom.PEX Z 6))
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 1)
(Ring_polynom.PEX Z 2)) (Ring_polynom.PEX Z 5))))
(Ring_polynom.PEX Z 8))
:: Ring_polynom.PEsub
(Ring_polynom.PEmul
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEX Z 2)) (Ring_polynom.PEX Z 5))
(Ring_polynom.PEX Z 3)) (Ring_polynom.PEX Z 6)))
(Ring_polynom.PEX Z 10)) (Ring_polynom.PEc 1%Z)
:: Ring_polynom.PEsub
(Ring_polynom.PEmul
(Ring_polynom.PEsub (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEX Z 2))
(Ring_polynom.PEX Z 5)) (Ring_polynom.PEX Z 3))
(Ring_polynom.PEX Z 6))) (Ring_polynom.PEX Z 9))
(Ring_polynom.PEc 1%Z)
:: Ring_polynom.PEsub
(Ring_polynom.PEadd
(Ring_polynom.PEmul (Ring_polynom.PEX Z 1)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 7)
(Ring_polynom.PEX Z 7)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 8)
(Ring_polynom.PEX Z 8)))
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 7)
(Ring_polynom.PEX Z 7)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 8)
(Ring_polynom.PEX Z 8))))
:: Ring_polynom.PEsub
(Ring_polynom.PEadd
(Ring_polynom.PEmul (Ring_polynom.PEX Z 1)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 5)
(Ring_polynom.PEX Z 5)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 6)
(Ring_polynom.PEX Z 6)))
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 5)
(Ring_polynom.PEX Z 5)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 6)
(Ring_polynom.PEX Z 6))))
:: Ring_polynom.PEsub
(Ring_polynom.PEadd
(Ring_polynom.PEmul (Ring_polynom.PEX Z 1)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 2)
(Ring_polynom.PEX Z 2)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 3)
(Ring_polynom.PEX Z 3)))
(Ring_polynom.PEadd (Ring_polynom.PEc 1%Z)
(Ring_polynom.PEmul
(Ring_polynom.PEmul (Ring_polynom.PEX Z 4)
(Ring_polynom.PEmul (Ring_polynom.PEX Z 2)
(Ring_polynom.PEX Z 2)))
(Ring_polynom.PEmul (Ring_polynom.PEX Z 3)
(Ring_polynom.PEX Z 3)))) :: nil)%list ) in
Nsatz.nsatz_compute
(@cons _ (@Ring_polynom.PEc _ sugar) (@cons _ (@Ring_polynom.PEc _ nparams) (@cons _ (@Ring_polynom.PEpow _ reified_goal power) reified_givens))).
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