TSTP Solution File: ITP035^1 by cocATP---0.2.0

%------------------------------------------------------------------------------
% File     : cocATP---0.2.0
% Problem  : ITP035^1 : TPTP v7.5.0. Released v7.5.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : python CASC.py /export/starexec/sandbox/benchmark/theBenchmark.p

% Computer : n001.cluster.edu
% Model    : x86_64 x86_64
% CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory   : 8042.1875MB
% OS       : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% DateTime : Sun Mar 21 13:23:59 EDT 2021

% Result   : Unknown 0.56s
% Output   : None 
% Verified : 
% SZS Type : None (Parsing solution fails)
% Syntax   : Number of formulae    : 0

% Comments : 
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.11/0.12  % Problem  : ITP035^1 : TPTP v7.5.0. Released v7.5.0.
% 0.11/0.12  % Command  : python CASC.py /export/starexec/sandbox/benchmark/theBenchmark.p
% 0.13/0.34  % Computer : n001.cluster.edu
% 0.13/0.34  % Model    : x86_64 x86_64
% 0.13/0.34  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34  % Memory   : 8042.1875MB
% 0.13/0.34  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.13/0.34  % CPULimit : 300
% 0.13/0.34  % DateTime : Fri Mar 19 05:16:46 EDT 2021
% 0.13/0.34  % CPUTime  : 
% 0.13/0.35  ModuleCmd_Load.c(213):ERROR:105: Unable to locate a modulefile for 'python/python27'
% 0.13/0.35  Python 2.7.5
% 0.47/0.62  Using paths ['/home/cristobal/cocATP/CASC/TPTP/', '/export/starexec/sandbox/benchmark/', '/export/starexec/sandbox/benchmark/']
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5a7e8>, <kernel.Type object at 0x1f5a368>) of role type named ty_n_t__Set__Oset_I_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring set_complex_complex:Type
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f55cb0>, <kernel.Type object at 0x1f5add0>) of role type named ty_n_t__Set__Oset_It__Complex__Ocomplex_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring set_complex:Type
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5a320>, <kernel.Type object at 0x1f5a368>) of role type named ty_n_t__Set__Oset_It__Real__Oreal_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring set_real:Type
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5a3f8>, <kernel.Type object at 0x1f5add0>) of role type named ty_n_t__Set__Oset_It__Nat__Onat_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring set_nat:Type
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5acf8>, <kernel.Type object at 0x1f5a248>) of role type named ty_n_t__Complex__Ocomplex
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring complex:Type
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5a518>, <kernel.Type object at 0x21f2ea8>) of role type named ty_n_t__Real__Oreal
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring real:Type
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5add0>, <kernel.Type object at 0x21f2ea8>) of role type named ty_n_t__Nat__Onat
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring nat:Type
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5abd8>, <kernel.DependentProduct object at 0x21f2e60>) of role type named sy_c_Complex__Analysis__Basics_Oholomorphic__on
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comple372758642hic_on:((complex->complex)->(set_complex->Prop))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x21f2fc8>, <kernel.DependentProduct object at 0x1f5a320>) of role type named sy_c_Derivative_Oderiv_001t__Complex__Ocomplex
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring deriv_complex:((complex->complex)->(complex->complex))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x21f2e60>, <kernel.DependentProduct object at 0x1f5a320>) of role type named sy_c_Derivative_Oderiv_001t__Real__Oreal
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring deriv_real:((real->real)->(real->real))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x21f2fc8>, <kernel.DependentProduct object at 0x20bef38>) of role type named sy_c_Fun_Ocomp_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comp_c1610621014omplex:(((complex->complex)->(complex->complex))->(((complex->complex)->(complex->complex))->((complex->complex)->(complex->complex))))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x21f27e8>, <kernel.DependentProduct object at 0x20befc8>) of role type named sy_c_Fun_Ocomp_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_001t__Complex__Ocomplex_001t__Complex__Ocomplex
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comp_c881053372omplex:(((complex->complex)->complex)->((complex->(complex->complex))->(complex->complex)))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x21f27e8>, <kernel.DependentProduct object at 0x20befc8>) of role type named sy_c_Fun_Ocomp_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_001t__Real__Oreal_001t__Real__Oreal
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comp_c1884694328l_real:(((complex->complex)->real)->((real->(complex->complex))->(real->real)))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5a320>, <kernel.DependentProduct object at 0x20bee18>) of role type named sy_c_Fun_Ocomp_001t__Complex__Ocomplex_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comp_c606622857omplex:((complex->(complex->complex))->(((complex->complex)->complex)->((complex->complex)->(complex->complex))))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5add0>, <kernel.DependentProduct object at 0x20bed40>) of role type named sy_c_Fun_Ocomp_001t__Complex__Ocomplex_001t__Complex__Ocomplex_001t__Complex__Ocomplex
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comp_c130555887omplex:((complex->complex)->((complex->complex)->(complex->complex)))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5abd8>, <kernel.DependentProduct object at 0x20bec68>) of role type named sy_c_Fun_Ocomp_001t__Complex__Ocomplex_001t__Real__Oreal_001t__Real__Oreal
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comp_c819638635l_real:((complex->real)->((real->complex)->(real->real)))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5add0>, <kernel.DependentProduct object at 0x20bed40>) of role type named sy_c_Fun_Ocomp_001t__Real__Oreal_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comp_r2009261319omplex:((real->(complex->complex))->(((complex->complex)->real)->((complex->complex)->(complex->complex))))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x1f5add0>, <kernel.DependentProduct object at 0x20bed88>) of role type named sy_c_Fun_Ocomp_001t__Real__Oreal_001t__Complex__Ocomplex_001t__Complex__Ocomplex
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comp_r667767405omplex:((real->complex)->((complex->real)->(complex->complex)))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20bedd0>, <kernel.DependentProduct object at 0x20beb00>) of role type named sy_c_Fun_Ocomp_001t__Real__Oreal_001t__Real__Oreal_001t__Real__Oreal
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring comp_real_real_real:((real->real)->((real->real)->(real->real)))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20bef38>, <kernel.DependentProduct object at 0x20befc8>) of role type named sy_c_Fun_Oid_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring id_complex_complex:((complex->complex)->(complex->complex))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20bed40>, <kernel.DependentProduct object at 0x20bedd0>) of role type named sy_c_Fun_Oid_001_062_It__Real__Oreal_Mt__Real__Oreal_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring id_real_real:((real->real)->(real->real))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20bee60>, <kernel.DependentProduct object at 0x20beea8>) of role type named sy_c_Fun_Oid_001t__Complex__Ocomplex
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring id_complex:(complex->complex)
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20bef80>, <kernel.DependentProduct object at 0x20beb48>) of role type named sy_c_Fun_Oid_001t__Real__Oreal
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring id_real:(real->real)
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20beef0>, <kernel.DependentProduct object at 0x20bee60>) of role type named sy_c_Fun_Oid_001t__Set__Oset_I_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring id_set1618538368omplex:(set_complex_complex->set_complex_complex)
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20beea8>, <kernel.DependentProduct object at 0x20bea70>) of role type named sy_c_Fun_Oid_001t__Set__Oset_It__Complex__Ocomplex_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring id_set_complex:(set_complex->set_complex)
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20bef80>, <kernel.DependentProduct object at 0x20beab8>) of role type named sy_c_Fun_Oid_001t__Set__Oset_It__Real__Oreal_J
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring id_set_real:(set_real->set_real)
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20bee60>, <kernel.Constant object at 0x20beab8>) of role type named sy_c_Groups_Oone__class_Oone_001t__Complex__Ocomplex
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring one_one_complex:complex
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20beea8>, <kernel.Constant object at 0x20beab8>) of role type named sy_c_Groups_Oone__class_Oone_001t__Nat__Onat
