TSTP Solution File: ITP111^1 by cocATP---0.2.0
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- Process Solution
%------------------------------------------------------------------------------
% File : cocATP---0.2.0
% Problem : ITP111^1 : TPTP v7.5.0. Released v7.5.0.
% Transfm : none
% Format : tptp:raw
% Command : python CASC.py /export/starexec/sandbox2/benchmark/theBenchmark.p
% Computer : n018.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 13:24:13 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
% 0.08/0.12 % Problem : ITP111^1 : TPTP v7.5.0. Released v7.5.0.
% 0.08/0.13 % Command : python CASC.py /export/starexec/sandbox2/benchmark/theBenchmark.p
% 0.12/0.34 % Computer : n018.cluster.edu
% 0.12/0.34 % Model : x86_64 x86_64
% 0.12/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.34 % Memory : 8042.1875MB
% 0.12/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.34 % CPULimit : 300
% 0.12/0.34 % DateTime : Fri Mar 19 06:11:22 EDT 2021
% 0.12/0.34 % CPUTime :
% 0.12/0.35 ModuleCmd_Load.c(213):ERROR:105: Unable to locate a modulefile for 'python/python27'
% 0.12/0.35 Python 2.7.5
% 0.47/0.63 Using paths ['/home/cristobal/cocATP/CASC/TPTP/', '/export/starexec/sandbox2/benchmark/', '/export/starexec/sandbox2/benchmark/']
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d248>, <kernel.Type object at 0x1c9df80>) of role type named ty_n_t__Extended____Real__Oereal
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring extended_ereal:Type
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x2aea4e536ea8>, <kernel.Type object at 0x1c9d710>) of role type named ty_n_t__Set__Oset_Itf__a_J
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring set_a:Type
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x2aea4e536ea8>, <kernel.Type object at 0x1c9def0>) of role type named ty_n_tf__a
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring a:Type
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d248>, <kernel.Constant object at 0x1c9d1b8>) of role type named sy_c_Extended__Nat_Oinfinity__class_Oinfinity_001t__Extended____Real__Oereal
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring extend1289208545_ereal:extended_ereal
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d9e0>, <kernel.Constant object at 0x1c9d2d8>) of role type named sy_c_Extended__Real_Oereal_OMInfty
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring extended_MInfty:extended_ereal
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d710>, <kernel.Constant object at 0x1c9d2d8>) of role type named sy_c_Extended__Real_Oereal_OPInfty
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring extended_PInfty:extended_ereal
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d1b8>, <kernel.DependentProduct object at 0x1c9de18>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Extended____Real__Oereal
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring times_1966848393_ereal:(extended_ereal->(extended_ereal->extended_ereal))
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d9e0>, <kernel.DependentProduct object at 0x1c9d830>) of role type named sy_c_Groups_Ouminus__class_Ouminus_001t__Extended____Real__Oereal
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring uminus1208298309_ereal:(extended_ereal->extended_ereal)
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d320>, <kernel.Constant object at 0x1c9d830>) of role type named sy_c_Groups_Ozero__class_Ozero_001t__Extended____Real__Oereal
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring zero_z163181189_ereal:extended_ereal
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d1b8>, <kernel.DependentProduct object at 0x1c9d098>) of role type named sy_c_Lower__Semicontinuous__Mirabelle__mxyexokbxt_Olsc__at_001tf__a_001t__Extended____Real__Oereal