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring one_one_nat:nat
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20bef80>, <kernel.Constant object at 0x20beab8>) of role type named sy_c_Groups_Oone__class_Oone_001t__Real__Oreal
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring one_one_real:real
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20bee60>, <kernel.DependentProduct object at 0x20bedd0>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Complex__Ocomplex
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring times_times_complex:(complex->(complex->complex))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20be9e0>, <kernel.DependentProduct object at 0x20be998>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Nat__Onat
% 0.47/0.62  Using role type
% 0.47/0.62  Declaring times_times_nat:(nat->(nat->nat))
% 0.47/0.62  FOF formula (<kernel.Constant object at 0x20beab8>, <kernel.DependentProduct object at 0x20be8c0>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Real__Oreal
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring times_times_real:(real->(real->real))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20bedd0>, <kernel.DependentProduct object at 0x20beea8>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Set__Oset_It__Complex__Ocomplex_J
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring times_1316095593omplex:(set_complex->(set_complex->set_complex))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be998>, <kernel.DependentProduct object at 0x20bef80>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Set__Oset_It__Nat__Onat_J
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring times_times_set_nat:(set_nat->(set_nat->set_nat))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be8c0>, <kernel.DependentProduct object at 0x20bee60>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Set__Oset_It__Real__Oreal_J
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring times_times_set_real:(set_real->(set_real->set_real))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20beea8>, <kernel.Constant object at 0x20bee60>) of role type named sy_c_Groups_Ozero__class_Ozero_001t__Complex__Ocomplex
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring zero_zero_complex:complex
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be998>, <kernel.Constant object at 0x20bee60>) of role type named sy_c_Groups_Ozero__class_Ozero_001t__Nat__Onat
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring zero_zero_nat:nat
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be8c0>, <kernel.Constant object at 0x20bee60>) of role type named sy_c_Groups_Ozero__class_Ozero_001t__Real__Oreal
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring zero_zero_real:real
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20bec68>, <kernel.DependentProduct object at 0x20be998>) of role type named sy_c_If_001t__Complex__Ocomplex
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring if_complex:(Prop->(complex->(complex->complex)))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20beab8>, <kernel.DependentProduct object at 0x20bec68>) of role type named sy_c_If_001t__Nat__Onat
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring if_nat:(Prop->(nat->(nat->nat)))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be998>, <kernel.DependentProduct object at 0x20bec68>) of role type named sy_c_If_001t__Real__Oreal
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring if_real:(Prop->(real->(real->real)))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be638>, <kernel.DependentProduct object at 0x20be5f0>) of role type named sy_c_Nat_Ocompow_001_062_I_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_M_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_J
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring compow1098280738omplex:(nat->(((complex->complex)->(complex->complex))->((complex->complex)->(complex->complex))))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be5a8>, <kernel.DependentProduct object at 0x20be440>) of role type named sy_c_Nat_Ocompow_001_062_I_062_It__Real__Oreal_Mt__Real__Oreal_J_M_062_It__Real__Oreal_Mt__Real__Oreal_J_J
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring compow1723822618l_real:(nat->(((real->real)->(real->real))->((real->real)->(real->real))))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20bec68>, <kernel.DependentProduct object at 0x20be998>) of role type named sy_c_Nat_Ocompow_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring compow1667379464omplex:(nat->((complex->complex)->(complex->complex)))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20bee60>, <kernel.DependentProduct object at 0x20be320>) of role type named sy_c_Nat_Ocompow_001_062_It__Real__Oreal_Mt__Real__Oreal_J
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring compow_real_real:(nat->((real->real)->(real->real)))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be440>, <kernel.DependentProduct object at 0x20be5a8>) of role type named sy_c_Nat_Ofunpow_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring funpow1854104714omplex:(nat->(((complex->complex)->(complex->complex))->((complex->complex)->(complex->complex))))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be998>, <kernel.DependentProduct object at 0x20bedd0>) of role type named sy_c_Nat_Ofunpow_001_062_It__Real__Oreal_Mt__Real__Oreal_J
% 0.47/0.63  Using role type
% 0.47/0.63  Declaring funpow_real_real:(nat->(((real->real)->(real->real))->((real->real)->(real->real))))
% 0.47/0.63  FOF formula (<kernel.Constant object at 0x20be320>, <kernel.DependentProduct object at 0x20bee60>) of role type named sy_c_Nat_Ofunpow_001t__Complex__Ocomplex
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring funpow_complex:(nat->((complex->complex)->(complex->complex)))
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be3b0>, <kernel.DependentProduct object at 0x20bec68>) of role type named sy_c_Orderings_Oord__class_Oless__eq_001t__Nat__Onat
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring ord_less_eq_nat:(nat->(nat->Prop))
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20bedd0>, <kernel.DependentProduct object at 0x20be440>) of role type named sy_c_Orderings_Oord__class_Oless__eq_001t__Real__Oreal
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring ord_less_eq_real:(real->(real->Prop))
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20bee60>, <kernel.DependentProduct object at 0x20be998>) of role type named sy_c_Orderings_Oord__class_Oless__eq_001t__Set__Oset_It__Complex__Ocomplex_J
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring ord_le701908932omplex:(set_complex->(set_complex->Prop))
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20bec68>, <kernel.DependentProduct object at 0x20be488>) of role type named sy_c_Set_OCollect_001t__Complex__Ocomplex
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring collect_complex:((complex->Prop)->set_complex)
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be440>, <kernel.DependentProduct object at 0x20bedd0>) of role type named sy_c_Set_Oimage_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J_001_062_It__Complex__Ocomplex_Mt__Complex__Ocomplex_J
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring image_944012797omplex:(((complex->complex)->(complex->complex))->(set_complex_complex->set_complex_complex))
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be4d0>, <kernel.DependentProduct object at 0x20bec68>) of role type named sy_c_Set_Oimage_001t__Complex__Ocomplex_001t__Complex__Ocomplex
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring image_58037603omplex:((complex->complex)->(set_complex->set_complex))
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20bee60>, <kernel.DependentProduct object at 0x20be440>) of role type named sy_c_Set_Oimage_001t__Real__Oreal_001t__Real__Oreal
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring image_real_real:((real->real)->(set_real->set_real))
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be248>, <kernel.DependentProduct object at 0x20be050>) of role type named sy_c_Topological__Spaces_Oopen__class_Oopen_001t__Complex__Ocomplex
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring topolo935673511omplex:(set_complex->Prop)
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be320>, <kernel.DependentProduct object at 0x20be290>) of role type named sy_c_Topological__Spaces_Otopological__space__class_Oconnected_001t__Complex__Ocomplex
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring topolo2127351575omplex:(set_complex->Prop)
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be440>, <kernel.DependentProduct object at 0x20be098>) of role type named sy_c_Transcendental_Oarcosh_001t__Complex__Ocomplex
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring arcosh_complex:(complex->complex)
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be050>, <kernel.DependentProduct object at 0x20be0e0>) of role type named sy_c_Transcendental_Oarcosh_001t__Real__Oreal
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring arcosh_real:(real->real)
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be290>, <kernel.DependentProduct object at 0x20be128>) of role type named sy_c_Transcendental_Oarsinh_001t__Complex__Ocomplex
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring arsinh_complex:(complex->complex)
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be098>, <kernel.DependentProduct object at 0x2ac33a40fe60>) of role type named sy_c_Transcendental_Oarsinh_001t__Real__Oreal
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring arsinh_real:(real->real)
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be0e0>, <kernel.DependentProduct object at 0x2ac33a40f7e8>) of role type named sy_c_Transcendental_Oartanh_001t__Complex__Ocomplex
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring artanh_complex:(complex->complex)
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be320>, <kernel.DependentProduct object at 0x2ac33a40f878>) of role type named sy_c_Transcendental_Oartanh_001t__Real__Oreal
% 0.48/0.63  Using role type
% 0.48/0.63  Declaring artanh_real:(real->real)
% 0.48/0.63  FOF formula (<kernel.Constant object at 0x20be050>, <kernel.DependentProduct object at 0x2ac33a40fe18>) of role type named sy_c_Transcendental_Oln__class_Oln_001t__Complex__Ocomplex
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring ln_ln_complex:(complex->complex)
% 0.48/0.64  FOF formula (<kernel.Constant object at 0x20be0e0>, <kernel.DependentProduct object at 0x2ac33a40fcf8>) of role type named sy_c_Transcendental_Oln__class_Oln_001t__Real__Oreal
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring ln_ln_real:(real->real)
% 0.48/0.64  FOF formula (<kernel.Constant object at 0x20beea8>, <kernel.DependentProduct object at 0x2ac33a40fef0>) of role type named sy_c_member_001t__Complex__Ocomplex
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring member_complex:(complex->(set_complex->Prop))
% 0.48/0.64  FOF formula (<kernel.Constant object at 0x20be320>, <kernel.DependentProduct object at 0x2ac33a40fe18>) of role type named sy_c_member_001t__Nat__Onat
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring member_nat:(nat->(set_nat->Prop))
% 0.48/0.64  FOF formula (<kernel.Constant object at 0x20be320>, <kernel.DependentProduct object at 0x1f38e18>) of role type named sy_c_member_001t__Real__Oreal
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring member_real:(real->(set_real->Prop))
% 0.48/0.64  FOF formula (<kernel.Constant object at 0x20beea8>, <kernel.Constant object at 0x2ac33a40f830>) of role type named sy_v_S
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring s:set_complex
% 0.48/0.64  FOF formula (<kernel.Constant object at 0x20beea8>, <kernel.Constant object at 0x2ac33a40f830>) of role type named sy_v_T
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring t:set_complex
% 0.48/0.64  FOF formula (<kernel.Constant object at 0x2ac33a40f878>, <kernel.DependentProduct object at 0x1f38b00>) of role type named sy_v_f
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring f:(complex->complex)
% 0.48/0.64  FOF formula (<kernel.Constant object at 0x2ac33a40f830>, <kernel.DependentProduct object at 0x1f38ab8>) of role type named sy_v_g
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring g:(complex->complex)
% 0.48/0.64  FOF formula (<kernel.Constant object at 0x2ac33a40f7e8>, <kernel.Constant object at 0x1f38e18>) of role type named sy_v_w
% 0.48/0.64  Using role type
% 0.48/0.64  Declaring w:complex
% 0.48/0.64  FOF formula (forall (Z:real), ((and ((((eq nat) one_one_nat) zero_zero_nat)->(((eq real) ((((compow1723822618l_real one_one_nat) deriv_real) id_real) Z)) Z))) ((not (((eq nat) one_one_nat) zero_zero_nat))->(((eq real) ((((compow1723822618l_real one_one_nat) deriv_real) id_real) Z)) one_one_real)))) of role axiom named fact_0__092_060open_062_092_060And_062z_O_A_Ideriv_A_094_094_A1_J_Aid_Az_A_061_A_Iif_A1_A_061_A0_Athen_Az_Aelse_Aif_A1_A_061_A1_Athen_A1_058_058_063_Ha_Aelse_A_I0_058_058_063_Ha_J_J_092_060close_062
% 0.48/0.64  A new axiom: (forall (Z:real), ((and ((((eq nat) one_one_nat) zero_zero_nat)->(((eq real) ((((compow1723822618l_real one_one_nat) deriv_real) id_real) Z)) Z))) ((not (((eq nat) one_one_nat) zero_zero_nat))->(((eq real) ((((compow1723822618l_real one_one_nat) deriv_real) id_real) Z)) one_one_real))))
% 0.48/0.64  FOF formula (forall (Z:complex), ((and ((((eq nat) one_one_nat) zero_zero_nat)->(((eq complex) ((((compow1098280738omplex one_one_nat) deriv_complex) id_complex) Z)) Z))) ((not (((eq nat) one_one_nat) zero_zero_nat))->(((eq complex) ((((compow1098280738omplex one_one_nat) deriv_complex) id_complex) Z)) one_one_complex)))) of role axiom named fact_1__092_060open_062_092_060And_062z_O_A_Ideriv_A_094_094_A1_J_Aid_Az_A_061_A_Iif_A1_A_061_A0_Athen_Az_Aelse_Aif_A1_A_061_A1_Athen_A1_058_058_063_Ha_Aelse_A_I0_058_058_063_Ha_J_J_092_060close_062
% 0.48/0.64  A new axiom: (forall (Z:complex), ((and ((((eq nat) one_one_nat) zero_zero_nat)->(((eq complex) ((((compow1098280738omplex one_one_nat) deriv_complex) id_complex) Z)) Z))) ((not (((eq nat) one_one_nat) zero_zero_nat))->(((eq complex) ((((compow1098280738omplex one_one_nat) deriv_complex) id_complex) Z)) one_one_complex))))
% 0.48/0.64  FOF formula ((member_complex w) s) of role axiom named fact_2_assms_I7_J
% 0.48/0.64  A new axiom: ((member_complex w) s)
% 0.48/0.64  FOF formula (((eq (complex->complex)) (deriv_complex id_complex)) (fun (Z2:complex)=> one_one_complex)) of role axiom named fact_3_deriv__id
% 0.48/0.64  A new axiom: (((eq (complex->complex)) (deriv_complex id_complex)) (fun (Z2:complex)=> one_one_complex))
% 0.48/0.64  FOF formula (((eq (real->real)) (deriv_real id_real)) (fun (Z2:real)=> one_one_real)) of role axiom named fact_4_deriv__id
% 0.48/0.64  A new axiom: (((eq (real->real)) (deriv_real id_real)) (fun (Z2:real)=> one_one_real))
% 0.48/0.65  FOF formula (((eq (real->real)) id_real) (fun (X:real)=> X)) of role axiom named fact_5_id__apply
% 0.48/0.65  A new axiom: (((eq (real->real)) id_real) (fun (X:real)=> X))
% 0.48/0.65  FOF formula (((eq ((complex->complex)->(complex->complex))) id_complex_complex) (fun (X:(complex->complex))=> X)) of role axiom named fact_6_id__apply
% 0.48/0.65  A new axiom: (((eq ((complex->complex)->(complex->complex))) id_complex_complex) (fun (X:(complex->complex))=> X))
% 0.48/0.65  FOF formula (((eq (complex->complex)) id_complex) (fun (X:complex)=> X)) of role axiom named fact_7_id__apply
% 0.48/0.65  A new axiom: (((eq (complex->complex)) id_complex) (fun (X:complex)=> X))
% 0.48/0.65  FOF formula (((eq (real->real)) id_real) (fun (X:real)=> X)) of role axiom named fact_8_id__def
% 0.48/0.65  A new axiom: (((eq (real->real)) id_real) (fun (X:real)=> X))
% 0.48/0.65  FOF formula (((eq ((complex->complex)->(complex->complex))) id_complex_complex) (fun (X:(complex->complex))=> X)) of role axiom named fact_9_id__def
% 0.48/0.65  A new axiom: (((eq ((complex->complex)->(complex->complex))) id_complex_complex) (fun (X:(complex->complex))=> X))
% 0.48/0.65  FOF formula (((eq (complex->complex)) id_complex) (fun (X:complex)=> X)) of role axiom named fact_10_id__def
% 0.48/0.65  A new axiom: (((eq (complex->complex)) id_complex) (fun (X:complex)=> X))
% 0.48/0.65  FOF formula (forall (F:(real->real)), (((eq Prop) (forall (X:real), (((eq real) (F X)) X))) (((eq (real->real)) F) id_real))) of role axiom named fact_11_eq__id__iff
% 0.48/0.65  A new axiom: (forall (F:(real->real)), (((eq Prop) (forall (X:real), (((eq real) (F X)) X))) (((eq (real->real)) F) id_real)))
% 0.48/0.65  FOF formula (forall (F:((complex->complex)->(complex->complex))), (((eq Prop) (forall (X:(complex->complex)), (((eq (complex->complex)) (F X)) X))) (((eq ((complex->complex)->(complex->complex))) F) id_complex_complex))) of role axiom named fact_12_eq__id__iff
% 0.48/0.65  A new axiom: (forall (F:((complex->complex)->(complex->complex))), (((eq Prop) (forall (X:(complex->complex)), (((eq (complex->complex)) (F X)) X))) (((eq ((complex->complex)->(complex->complex))) F) id_complex_complex)))
% 0.48/0.65  FOF formula (forall (F:(complex->complex)), (((eq Prop) (forall (X:complex), (((eq complex) (F X)) X))) (((eq (complex->complex)) F) id_complex))) of role axiom named fact_13_eq__id__iff
% 0.48/0.65  A new axiom: (forall (F:(complex->complex)), (((eq Prop) (forall (X:complex), (((eq complex) (F X)) X))) (((eq (complex->complex)) F) id_complex)))
% 0.48/0.65  FOF formula (forall (N:nat) (Z:real), ((and ((((eq nat) N) zero_zero_nat)->(((eq real) ((((compow1723822618l_real N) deriv_real) id_real) Z)) Z))) ((not (((eq nat) N) zero_zero_nat))->((and ((((eq nat) N) one_one_nat)->(((eq real) ((((compow1723822618l_real N) deriv_real) id_real) Z)) one_one_real))) ((not (((eq nat) N) one_one_nat))->(((eq real) ((((compow1723822618l_real N) deriv_real) id_real) Z)) zero_zero_real)))))) of role axiom named fact_14_higher__deriv__id
% 0.48/0.65  A new axiom: (forall (N:nat) (Z:real), ((and ((((eq nat) N) zero_zero_nat)->(((eq real) ((((compow1723822618l_real N) deriv_real) id_real) Z)) Z))) ((not (((eq nat) N) zero_zero_nat))->((and ((((eq nat) N) one_one_nat)->(((eq real) ((((compow1723822618l_real N) deriv_real) id_real) Z)) one_one_real))) ((not (((eq nat) N) one_one_nat))->(((eq real) ((((compow1723822618l_real N) deriv_real) id_real) Z)) zero_zero_real))))))