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring lower_191460856_ereal:(a->((a->extended_ereal)->Prop))
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d560>, <kernel.DependentProduct object at 0x1c9dc20>) of role type named sy_c_Orderings_Oord__class_Oless_001t__Extended____Real__Oereal
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring ord_le2001149050_ereal:(extended_ereal->(extended_ereal->Prop))
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d830>, <kernel.DependentProduct object at 0x1c9da70>) of role type named sy_c_Rings_Odivide__class_Odivide_001t__Extended____Real__Oereal
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring divide595620860_ereal:(extended_ereal->(extended_ereal->extended_ereal))
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d098>, <kernel.DependentProduct object at 0x1c9d5f0>) of role type named sy_c_Set_OCollect_001tf__a
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring collect_a:((a->Prop)->set_a)
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d9e0>, <kernel.DependentProduct object at 0x1c9de18>) of role type named sy_c_Topological__Spaces_Oopen__class_Oopen_001tf__a
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring topolo1276428101open_a:(set_a->Prop)
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d7a0>, <kernel.DependentProduct object at 0x1c9d560>) of role type named sy_c_member_001tf__a
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring member_a:(a->(set_a->Prop))
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9d5f0>, <kernel.DependentProduct object at 0x1c9a2d8>) of role type named sy_v_f
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring f:(a->extended_ereal)
% 0.47/0.63 FOF formula (<kernel.Constant object at 0x1c9de18>, <kernel.Constant object at 0x1c9d7a0>) of role type named sy_v_x0
% 0.47/0.63 Using role type
% 0.47/0.63 Declaring x0:a
% 0.47/0.63 FOF formula ((((eq extended_ereal) (f x0)) extend1289208545_ereal)->(((eq Prop) ((lower_191460856_ereal x0) f)) (forall (C:extended_ereal), (((ord_le2001149050_ereal C) (f x0))->((ex set_a) (fun (T:set_a)=> ((and ((and (topolo1276428101open_a T)) ((member_a x0) T))) (forall (X:a), (((member_a X) T)->((ord_le2001149050_ereal C) (f X))))))))))) of role axiom named fact_0__092_060open_062f_Ax0_A_061_A_092_060infinity_062_A_092_060Longrightarrow_062_Alsc__at_Ax0_Af_A_061_A_I_092_060forall_062C_060f_Ax0_O_A_092_060exists_062T_O_Aopen_AT_A_092_060and_062_Ax0_A_092_060in_062_AT_A_092_060and_062_A_I_092_060forall_062y_092_060in_062T_O_AC_A_060_Af_Ay_J_J_092_060close_062
% 0.47/0.64 A new axiom: ((((eq extended_ereal) (f x0)) extend1289208545_ereal)->(((eq Prop) ((lower_191460856_ereal x0) f)) (forall (C:extended_ereal), (((ord_le2001149050_ereal C) (f x0))->((ex set_a) (fun (T:set_a)=> ((and ((and (topolo1276428101open_a T)) ((member_a x0) T))) (forall (X:a), (((member_a X) T)->((ord_le2001149050_ereal C) (f X)))))))))))
% 0.47/0.64 FOF formula ((((eq extended_ereal) (f x0)) (uminus1208298309_ereal extend1289208545_ereal))->(((eq Prop) ((lower_191460856_ereal x0) f)) (forall (C:extended_ereal), (((ord_le2001149050_ereal C) (f x0))->((ex set_a) (fun (T:set_a)=> ((and ((and (topolo1276428101open_a T)) ((member_a x0) T))) (forall (X:a), (((member_a X) T)->((ord_le2001149050_ereal C) (f X))))))))))) of role axiom named fact_1__092_060open_062f_Ax0_A_061_A_N_A_092_060infinity_062_A_092_060Longrightarrow_062_Alsc__at_Ax0_Af_A_061_A_I_092_060forall_062C_060f_Ax0_O_A_092_060exists_062T_O_Aopen_AT_A_092_060and_062_Ax0_A_092_060in_062_AT_A_092_060and_062_A_I_092_060forall_062y_092_060in_062T_O_AC_A_060_Af_Ay_J_J_092_060close_062