% 0.48/0.65  FOF formula (forall (N:nat) (Z:complex), ((and ((((eq nat) N) zero_zero_nat)->(((eq complex) ((((compow1098280738omplex N) deriv_complex) id_complex) Z)) Z))) ((not (((eq nat) N) zero_zero_nat))->((and ((((eq nat) N) one_one_nat)->(((eq complex) ((((compow1098280738omplex N) deriv_complex) id_complex) Z)) one_one_complex))) ((not (((eq nat) N) one_one_nat))->(((eq complex) ((((compow1098280738omplex N) deriv_complex) id_complex) Z)) zero_zero_complex)))))) of role axiom named fact_15_higher__deriv__id
% 0.48/0.65  A new axiom: (forall (N:nat) (Z:complex), ((and ((((eq nat) N) zero_zero_nat)->(((eq complex) ((((compow1098280738omplex N) deriv_complex) id_complex) Z)) Z))) ((not (((eq nat) N) zero_zero_nat))->((and ((((eq nat) N) one_one_nat)->(((eq complex) ((((compow1098280738omplex N) deriv_complex) id_complex) Z)) one_one_complex))) ((not (((eq nat) N) one_one_nat))->(((eq complex) ((((compow1098280738omplex N) deriv_complex) id_complex) Z)) zero_zero_complex))))))
% 0.48/0.66  FOF formula (forall (X2:complex), (((eq Prop) (((eq complex) one_one_complex) X2)) (((eq complex) X2) one_one_complex))) of role axiom named fact_16_one__reorient
% 0.48/0.66  A new axiom: (forall (X2:complex), (((eq Prop) (((eq complex) one_one_complex) X2)) (((eq complex) X2) one_one_complex)))
% 0.48/0.66  FOF formula (forall (X2:nat), (((eq Prop) (((eq nat) one_one_nat) X2)) (((eq nat) X2) one_one_nat))) of role axiom named fact_17_one__reorient
% 0.48/0.66  A new axiom: (forall (X2:nat), (((eq Prop) (((eq nat) one_one_nat) X2)) (((eq nat) X2) one_one_nat)))
% 0.48/0.66  FOF formula (forall (X2:real), (((eq Prop) (((eq real) one_one_real) X2)) (((eq real) X2) one_one_real))) of role axiom named fact_18_one__reorient
% 0.48/0.66  A new axiom: (forall (X2:real), (((eq Prop) (((eq real) one_one_real) X2)) (((eq real) X2) one_one_real)))
% 0.48/0.66  FOF formula (forall (N:nat), (((eq (real->real)) ((compow_real_real N) id_real)) id_real)) of role axiom named fact_19_id__funpow
% 0.48/0.66  A new axiom: (forall (N:nat), (((eq (real->real)) ((compow_real_real N) id_real)) id_real))
% 0.48/0.66  FOF formula (forall (N:nat), (((eq ((real->real)->(real->real))) ((compow1723822618l_real N) id_real_real)) id_real_real)) of role axiom named fact_20_id__funpow
% 0.48/0.66  A new axiom: (forall (N:nat), (((eq ((real->real)->(real->real))) ((compow1723822618l_real N) id_real_real)) id_real_real))
% 0.48/0.66  FOF formula (forall (N:nat), (((eq (complex->complex)) ((compow1667379464omplex N) id_complex)) id_complex)) of role axiom named fact_21_id__funpow
% 0.48/0.66  A new axiom: (forall (N:nat), (((eq (complex->complex)) ((compow1667379464omplex N) id_complex)) id_complex))
% 0.48/0.66  FOF formula (forall (N:nat), (((eq ((complex->complex)->(complex->complex))) ((compow1098280738omplex N) id_complex_complex)) id_complex_complex)) of role axiom named fact_22_id__funpow
% 0.48/0.66  A new axiom: (forall (N:nat), (((eq ((complex->complex)->(complex->complex))) ((compow1098280738omplex N) id_complex_complex)) id_complex_complex))
% 0.48/0.66  FOF formula (((eq complex) ((times_times_complex ((deriv_complex f) w)) ((deriv_complex g) (f w)))) ((deriv_complex id_complex) w)) of role axiom named fact_23_calculation
% 0.48/0.66  A new axiom: (((eq complex) ((times_times_complex ((deriv_complex f) w)) ((deriv_complex g) (f w)))) ((deriv_complex id_complex) w))
% 0.48/0.66  FOF formula (((eq complex) ((deriv_complex ((comp_c130555887omplex g) f)) w)) ((deriv_complex id_complex) w)) of role axiom named fact_24__092_060open_062deriv_A_Ig_A_092_060circ_062_Af_J_Aw_A_061_Aderiv_Aid_Aw_092_060close_062
% 0.48/0.66  A new axiom: (((eq complex) ((deriv_complex ((comp_c130555887omplex g) f)) w)) ((deriv_complex id_complex) w))
% 0.48/0.66  FOF formula (not (((eq nat) zero_zero_nat) one_one_nat)) of role axiom named fact_25_zero__neq__one
% 0.48/0.66  A new axiom: (not (((eq nat) zero_zero_nat) one_one_nat))
% 0.48/0.66  FOF formula (not (((eq real) zero_zero_real) one_one_real)) of role axiom named fact_26_zero__neq__one
% 0.48/0.66  A new axiom: (not (((eq real) zero_zero_real) one_one_real))
% 0.48/0.66  FOF formula (not (((eq complex) zero_zero_complex) one_one_complex)) of role axiom named fact_27_zero__neq__one
% 0.48/0.66  A new axiom: (not (((eq complex) zero_zero_complex) one_one_complex))
% 0.48/0.66  FOF formula (((eq complex) ((times_times_complex ((deriv_complex f) w)) ((deriv_complex g) (f w)))) ((times_times_complex ((deriv_complex g) (f w))) ((deriv_complex f) w))) of role axiom named fact_28__092_060open_062deriv_Af_Aw_A_K_Aderiv_Ag_A_If_Aw_J_A_061_Aderiv_Ag_A_If_Aw_J_A_K_Aderiv_Af_Aw_092_060close_062
% 0.48/0.66  A new axiom: (((eq complex) ((times_times_complex ((deriv_complex f) w)) ((deriv_complex g) (f w)))) ((times_times_complex ((deriv_complex g) (f w))) ((deriv_complex f) w)))
% 0.48/0.66  FOF formula (((eq ((complex->complex)->((complex->complex)->(complex->complex)))) comp_c130555887omplex) (fun (F2:(complex->complex)) (G:(complex->complex)) (X:complex)=> (F2 (G X)))) of role axiom named fact_29_comp__apply
% 0.48/0.66  A new axiom: (((eq ((complex->complex)->((complex->complex)->(complex->complex)))) comp_c130555887omplex) (fun (F2:(complex->complex)) (G:(complex->complex)) (X:complex)=> (F2 (G X))))
% 0.48/0.66  FOF formula (forall (A:complex), (((eq complex) ((times_times_complex zero_zero_complex) A)) zero_zero_complex)) of role axiom named fact_30_mult__zero__left
% 0.48/0.67  A new axiom: (forall (A:complex), (((eq complex) ((times_times_complex zero_zero_complex) A)) zero_zero_complex))
% 0.48/0.67  FOF formula (forall (A:nat), (((eq nat) ((times_times_nat zero_zero_nat) A)) zero_zero_nat)) of role axiom named fact_31_mult__zero__left
% 0.48/0.67  A new axiom: (forall (A:nat), (((eq nat) ((times_times_nat zero_zero_nat) A)) zero_zero_nat))
% 0.48/0.67  FOF formula (forall (A:real), (((eq real) ((times_times_real zero_zero_real) A)) zero_zero_real)) of role axiom named fact_32_mult__zero__left
% 0.48/0.67  A new axiom: (forall (A:real), (((eq real) ((times_times_real zero_zero_real) A)) zero_zero_real))
% 0.48/0.67  FOF formula (forall (A:complex), (((eq complex) ((times_times_complex A) zero_zero_complex)) zero_zero_complex)) of role axiom named fact_33_mult__zero__right
% 0.48/0.67  A new axiom: (forall (A:complex), (((eq complex) ((times_times_complex A) zero_zero_complex)) zero_zero_complex))
% 0.48/0.67  FOF formula (forall (A:nat), (((eq nat) ((times_times_nat A) zero_zero_nat)) zero_zero_nat)) of role axiom named fact_34_mult__zero__right
% 0.48/0.67  A new axiom: (forall (A:nat), (((eq nat) ((times_times_nat A) zero_zero_nat)) zero_zero_nat))
% 0.48/0.67  FOF formula (forall (A:real), (((eq real) ((times_times_real A) zero_zero_real)) zero_zero_real)) of role axiom named fact_35_mult__zero__right
% 0.48/0.67  A new axiom: (forall (A:real), (((eq real) ((times_times_real A) zero_zero_real)) zero_zero_real))
% 0.48/0.67  FOF formula (forall (A:complex) (B:complex), (((eq Prop) (((eq complex) ((times_times_complex A) B)) zero_zero_complex)) ((or (((eq complex) A) zero_zero_complex)) (((eq complex) B) zero_zero_complex)))) of role axiom named fact_36_mult__eq__0__iff
% 0.48/0.67  A new axiom: (forall (A:complex) (B:complex), (((eq Prop) (((eq complex) ((times_times_complex A) B)) zero_zero_complex)) ((or (((eq complex) A) zero_zero_complex)) (((eq complex) B) zero_zero_complex))))
% 0.48/0.67  FOF formula (forall (A:nat) (B:nat), (((eq Prop) (((eq nat) ((times_times_nat A) B)) zero_zero_nat)) ((or (((eq nat) A) zero_zero_nat)) (((eq nat) B) zero_zero_nat)))) of role axiom named fact_37_mult__eq__0__iff
% 0.48/0.67  A new axiom: (forall (A:nat) (B:nat), (((eq Prop) (((eq nat) ((times_times_nat A) B)) zero_zero_nat)) ((or (((eq nat) A) zero_zero_nat)) (((eq nat) B) zero_zero_nat))))
% 0.48/0.67  FOF formula (forall (A:real) (B:real), (((eq Prop) (((eq real) ((times_times_real A) B)) zero_zero_real)) ((or (((eq real) A) zero_zero_real)) (((eq real) B) zero_zero_real)))) of role axiom named fact_38_mult__eq__0__iff
% 0.48/0.67  A new axiom: (forall (A:real) (B:real), (((eq Prop) (((eq real) ((times_times_real A) B)) zero_zero_real)) ((or (((eq real) A) zero_zero_real)) (((eq real) B) zero_zero_real))))
% 0.48/0.67  FOF formula (forall (C:complex) (A:complex) (B:complex), (((eq Prop) (((eq complex) ((times_times_complex C) A)) ((times_times_complex C) B))) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) A) B)))) of role axiom named fact_39_mult__cancel__left
% 0.48/0.67  A new axiom: (forall (C:complex) (A:complex) (B:complex), (((eq Prop) (((eq complex) ((times_times_complex C) A)) ((times_times_complex C) B))) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) A) B))))
% 0.48/0.67  FOF formula (forall (C:nat) (A:nat) (B:nat), (((eq Prop) (((eq nat) ((times_times_nat C) A)) ((times_times_nat C) B))) ((or (((eq nat) C) zero_zero_nat)) (((eq nat) A) B)))) of role axiom named fact_40_mult__cancel__left
% 0.48/0.67  A new axiom: (forall (C:nat) (A:nat) (B:nat), (((eq Prop) (((eq nat) ((times_times_nat C) A)) ((times_times_nat C) B))) ((or (((eq nat) C) zero_zero_nat)) (((eq nat) A) B))))
% 0.48/0.67  FOF formula (forall (C:real) (A:real) (B:real), (((eq Prop) (((eq real) ((times_times_real C) A)) ((times_times_real C) B))) ((or (((eq real) C) zero_zero_real)) (((eq real) A) B)))) of role axiom named fact_41_mult__cancel__left
% 0.48/0.67  A new axiom: (forall (C:real) (A:real) (B:real), (((eq Prop) (((eq real) ((times_times_real C) A)) ((times_times_real C) B))) ((or (((eq real) C) zero_zero_real)) (((eq real) A) B))))
% 0.48/0.67  FOF formula (forall (A:complex) (C:complex) (B:complex), (((eq Prop) (((eq complex) ((times_times_complex A) C)) ((times_times_complex B) C))) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) A) B)))) of role axiom named fact_42_mult__cancel__right
% 0.48/0.68  A new axiom: (forall (A:complex) (C:complex) (B:complex), (((eq Prop) (((eq complex) ((times_times_complex A) C)) ((times_times_complex B) C))) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) A) B))))
% 0.48/0.68  FOF formula (forall (A:nat) (C:nat) (B:nat), (((eq Prop) (((eq nat) ((times_times_nat A) C)) ((times_times_nat B) C))) ((or (((eq nat) C) zero_zero_nat)) (((eq nat) A) B)))) of role axiom named fact_43_mult__cancel__right
% 0.48/0.68  A new axiom: (forall (A:nat) (C:nat) (B:nat), (((eq Prop) (((eq nat) ((times_times_nat A) C)) ((times_times_nat B) C))) ((or (((eq nat) C) zero_zero_nat)) (((eq nat) A) B))))
% 0.48/0.68  FOF formula (forall (A:real) (C:real) (B:real), (((eq Prop) (((eq real) ((times_times_real A) C)) ((times_times_real B) C))) ((or (((eq real) C) zero_zero_real)) (((eq real) A) B)))) of role axiom named fact_44_mult__cancel__right
% 0.48/0.68  A new axiom: (forall (A:real) (C:real) (B:real), (((eq Prop) (((eq real) ((times_times_real A) C)) ((times_times_real B) C))) ((or (((eq real) C) zero_zero_real)) (((eq real) A) B))))
% 0.48/0.68  FOF formula (forall (A:complex), (((eq complex) ((times_times_complex A) one_one_complex)) A)) of role axiom named fact_45_mult_Oright__neutral
% 0.48/0.68  A new axiom: (forall (A:complex), (((eq complex) ((times_times_complex A) one_one_complex)) A))
% 0.48/0.68  FOF formula (forall (A:nat), (((eq nat) ((times_times_nat A) one_one_nat)) A)) of role axiom named fact_46_mult_Oright__neutral
% 0.48/0.68  A new axiom: (forall (A:nat), (((eq nat) ((times_times_nat A) one_one_nat)) A))
% 0.48/0.68  FOF formula (forall (A:real), (((eq real) ((times_times_real A) one_one_real)) A)) of role axiom named fact_47_mult_Oright__neutral
% 0.48/0.68  A new axiom: (forall (A:real), (((eq real) ((times_times_real A) one_one_real)) A))
% 0.48/0.68  FOF formula (forall (A:complex), (((eq complex) ((times_times_complex one_one_complex) A)) A)) of role axiom named fact_48_mult_Oleft__neutral
% 0.48/0.68  A new axiom: (forall (A:complex), (((eq complex) ((times_times_complex one_one_complex) A)) A))
% 0.48/0.68  FOF formula (forall (A:nat), (((eq nat) ((times_times_nat one_one_nat) A)) A)) of role axiom named fact_49_mult_Oleft__neutral
% 0.48/0.68  A new axiom: (forall (A:nat), (((eq nat) ((times_times_nat one_one_nat) A)) A))
% 0.48/0.68  FOF formula (forall (A:real), (((eq real) ((times_times_real one_one_real) A)) A)) of role axiom named fact_50_mult_Oleft__neutral
% 0.48/0.68  A new axiom: (forall (A:real), (((eq real) ((times_times_real one_one_real) A)) A))
% 0.48/0.68  FOF formula (forall (G2:(complex->complex)), (((eq (complex->complex)) ((comp_c130555887omplex id_complex) G2)) G2)) of role axiom named fact_51_id__comp
% 0.48/0.68  A new axiom: (forall (G2:(complex->complex)), (((eq (complex->complex)) ((comp_c130555887omplex id_complex) G2)) G2))
% 0.48/0.68  FOF formula (forall (F:(complex->complex)), (((eq (complex->complex)) ((comp_c130555887omplex F) id_complex)) F)) of role axiom named fact_52_comp__id
% 0.48/0.68  A new axiom: (forall (F:(complex->complex)), (((eq (complex->complex)) ((comp_c130555887omplex F) id_complex)) F))
% 0.48/0.68  FOF formula (forall (F:((complex->complex)->(complex->complex))) (X2:(complex->complex)), (((eq (complex->complex)) (((compow1098280738omplex zero_zero_nat) F) X2)) X2)) of role axiom named fact_53_funpow__0
% 0.48/0.68  A new axiom: (forall (F:((complex->complex)->(complex->complex))) (X2:(complex->complex)), (((eq (complex->complex)) (((compow1098280738omplex zero_zero_nat) F) X2)) X2))
% 0.48/0.68  FOF formula (forall (F:((real->real)->(real->real))) (X2:(real->real)), (((eq (real->real)) (((compow1723822618l_real zero_zero_nat) F) X2)) X2)) of role axiom named fact_54_funpow__0
% 0.48/0.68  A new axiom: (forall (F:((real->real)->(real->real))) (X2:(real->real)), (((eq (real->real)) (((compow1723822618l_real zero_zero_nat) F) X2)) X2))
% 0.48/0.68  FOF formula (forall (F:(complex->complex)) (X2:complex), (((eq complex) (((compow1667379464omplex zero_zero_nat) F) X2)) X2)) of role axiom named fact_55_funpow__0
% 0.48/0.68  A new axiom: (forall (F:(complex->complex)) (X2:complex), (((eq complex) (((compow1667379464omplex zero_zero_nat) F) X2)) X2))
% 0.48/0.68  FOF formula (topolo935673511omplex s) of role axiom named fact_56_assms_I3_J
% 0.48/0.68  A new axiom: (topolo935673511omplex s)
% 0.48/0.70  FOF formula (((eq complex) ((times_times_complex ((deriv_complex g) (f w))) ((deriv_complex f) w))) ((deriv_complex ((comp_c130555887omplex g) f)) w)) of role axiom named fact_57__092_060open_062deriv_Ag_A_If_Aw_J_A_K_Aderiv_Af_Aw_A_061_Aderiv_A_Ig_A_092_060circ_062_Af_J_Aw_092_060close_062
% 0.48/0.70  A new axiom: (((eq complex) ((times_times_complex ((deriv_complex g) (f w))) ((deriv_complex f) w))) ((deriv_complex ((comp_c130555887omplex g) f)) w))
% 0.48/0.70  FOF formula (forall (A:complex) (C:complex), (((eq Prop) (((eq complex) ((times_times_complex A) C)) C)) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) A) one_one_complex)))) of role axiom named fact_58_mult__cancel__right2
% 0.48/0.70  A new axiom: (forall (A:complex) (C:complex), (((eq Prop) (((eq complex) ((times_times_complex A) C)) C)) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) A) one_one_complex))))
% 0.48/0.70  FOF formula (forall (A:real) (C:real), (((eq Prop) (((eq real) ((times_times_real A) C)) C)) ((or (((eq real) C) zero_zero_real)) (((eq real) A) one_one_real)))) of role axiom named fact_59_mult__cancel__right2
% 0.48/0.70  A new axiom: (forall (A:real) (C:real), (((eq Prop) (((eq real) ((times_times_real A) C)) C)) ((or (((eq real) C) zero_zero_real)) (((eq real) A) one_one_real))))
% 0.48/0.70  FOF formula (forall (C:complex) (B:complex), (((eq Prop) (((eq complex) C) ((times_times_complex B) C))) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) B) one_one_complex)))) of role axiom named fact_60_mult__cancel__right1
% 0.48/0.70  A new axiom: (forall (C:complex) (B:complex), (((eq Prop) (((eq complex) C) ((times_times_complex B) C))) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) B) one_one_complex))))
% 0.48/0.70  FOF formula (forall (C:real) (B:real), (((eq Prop) (((eq real) C) ((times_times_real B) C))) ((or (((eq real) C) zero_zero_real)) (((eq real) B) one_one_real)))) of role axiom named fact_61_mult__cancel__right1
% 0.48/0.70  A new axiom: (forall (C:real) (B:real), (((eq Prop) (((eq real) C) ((times_times_real B) C))) ((or (((eq real) C) zero_zero_real)) (((eq real) B) one_one_real))))
% 0.48/0.70  FOF formula (forall (C:complex) (A:complex), (((eq Prop) (((eq complex) ((times_times_complex C) A)) C)) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) A) one_one_complex)))) of role axiom named fact_62_mult__cancel__left2
% 0.48/0.70  A new axiom: (forall (C:complex) (A:complex), (((eq Prop) (((eq complex) ((times_times_complex C) A)) C)) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) A) one_one_complex))))
% 0.48/0.70  FOF formula (forall (C:real) (A:real), (((eq Prop) (((eq real) ((times_times_real C) A)) C)) ((or (((eq real) C) zero_zero_real)) (((eq real) A) one_one_real)))) of role axiom named fact_63_mult__cancel__left2
% 0.48/0.70  A new axiom: (forall (C:real) (A:real), (((eq Prop) (((eq real) ((times_times_real C) A)) C)) ((or (((eq real) C) zero_zero_real)) (((eq real) A) one_one_real))))
% 0.48/0.70  FOF formula (forall (C:complex) (B:complex), (((eq Prop) (((eq complex) C) ((times_times_complex C) B))) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) B) one_one_complex)))) of role axiom named fact_64_mult__cancel__left1
% 0.48/0.70  A new axiom: (forall (C:complex) (B:complex), (((eq Prop) (((eq complex) C) ((times_times_complex C) B))) ((or (((eq complex) C) zero_zero_complex)) (((eq complex) B) one_one_complex))))
% 0.48/0.70  FOF formula (forall (C:real) (B:real), (((eq Prop) (((eq real) C) ((times_times_real C) B))) ((or (((eq real) C) zero_zero_real)) (((eq real) B) one_one_real)))) of role axiom named fact_65_mult__cancel__left1
% 0.48/0.70  A new axiom: (forall (C:real) (B:real), (((eq Prop) (((eq real) C) ((times_times_real C) B))) ((or (((eq real) C) zero_zero_real)) (((eq real) B) one_one_real))))
% 0.48/0.70  FOF formula (forall (Z:complex), (((member_complex Z) s)->(((eq complex) (g (f Z))) Z))) of role axiom named fact_66_assms_I6_J
% 0.48/0.70  A new axiom: (forall (Z:complex), (((member_complex Z) s)->(((eq complex) (g (f Z))) Z)))
% 0.48/0.70  FOF formula ((comple372758642hic_on f) s) of role axiom named fact_67_assms_I1_J
% 0.48/0.70  A new axiom: ((comple372758642hic_on f) s)
% 0.48/0.70  FOF formula (forall (A:complex) (B:complex) (C:complex), (((eq complex) ((times_times_complex ((times_times_complex A) B)) C)) ((times_times_complex A) ((times_times_complex B) C)))) of role axiom named fact_68_ab__semigroup__mult__class_Omult__ac_I1_J