% 0.47/0.64 A new axiom: ((((eq extended_ereal) (f x0)) (uminus1208298309_ereal extend1289208545_ereal))->(((eq Prop) ((lower_191460856_ereal x0) f)) (forall (C:extended_ereal), (((ord_le2001149050_ereal C) (f x0))->((ex set_a) (fun (T:set_a)=> ((and ((and (topolo1276428101open_a T)) ((member_a x0) T))) (forall (X:a), (((member_a X) T)->((ord_le2001149050_ereal C) (f X)))))))))))
% 0.47/0.64 FOF formula ((not (((eq extended_ereal) (f x0)) (uminus1208298309_ereal extend1289208545_ereal)))->((not (((eq extended_ereal) (f x0)) extend1289208545_ereal))->(((eq Prop) ((lower_191460856_ereal x0) f)) (forall (C:extended_ereal), (((ord_le2001149050_ereal C) (f x0))->((ex set_a) (fun (T:set_a)=> ((and ((and (topolo1276428101open_a T)) ((member_a x0) T))) (forall (X:a), (((member_a X) T)->((ord_le2001149050_ereal C) (f X)))))))))))) of role axiom named fact_2__092_060open_062_092_060lbrakk_062f_Ax0_A_092_060noteq_062_A_N_A_092_060infinity_062_059_Af_Ax0_A_092_060noteq_062_A_092_060infinity_062_092_060rbrakk_062_A_092_060Longrightarrow_062_Alsc__at_Ax0_Af_A_061_A_I_092_060forall_062C_060f_Ax0_O_A_092_060exists_062T_O_Aopen_AT_A_092_060and_062_Ax0_A_092_060in_062_AT_A_092_060and_062_A_I_092_060forall_062y_092_060in_062T_O_AC_A_060_Af_Ay_J_J_092_060close_062
% 0.47/0.64 A new axiom: ((not (((eq extended_ereal) (f x0)) (uminus1208298309_ereal extend1289208545_ereal)))->((not (((eq extended_ereal) (f x0)) extend1289208545_ereal))->(((eq Prop) ((lower_191460856_ereal x0) f)) (forall (C:extended_ereal), (((ord_le2001149050_ereal C) (f x0))->((ex set_a) (fun (T:set_a)=> ((and ((and (topolo1276428101open_a T)) ((member_a x0) T))) (forall (X:a), (((member_a X) T)->((ord_le2001149050_ereal C) (f X))))))))))))
% 0.47/0.64 FOF formula (forall (F:(a->extended_ereal)) (X0:a), ((((eq extended_ereal) (F X0)) (uminus1208298309_ereal extend1289208545_ereal))->((lower_191460856_ereal X0) F))) of role axiom named fact_3_lsc__at__MInfty
% 0.47/0.64 A new axiom: (forall (F:(a->extended_ereal)) (X0:a), ((((eq extended_ereal) (F X0)) (uminus1208298309_ereal extend1289208545_ereal))->((lower_191460856_ereal X0) F)))
% 0.47/0.64 FOF formula (forall (X2:a) (Y:a), ((not (((eq a) X2) Y))->((ex set_a) (fun (U:set_a)=> ((and (topolo1276428101open_a U)) (not (((eq Prop) ((member_a X2) U)) ((member_a Y) U)))))))) of role axiom named fact_4_t0__space
% 0.47/0.64 A new axiom: (forall (X2:a) (Y:a), ((not (((eq a) X2) Y))->((ex set_a) (fun (U:set_a)=> ((and (topolo1276428101open_a U)) (not (((eq Prop) ((member_a X2) U)) ((member_a Y) U))))))))
% 0.47/0.64 FOF formula (forall (X2:a) (Y:a), ((not (((eq a) X2) Y))->((ex set_a) (fun (U:set_a)=> ((and ((and (topolo1276428101open_a U)) ((member_a X2) U))) (((member_a Y) U)->False)))))) of role axiom named fact_5_t1__space
% 0.47/0.66 A new axiom: (forall (X2:a) (Y:a), ((not (((eq a) X2) Y))->((ex set_a) (fun (U:set_a)=> ((and ((and (topolo1276428101open_a U)) ((member_a X2) U))) (((member_a Y) U)->False))))))
% 0.47/0.66 FOF formula (forall (X2:a) (Y:a), (((eq Prop) (not (((eq a) X2) Y))) ((ex set_a) (fun (U2:set_a)=> ((and (topolo1276428101open_a U2)) (not (((eq Prop) ((member_a X2) U2)) ((member_a Y) U2)))))))) of role axiom named fact_6_separation__t0
% 0.47/0.66 A new axiom: (forall (X2:a) (Y:a), (((eq Prop) (not (((eq a) X2) Y))) ((ex set_a) (fun (U2:set_a)=> ((and (topolo1276428101open_a U2)) (not (((eq Prop) ((member_a X2) U2)) ((member_a Y) U2))))))))
% 0.47/0.66 FOF formula (forall (X2:a) (Y:a), (((eq Prop) (not (((eq a) X2) Y))) ((ex set_a) (fun (U2:set_a)=> ((and ((and (topolo1276428101open_a U2)) ((member_a X2) U2))) (((member_a Y) U2)->False)))))) of role axiom named fact_7_separation__t1