% 0.48/0.71  A new axiom: (forall (A:complex) (B:complex) (C:complex), (((eq complex) ((times_times_complex ((times_times_complex A) B)) C)) ((times_times_complex A) ((times_times_complex B) C))))
% 0.48/0.71  FOF formula (forall (A:nat) (B:nat) (C:nat), (((eq nat) ((times_times_nat ((times_times_nat A) B)) C)) ((times_times_nat A) ((times_times_nat B) C)))) of role axiom named fact_69_ab__semigroup__mult__class_Omult__ac_I1_J
% 0.48/0.71  A new axiom: (forall (A:nat) (B:nat) (C:nat), (((eq nat) ((times_times_nat ((times_times_nat A) B)) C)) ((times_times_nat A) ((times_times_nat B) C))))
% 0.48/0.71  FOF formula (forall (A:real) (B:real) (C:real), (((eq real) ((times_times_real ((times_times_real A) B)) C)) ((times_times_real A) ((times_times_real B) C)))) of role axiom named fact_70_ab__semigroup__mult__class_Omult__ac_I1_J
% 0.48/0.71  A new axiom: (forall (A:real) (B:real) (C:real), (((eq real) ((times_times_real ((times_times_real A) B)) C)) ((times_times_real A) ((times_times_real B) C))))
% 0.48/0.71  FOF formula (((eq ((complex->complex)->((complex->complex)->(complex->complex)))) comp_c130555887omplex) (fun (F2:(complex->complex)) (G:(complex->complex)) (X:complex)=> (F2 (G X)))) of role axiom named fact_71_comp__def
% 0.48/0.71  A new axiom: (((eq ((complex->complex)->((complex->complex)->(complex->complex)))) comp_c130555887omplex) (fun (F2:(complex->complex)) (G:(complex->complex)) (X:complex)=> (F2 (G X))))
% 0.48/0.71  FOF formula (forall (F:(complex->complex)) (G2:(complex->complex)) (H:(complex->complex)), (((eq (complex->complex)) ((comp_c130555887omplex ((comp_c130555887omplex F) G2)) H)) ((comp_c130555887omplex F) ((comp_c130555887omplex G2) H)))) of role axiom named fact_72_comp__assoc
% 0.48/0.71  A new axiom: (forall (F:(complex->complex)) (G2:(complex->complex)) (H:(complex->complex)), (((eq (complex->complex)) ((comp_c130555887omplex ((comp_c130555887omplex F) G2)) H)) ((comp_c130555887omplex F) ((comp_c130555887omplex G2) H))))
% 0.48/0.71  FOF formula (forall (N:nat) (F:(complex->complex)), (((eq ((complex->complex)->(complex->complex))) ((compow1098280738omplex N) (comp_c130555887omplex F))) (comp_c130555887omplex ((compow1667379464omplex N) F)))) of role axiom named fact_73_comp__funpow
% 0.48/0.71  A new axiom: (forall (N:nat) (F:(complex->complex)), (((eq ((complex->complex)->(complex->complex))) ((compow1098280738omplex N) (comp_c130555887omplex F))) (comp_c130555887omplex ((compow1667379464omplex N) F))))
% 0.48/0.71  FOF formula (forall (N:nat) (F:(real->real)), (((eq ((real->real)->(real->real))) ((compow1723822618l_real N) (comp_real_real_real F))) (comp_real_real_real ((compow_real_real N) F)))) of role axiom named fact_74_comp__funpow
% 0.48/0.71  A new axiom: (forall (N:nat) (F:(real->real)), (((eq ((real->real)->(real->real))) ((compow1723822618l_real N) (comp_real_real_real F))) (comp_real_real_real ((compow_real_real N) F))))
% 0.48/0.71  FOF formula (forall (A:(complex->complex)) (B:(complex->complex)) (C:(complex->complex)) (D:(complex->complex)) (V:complex), ((((eq (complex->complex)) ((comp_c130555887omplex A) B)) ((comp_c130555887omplex C) D))->(((eq complex) (A (B V))) (C (D V))))) of role axiom named fact_75_comp__eq__dest
% 0.48/0.71  A new axiom: (forall (A:(complex->complex)) (B:(complex->complex)) (C:(complex->complex)) (D:(complex->complex)) (V:complex), ((((eq (complex->complex)) ((comp_c130555887omplex A) B)) ((comp_c130555887omplex C) D))->(((eq complex) (A (B V))) (C (D V)))))
% 0.48/0.71  FOF formula (forall (A:(complex->complex)) (B:(complex->complex)) (C:(complex->complex)) (D:(complex->complex)), ((((eq (complex->complex)) ((comp_c130555887omplex A) B)) ((comp_c130555887omplex C) D))->(forall (V2:complex), (((eq complex) (A (B V2))) (C (D V2)))))) of role axiom named fact_76_comp__eq__elim
% 0.48/0.71  A new axiom: (forall (A:(complex->complex)) (B:(complex->complex)) (C:(complex->complex)) (D:(complex->complex)), ((((eq (complex->complex)) ((comp_c130555887omplex A) B)) ((comp_c130555887omplex C) D))->(forall (V2:complex), (((eq complex) (A (B V2))) (C (D V2))))))
% 0.48/0.71  FOF formula (forall (F:((complex->complex)->(complex->complex))) (N:nat) (X2:(complex->complex)), (((eq (complex->complex)) (F (((compow1098280738omplex N) F) X2))) (((compow1098280738omplex N) F) (F X2)))) of role axiom named fact_77_funpow__swap1
% 0.56/0.72  A new axiom: (forall (F:((complex->complex)->(complex->complex))) (N:nat) (X2:(complex->complex)), (((eq (complex->complex)) (F (((compow1098280738omplex N) F) X2))) (((compow1098280738omplex N) F) (F X2))))
% 0.56/0.72  FOF formula (forall (F:((real->real)->(real->real))) (N:nat) (X2:(real->real)), (((eq (real->real)) (F (((compow1723822618l_real N) F) X2))) (((compow1723822618l_real N) F) (F X2)))) of role axiom named fact_78_funpow__swap1
% 0.56/0.72  A new axiom: (forall (F:((real->real)->(real->real))) (N:nat) (X2:(real->real)), (((eq (real->real)) (F (((compow1723822618l_real N) F) X2))) (((compow1723822618l_real N) F) (F X2))))
% 0.56/0.72  FOF formula (forall (F:(complex->complex)) (N:nat) (X2:complex), (((eq complex) (F (((compow1667379464omplex N) F) X2))) (((compow1667379464omplex N) F) (F X2)))) of role axiom named fact_79_funpow__swap1
% 0.56/0.72  A new axiom: (forall (F:(complex->complex)) (N:nat) (X2:complex), (((eq complex) (F (((compow1667379464omplex N) F) X2))) (((compow1667379464omplex N) F) (F X2))))
% 0.56/0.72  FOF formula (forall (A:(complex->complex)) (B:(complex->complex)) (C:(complex->complex)) (V:complex), ((((eq (complex->complex)) ((comp_c130555887omplex A) B)) C)->(((eq complex) (A (B V))) (C V)))) of role axiom named fact_80_comp__eq__dest__lhs
% 0.56/0.72  A new axiom: (forall (A:(complex->complex)) (B:(complex->complex)) (C:(complex->complex)) (V:complex), ((((eq (complex->complex)) ((comp_c130555887omplex A) B)) C)->(((eq complex) (A (B V))) (C V))))
% 0.56/0.72  FOF formula (forall (X2:nat), (((eq Prop) (((eq nat) zero_zero_nat) X2)) (((eq nat) X2) zero_zero_nat))) of role axiom named fact_81_zero__reorient
% 0.56/0.72  A new axiom: (forall (X2:nat), (((eq Prop) (((eq nat) zero_zero_nat) X2)) (((eq nat) X2) zero_zero_nat)))
% 0.56/0.72  FOF formula (forall (X2:real), (((eq Prop) (((eq real) zero_zero_real) X2)) (((eq real) X2) zero_zero_real))) of role axiom named fact_82_zero__reorient
% 0.56/0.72  A new axiom: (forall (X2:real), (((eq Prop) (((eq real) zero_zero_real) X2)) (((eq real) X2) zero_zero_real)))
% 0.56/0.72  FOF formula (forall (X2:complex), (((eq Prop) (((eq complex) zero_zero_complex) X2)) (((eq complex) X2) zero_zero_complex))) of role axiom named fact_83_zero__reorient
% 0.56/0.72  A new axiom: (forall (X2:complex), (((eq Prop) (((eq complex) zero_zero_complex) X2)) (((eq complex) X2) zero_zero_complex)))
% 0.56/0.72  FOF formula (forall (A:complex) (B:complex), ((not (((eq complex) ((times_times_complex A) B)) zero_zero_complex))->((and (not (((eq complex) A) zero_zero_complex))) (not (((eq complex) B) zero_zero_complex))))) of role axiom named fact_84_mult__not__zero
% 0.56/0.72  A new axiom: (forall (A:complex) (B:complex), ((not (((eq complex) ((times_times_complex A) B)) zero_zero_complex))->((and (not (((eq complex) A) zero_zero_complex))) (not (((eq complex) B) zero_zero_complex)))))
% 0.56/0.72  FOF formula (forall (A:nat) (B:nat), ((not (((eq nat) ((times_times_nat A) B)) zero_zero_nat))->((and (not (((eq nat) A) zero_zero_nat))) (not (((eq nat) B) zero_zero_nat))))) of role axiom named fact_85_mult__not__zero
% 0.56/0.72  A new axiom: (forall (A:nat) (B:nat), ((not (((eq nat) ((times_times_nat A) B)) zero_zero_nat))->((and (not (((eq nat) A) zero_zero_nat))) (not (((eq nat) B) zero_zero_nat)))))
% 0.56/0.72  FOF formula (forall (A:real) (B:real), ((not (((eq real) ((times_times_real A) B)) zero_zero_real))->((and (not (((eq real) A) zero_zero_real))) (not (((eq real) B) zero_zero_real))))) of role axiom named fact_86_mult__not__zero
% 0.56/0.72  A new axiom: (forall (A:real) (B:real), ((not (((eq real) ((times_times_real A) B)) zero_zero_real))->((and (not (((eq real) A) zero_zero_real))) (not (((eq real) B) zero_zero_real)))))
% 0.56/0.72  FOF formula (forall (A:complex) (P:(complex->Prop)), (((eq Prop) ((member_complex A) (collect_complex P))) (P A))) of role axiom named fact_87_mem__Collect__eq
% 0.56/0.72  A new axiom: (forall (A:complex) (P:(complex->Prop)), (((eq Prop) ((member_complex A) (collect_complex P))) (P A)))
% 0.56/0.72  FOF formula (forall (A2:set_complex), (((eq set_complex) (collect_complex (fun (X:complex)=> ((member_complex X) A2)))) A2)) of role axiom named fact_88_Collect__mem__eq
% 0.56/0.73  A new axiom: (forall (A2:set_complex), (((eq set_complex) (collect_complex (fun (X:complex)=> ((member_complex X) A2)))) A2))
% 0.56/0.73  FOF formula (forall (A:complex) (B:complex) (C:complex), (((eq complex) ((times_times_complex ((times_times_complex A) B)) C)) ((times_times_complex A) ((times_times_complex B) C)))) of role axiom named fact_89_mult_Oassoc
% 0.56/0.73  A new axiom: (forall (A:complex) (B:complex) (C:complex), (((eq complex) ((times_times_complex ((times_times_complex A) B)) C)) ((times_times_complex A) ((times_times_complex B) C))))
% 0.56/0.73  FOF formula (forall (A:nat) (B:nat) (C:nat), (((eq nat) ((times_times_nat ((times_times_nat A) B)) C)) ((times_times_nat A) ((times_times_nat B) C)))) of role axiom named fact_90_mult_Oassoc
% 0.56/0.73  A new axiom: (forall (A:nat) (B:nat) (C:nat), (((eq nat) ((times_times_nat ((times_times_nat A) B)) C)) ((times_times_nat A) ((times_times_nat B) C))))
% 0.56/0.73  FOF formula (forall (A:real) (B:real) (C:real), (((eq real) ((times_times_real ((times_times_real A) B)) C)) ((times_times_real A) ((times_times_real B) C)))) of role axiom named fact_91_mult_Oassoc
% 0.56/0.73  A new axiom: (forall (A:real) (B:real) (C:real), (((eq real) ((times_times_real ((times_times_real A) B)) C)) ((times_times_real A) ((times_times_real B) C))))
% 0.56/0.73  FOF formula (((eq (complex->(complex->complex))) times_times_complex) (fun (A3:complex) (B2:complex)=> ((times_times_complex B2) A3))) of role axiom named fact_92_mult_Ocommute
% 0.56/0.73  A new axiom: (((eq (complex->(complex->complex))) times_times_complex) (fun (A3:complex) (B2:complex)=> ((times_times_complex B2) A3)))
% 0.56/0.73  FOF formula (((eq (nat->(nat->nat))) times_times_nat) (fun (A3:nat) (B2:nat)=> ((times_times_nat B2) A3))) of role axiom named fact_93_mult_Ocommute
% 0.56/0.73  A new axiom: (((eq (nat->(nat->nat))) times_times_nat) (fun (A3:nat) (B2:nat)=> ((times_times_nat B2) A3)))
% 0.56/0.73  FOF formula (((eq (real->(real->real))) times_times_real) (fun (A3:real) (B2:real)=> ((times_times_real B2) A3))) of role axiom named fact_94_mult_Ocommute
% 0.56/0.73  A new axiom: (((eq (real->(real->real))) times_times_real) (fun (A3:real) (B2:real)=> ((times_times_real B2) A3)))
% 0.56/0.73  FOF formula (forall (B:complex) (A:complex) (C:complex), (((eq complex) ((times_times_complex B) ((times_times_complex A) C))) ((times_times_complex A) ((times_times_complex B) C)))) of role axiom named fact_95_mult_Oleft__commute
% 0.56/0.73  A new axiom: (forall (B:complex) (A:complex) (C:complex), (((eq complex) ((times_times_complex B) ((times_times_complex A) C))) ((times_times_complex A) ((times_times_complex B) C))))
% 0.56/0.73  FOF formula (forall (B:nat) (A:nat) (C:nat), (((eq nat) ((times_times_nat B) ((times_times_nat A) C))) ((times_times_nat A) ((times_times_nat B) C)))) of role axiom named fact_96_mult_Oleft__commute
% 0.56/0.73  A new axiom: (forall (B:nat) (A:nat) (C:nat), (((eq nat) ((times_times_nat B) ((times_times_nat A) C))) ((times_times_nat A) ((times_times_nat B) C))))
% 0.56/0.73  FOF formula (forall (B:real) (A:real) (C:real), (((eq real) ((times_times_real B) ((times_times_real A) C))) ((times_times_real A) ((times_times_real B) C)))) of role axiom named fact_97_mult_Oleft__commute
% 0.56/0.73  A new axiom: (forall (B:real) (A:real) (C:real), (((eq real) ((times_times_real B) ((times_times_real A) C))) ((times_times_real A) ((times_times_real B) C))))
% 0.56/0.73  FOF formula (forall (A:complex) (B:complex), ((((eq complex) ((times_times_complex A) B)) zero_zero_complex)->((or (((eq complex) A) zero_zero_complex)) (((eq complex) B) zero_zero_complex)))) of role axiom named fact_98_divisors__zero
% 0.56/0.73  A new axiom: (forall (A:complex) (B:complex), ((((eq complex) ((times_times_complex A) B)) zero_zero_complex)->((or (((eq complex) A) zero_zero_complex)) (((eq complex) B) zero_zero_complex))))
% 0.56/0.73  FOF formula (forall (A:nat) (B:nat), ((((eq nat) ((times_times_nat A) B)) zero_zero_nat)->((or (((eq nat) A) zero_zero_nat)) (((eq nat) B) zero_zero_nat)))) of role axiom named fact_99_divisors__zero
% 0.56/0.73  A new axiom: (forall (A:nat) (B:nat), ((((eq nat) ((times_times_nat A) B)) zero_zero_nat)->((or (((eq nat) A) zero_zero_nat)) (((eq nat) B) zero_zero_nat))))
% 0.56/0.73  FOF formula (forall (A:real) (B:real), ((((eq real) ((times_times_real A) B)) zero_zero_real)->((or (((eq real) A) zero_zero_real)) (((eq real) B) zero_zero_real)))) of role axiom named fact_100_divisors__zero
% 0.56/0.75  A new axiom: (forall (A:real) (B:real), ((((eq real) ((times_times_real A) B)) zero_zero_real)->((or (((eq real) A) zero_zero_real)) (((eq real) B) zero_zero_real))))
% 0.56/0.75  FOF formula (forall (A:complex) (B:complex), ((not (((eq complex) A) zero_zero_complex))->((not (((eq complex) B) zero_zero_complex))->(not (((eq complex) ((times_times_complex A) B)) zero_zero_complex))))) of role axiom named fact_101_no__zero__divisors
% 0.56/0.75  A new axiom: (forall (A:complex) (B:complex), ((not (((eq complex) A) zero_zero_complex))->((not (((eq complex) B) zero_zero_complex))->(not (((eq complex) ((times_times_complex A) B)) zero_zero_complex)))))
% 0.56/0.75  FOF formula (forall (A:nat) (B:nat), ((not (((eq nat) A) zero_zero_nat))->((not (((eq nat) B) zero_zero_nat))->(not (((eq nat) ((times_times_nat A) B)) zero_zero_nat))))) of role axiom named fact_102_no__zero__divisors
% 0.56/0.75  A new axiom: (forall (A:nat) (B:nat), ((not (((eq nat) A) zero_zero_nat))->((not (((eq nat) B) zero_zero_nat))->(not (((eq nat) ((times_times_nat A) B)) zero_zero_nat)))))
% 0.56/0.75  FOF formula (forall (A:real) (B:real), ((not (((eq real) A) zero_zero_real))->((not (((eq real) B) zero_zero_real))->(not (((eq real) ((times_times_real A) B)) zero_zero_real))))) of role axiom named fact_103_no__zero__divisors
% 0.56/0.75  A new axiom: (forall (A:real) (B:real), ((not (((eq real) A) zero_zero_real))->((not (((eq real) B) zero_zero_real))->(not (((eq real) ((times_times_real A) B)) zero_zero_real)))))
% 0.56/0.75  FOF formula (forall (C:complex) (A:complex) (B:complex), ((not (((eq complex) C) zero_zero_complex))->(((eq Prop) (((eq complex) ((times_times_complex C) A)) ((times_times_complex C) B))) (((eq complex) A) B)))) of role axiom named fact_104_mult__left__cancel
% 0.56/0.75  A new axiom: (forall (C:complex) (A:complex) (B:complex), ((not (((eq complex) C) zero_zero_complex))->(((eq Prop) (((eq complex) ((times_times_complex C) A)) ((times_times_complex C) B))) (((eq complex) A) B))))
% 0.56/0.75  FOF formula (forall (C:nat) (A:nat) (B:nat), ((not (((eq nat) C) zero_zero_nat))->(((eq Prop) (((eq nat) ((times_times_nat C) A)) ((times_times_nat C) B))) (((eq nat) A) B)))) of role axiom named fact_105_mult__left__cancel
% 0.56/0.75  A new axiom: (forall (C:nat) (A:nat) (B:nat), ((not (((eq nat) C) zero_zero_nat))->(((eq Prop) (((eq nat) ((times_times_nat C) A)) ((times_times_nat C) B))) (((eq nat) A) B))))
% 0.56/0.75  FOF formula (forall (C:real) (A:real) (B:real), ((not (((eq real) C) zero_zero_real))->(((eq Prop) (((eq real) ((times_times_real C) A)) ((times_times_real C) B))) (((eq real) A) B)))) of role axiom named fact_106_mult__left__cancel
% 0.56/0.75  A new axiom: (forall (C:real) (A:real) (B:real), ((not (((eq real) C) zero_zero_real))->(((eq Prop) (((eq real) ((times_times_real C) A)) ((times_times_real C) B))) (((eq real) A) B))))
% 0.56/0.75  FOF formula (forall (C:complex) (A:complex) (B:complex), ((not (((eq complex) C) zero_zero_complex))->(((eq Prop) (((eq complex) ((times_times_complex A) C)) ((times_times_complex B) C))) (((eq complex) A) B)))) of role axiom named fact_107_mult__right__cancel
% 0.56/0.75  A new axiom: (forall (C:complex) (A:complex) (B:complex), ((not (((eq complex) C) zero_zero_complex))->(((eq Prop) (((eq complex) ((times_times_complex A) C)) ((times_times_complex B) C))) (((eq complex) A) B))))
% 0.56/0.75  FOF formula (forall (C:nat) (A:nat) (B:nat), ((not (((eq nat) C) zero_zero_nat))->(((eq Prop) (((eq nat) ((times_times_nat A) C)) ((times_times_nat B) C))) (((eq nat) A) B)))) of role axiom named fact_108_mult__right__cancel
% 0.56/0.75  A new axiom: (forall (C:nat) (A:nat) (B:nat), ((not (((eq nat) C) zero_zero_nat))->(((eq Prop) (((eq nat) ((times_times_nat A) C)) ((times_times_nat B) C))) (((eq nat) A) B))))
% 0.56/0.75  FOF formula (forall (C:real) (A:real) (B:real), ((not (((eq real) C) zero_zero_real))->(((eq Prop) (((eq real) ((times_times_real A) C)) ((times_times_real B) C))) (((eq real) A) B)))) of role axiom named fact_109_mult__right__cancel
% 0.56/0.75  A new axiom: (forall (C:real) (A:real) (B:real), ((not (((eq real) C) zero_zero_real))->(((eq Prop) (((eq real) ((times_times_real A) C)) ((times_times_real B) C))) (((eq real) A) B))))
% 0.56/0.76  FOF formula (forall (A:(complex->complex)) (B:(complex->complex)) (C:(complex->complex)) (V:complex), ((((eq (complex->complex)) ((comp_c130555887omplex A) B)) ((comp_c130555887omplex id_complex) C))->(((eq complex) (A (B V))) (C V)))) of role axiom named fact_110_comp__eq__id__dest
% 0.56/0.76  A new axiom: (forall (A:(complex->complex)) (B:(complex->complex)) (C:(complex->complex)) (V:complex), ((((eq (complex->complex)) ((comp_c130555887omplex A) B)) ((comp_c130555887omplex id_complex) C))->(((eq complex) (A (B V))) (C V))))
% 0.56/0.76  FOF formula (forall (A:complex), (((eq complex) ((times_times_complex A) one_one_complex)) A)) of role axiom named fact_111_mult_Ocomm__neutral
% 0.56/0.76  A new axiom: (forall (A:complex), (((eq complex) ((times_times_complex A) one_one_complex)) A))
% 0.56/0.76  FOF formula (forall (A:nat), (((eq nat) ((times_times_nat A) one_one_nat)) A)) of role axiom named fact_112_mult_Ocomm__neutral
% 0.56/0.76  A new axiom: (forall (A:nat), (((eq nat) ((times_times_nat A) one_one_nat)) A))
% 0.56/0.76  FOF formula (forall (A:real), (((eq real) ((times_times_real A) one_one_real)) A)) of role axiom named fact_113_mult_Ocomm__neutral
% 0.56/0.76  A new axiom: (forall (A:real), (((eq real) ((times_times_real A) one_one_real)) A))
% 0.56/0.76  FOF formula (forall (A:complex), (((eq complex) ((times_times_complex one_one_complex) A)) A)) of role axiom named fact_114_comm__monoid__mult__class_Omult__1
% 0.56/0.76  A new axiom: (forall (A:complex), (((eq complex) ((times_times_complex one_one_complex) A)) A))
% 0.56/0.76  FOF formula (forall (A:nat), (((eq nat) ((times_times_nat one_one_nat) A)) A)) of role axiom named fact_115_comm__monoid__mult__class_Omult__1
% 0.56/0.76  A new axiom: (forall (A:nat), (((eq nat) ((times_times_nat one_one_nat) A)) A))
% 0.56/0.76  FOF formula (forall (A:real), (((eq real) ((times_times_real one_one_real) A)) A)) of role axiom named fact_116_comm__monoid__mult__class_Omult__1
% 0.56/0.76  A new axiom: (forall (A:real), (((eq real) ((times_times_real one_one_real) A)) A))
% 0.56/0.76  FOF formula (forall (F:(real->real)), (((eq (real->real)) ((compow_real_real zero_zero_nat) F)) id_real)) of role axiom named fact_117_funpow__simps__right_I1_J
% 0.56/0.76  A new axiom: (forall (F:(real->real)), (((eq (real->real)) ((compow_real_real zero_zero_nat) F)) id_real))
% 0.56/0.76  FOF formula (forall (F:((complex->complex)->(complex->complex))), (((eq ((complex->complex)->(complex->complex))) ((compow1098280738omplex zero_zero_nat) F)) id_complex_complex)) of role axiom named fact_118_funpow__simps__right_I1_J
% 0.56/0.76  A new axiom: (forall (F:((complex->complex)->(complex->complex))), (((eq ((complex->complex)->(complex->complex))) ((compow1098280738omplex zero_zero_nat) F)) id_complex_complex))
% 0.56/0.76  FOF formula (forall (F:((real->real)->(real->real))), (((eq ((real->real)->(real->real))) ((compow1723822618l_real zero_zero_nat) F)) id_real_real)) of role axiom named fact_119_funpow__simps__right_I1_J
% 0.56/0.76  A new axiom: (forall (F:((real->real)->(real->real))), (((eq ((real->real)->(real->real))) ((compow1723822618l_real zero_zero_nat) F)) id_real_real))
% 0.56/0.76  FOF formula (forall (F:(complex->complex)), (((eq (complex->complex)) ((compow1667379464omplex zero_zero_nat) F)) id_complex)) of role axiom named fact_120_funpow__simps__right_I1_J
% 0.56/0.76  A new axiom: (forall (F:(complex->complex)), (((eq (complex->complex)) ((compow1667379464omplex zero_zero_nat) F)) id_complex))
% 0.56/0.76  FOF formula (forall (T:(complex->complex)), (((eq (complex->complex)) ((comp_c130555887omplex id_complex) T)) T)) of role axiom named fact_121_fun_Omap__id
% 0.56/0.76  A new axiom: (forall (T:(complex->complex)), (((eq (complex->complex)) ((comp_c130555887omplex id_complex) T)) T))
% 0.56/0.76  FOF formula (forall (X2:complex), (((eq complex) ((times_times_complex one_one_complex) X2)) X2)) of role axiom named fact_122_vector__space__over__itself_Oscale__one
% 0.56/0.76  A new axiom: (forall (X2:complex), (((eq complex) ((times_times_complex one_one_complex) X2)) X2))
% 0.56/0.76  FOF formula (forall (X2:real), (((eq real) ((times_times_real one_one_real) X2)) X2)) of role axiom named fact_123_vector__space__over__itself_Oscale__one
% 0.56/0.76  A new axiom: (forall (X2:real), (((eq real) ((times_times_real one_one_real) X2)) X2))
% 0.56/0.77  FOF formula (forall (A:complex) (X2:complex), (((eq Prop) (((eq complex) ((times_times_complex A) X2)) zero_zero_complex)) ((or (((eq complex) A) zero_zero_complex)) (((eq complex) X2) zero_zero_complex)))) of role axiom named fact_124_vector__space__over__itself_Oscale__eq__0__iff
% 0.56/0.77  A new axiom: (forall (A:complex) (X2:complex), (((eq Prop) (((eq complex) ((times_times_complex A) X2)) zero_zero_complex)) ((or (((eq complex) A) zero_zero_complex)) (((eq complex) X2) zero_zero_complex))))
% 0.56/0.77  FOF formula (forall (A:real) (X2:real), (((eq Prop) (((eq real) ((times_times_real A) X2)) zero_zero_real)) ((or (((eq real) A) zero_zero_real)) (((eq real) X2) zero_zero_real)))) of role axiom named fact_125_vector__space__over__itself_Oscale__eq__0__iff
% 0.56/0.77  A new axiom: (forall (A:real) (X2:real), (((eq Prop) (((eq real) ((times_times_real A) X2)) zero_zero_real)) ((or (((eq real) A) zero_zero_real)) (((eq real) X2) zero_zero_real))))
% 0.56/0.77  FOF formula (forall (X2:complex), (((eq complex) ((times_times_complex zero_zero_complex) X2)) zero_zero_complex)) of role axiom named fact_126_vector__space__over__itself_Oscale__zero__left
% 0.56/0.77  A new axiom: (forall (X2:complex), (((eq complex) ((times_times_complex zero_zero_complex) X2)) zero_zero_complex))
% 0.56/0.77  FOF formula (forall (X2:real), (((eq real) ((times_times_real zero_zero_real) X2)) zero_zero_real)) of role axiom named fact_127_vector__space__over__itself_Oscale__zero__left
% 0.56/0.77  A new axiom: (forall (X2:real), (((eq real) ((times_times_real zero_zero_real) X2)) zero_zero_real))
% 0.56/0.77  FOF formula (forall (A:complex), (((eq complex) ((times_times_complex A) zero_zero_complex)) zero_zero_complex)) of role axiom named fact_128_vector__space__over__itself_Oscale__zero__right
% 0.56/0.77  A new axiom: (forall (A:complex), (((eq complex) ((times_times_complex A) zero_zero_complex)) zero_zero_complex))
% 0.56/0.77  FOF formula (forall (A:real), (((eq real) ((times_times_real A) zero_zero_real)) zero_zero_real)) of role axiom named fact_129_vector__space__over__itself_Oscale__zero__right
% 0.56/0.77  A new axiom: (forall (A:real), (((eq real) ((times_times_real A) zero_zero_real)) zero_zero_real))
% 0.56/0.77  FOF formula (forall (A:complex) (X2:complex) (Y:complex), (((eq Prop) (((eq complex) ((times_times_complex A) X2)) ((times_times_complex A) Y))) ((or (((eq complex) X2) Y)) (((eq complex) A) zero_zero_complex)))) of role axiom named fact_130_vector__space__over__itself_Oscale__cancel__left
% 0.56/0.77  A new axiom: (forall (A:complex) (X2:complex) (Y:complex), (((eq Prop) (((eq complex) ((times_times_complex A) X2)) ((times_times_complex A) Y))) ((or (((eq complex) X2) Y)) (((eq complex) A) zero_zero_complex))))
% 0.56/0.77  FOF formula (forall (A:real) (X2:real) (Y:real), (((eq Prop) (((eq real) ((times_times_real A) X2)) ((times_times_real A) Y))) ((or (((eq real) X2) Y)) (((eq real) A) zero_zero_real)))) of role axiom named fact_131_vector__space__over__itself_Oscale__cancel__left
% 0.56/0.77  A new axiom: (forall (A:real) (X2:real) (Y:real), (((eq Prop) (((eq real) ((times_times_real A) X2)) ((times_times_real A) Y))) ((or (((eq real) X2) Y)) (((eq real) A) zero_zero_real))))
% 0.56/0.77  FOF formula (forall (A:complex) (X2:complex) (B:complex), (((eq Prop) (((eq complex) ((times_times_complex A) X2)) ((times_times_complex B) X2))) ((or (((eq complex) A) B)) (((eq complex) X2) zero_zero_complex)))) of role axiom named fact_132_vector__space__over__itself_Oscale__cancel__right
% 0.56/0.77  A new axiom: (forall (A:complex) (X2:complex) (B:complex), (((eq Prop) (((eq complex) ((times_times_complex A) X2)) ((times_times_complex B) X2))) ((or (((eq complex) A) B)) (((eq complex) X2) zero_zero_complex))))
% 0.56/0.77  FOF formula (forall (A:real) (X2:real) (B:real), (((eq Prop) (((eq real) ((times_times_real A) X2)) ((times_times_real B) X2))) ((or (((eq real) A) B)) (((eq real) X2) zero_zero_real)))) of role axiom named fact_133_vector__space__over__itself_Oscale__cancel__right
% 0.56/0.77  A new axiom: (forall (A:real) (X2:real) (B:real), (((eq Prop) (((eq real) ((times_times_real A) X2)) ((times_times_real B) X2))) ((or (((eq real) A) B)) (((eq real) X2) zero_zero_real))))
% 0.56/0.77  <<<_complex @ P @ one_one_complex @ zero_zero_complex ) @ Q )
% 0.56/0.77            = Q ) )
% 0.56/0.77        & ( ~ P>>>!!!<<<
% 0.56/0.77         => ( ( times_times_complex @ ( if_complex @ P @ one_one_complex @ zero_zero_comple>>>
% 0.56/0.77  statestack=[0, 1, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 11, 22, 30, 36, 43, 50, 99, 113, 185, 229, 265, 285, 300, 221, 120, 189, 221, 124]
% 0.56/0.77  symstack=[$end, TPTP_file_pre, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, TPTP_input, LexToken(THF,'thf',1,38699), LexToken(LPAR,'(',1,38702), name, LexToken(COMMA,',',1,38727), formula_role, LexToken(COMMA,',',1,38733), LexToken(LPAR,'(',1,38734), thf_quantified_formula_PRE, thf_quantifier, LexToken(LBRACKET,'[',1,38742), thf_variable_list, LexToken(RBRACKET,']',1,38759), LexToken(COLON,':',1,38761), LexToken(LPAR,'(',1,38769), thf_unitary_formula, LexToken(AMP,'&',1,38898), LexToken(LPAR,'(',1,38900), unary_connective]
% 0.56/0.77  Unexpected exception Syntax error at 'P':UPPERWORD
% 0.56/0.77  Traceback (most recent call last):
% 0.56/0.77    File "CASC.py", line 79, in <module>
% 0.56/0.77      problem=TPTP.TPTPproblem(env=environment,debug=1,file=file)
% 0.56/0.77    File "/export/starexec/sandbox/solver/bin/TPTP.py", line 38, in __init__
% 0.56/0.77      parser.parse(file.read(),debug=0,lexer=lexer)
% 0.56/0.77    File "/export/starexec/sandbox/solver/bin/ply/yacc.py", line 265, in parse
% 0.56/0.77      return self.parseopt_notrack(input,lexer,debug,tracking,tokenfunc)
% 0.56/0.77    File "/export/starexec/sandbox/solver/bin/ply/yacc.py", line 1047, in parseopt_notrack
% 0.56/0.77      tok = self.errorfunc(errtoken)
% 0.56/0.77    File "/export/starexec/sandbox/solver/bin/TPTPparser.py", line 2099, in p_error
% 0.56/0.77      raise TPTPParsingError("Syntax error at '%s':%s" % (t.value,t.type))
% 0.56/0.77  TPTPparser.TPTPParsingError: Syntax error at 'P':UPPERWORD
%------------------------------------------------------------------------------