% 0.47/0.66 A new axiom: (forall (X2:a) (Y:a), (((eq Prop) (not (((eq a) X2) Y))) ((ex set_a) (fun (U2:set_a)=> ((and ((and (topolo1276428101open_a U2)) ((member_a X2) U2))) (((member_a Y) U2)->False))))))
% 0.47/0.66 FOF formula (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(((ord_le2001149050_ereal T2) X3)->False)))))) of role axiom named fact_8_minf_I7_J
% 0.47/0.66 A new axiom: (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(((ord_le2001149050_ereal T2) X3)->False))))))
% 0.47/0.66 FOF formula (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->((ord_le2001149050_ereal X3) T2)))))) of role axiom named fact_9_minf_I5_J
% 0.47/0.66 A new axiom: (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->((ord_le2001149050_ereal X3) T2))))))
% 0.47/0.66 FOF formula (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(not (((eq extended_ereal) X3) T2))))))) of role axiom named fact_10_minf_I4_J
% 0.47/0.66 A new axiom: (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(not (((eq extended_ereal) X3) T2)))))))
% 0.47/0.66 FOF formula (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(not (((eq extended_ereal) X3) T2))))))) of role axiom named fact_11_minf_I3_J
% 0.47/0.66 A new axiom: (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(not (((eq extended_ereal) X3) T2)))))))
% 0.47/0.66 FOF formula (forall (P:(extended_ereal->Prop)) (P2:(extended_ereal->Prop)) (Q:(extended_ereal->Prop)) (Q2:(extended_ereal->Prop)), (((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal X4) Z2)->(((eq Prop) (P X4)) (P2 X4))))))->(((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal X4) Z2)->(((eq Prop) (Q X4)) (Q2 X4))))))->((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(((eq Prop) ((or (P X3)) (Q X3))) ((or (P2 X3)) (Q2 X3)))))))))) of role axiom named fact_12_minf_I2_J
% 0.47/0.66 A new axiom: (forall (P:(extended_ereal->Prop)) (P2:(extended_ereal->Prop)) (Q:(extended_ereal->Prop)) (Q2:(extended_ereal->Prop)), (((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal X4) Z2)->(((eq Prop) (P X4)) (P2 X4))))))->(((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal X4) Z2)->(((eq Prop) (Q X4)) (Q2 X4))))))->((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(((eq Prop) ((or (P X3)) (Q X3))) ((or (P2 X3)) (Q2 X3))))))))))
% 0.47/0.66 FOF formula (forall (P:(extended_ereal->Prop)) (P2:(extended_ereal->Prop)) (Q:(extended_ereal->Prop)) (Q2:(extended_ereal->Prop)), (((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal Z2) X4)->(((eq Prop) (P X4)) (P2 X4))))))->(((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal Z2) X4)->(((eq Prop) (Q X4)) (Q2 X4))))))->((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(((eq Prop) ((and (P X3)) (Q X3))) ((and (P2 X3)) (Q2 X3)))))))))) of role axiom named fact_13_pinf_I1_J
% 0.47/0.66 A new axiom: (forall (P:(extended_ereal->Prop)) (P2:(extended_ereal->Prop)) (Q:(extended_ereal->Prop)) (Q2:(extended_ereal->Prop)), (((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal Z2) X4)->(((eq Prop) (P X4)) (P2 X4))))))->(((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal Z2) X4)->(((eq Prop) (Q X4)) (Q2 X4))))))->((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(((eq Prop) ((and (P X3)) (Q X3))) ((and (P2 X3)) (Q2 X3))))))))))
% 0.47/0.66 FOF formula (forall (P:(extended_ereal->Prop)) (P2:(extended_ereal->Prop)) (Q:(extended_ereal->Prop)) (Q2:(extended_ereal->Prop)), (((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal Z2) X4)->(((eq Prop) (P X4)) (P2 X4))))))->(((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal Z2) X4)->(((eq Prop) (Q X4)) (Q2 X4))))))->((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(((eq Prop) ((or (P X3)) (Q X3))) ((or (P2 X3)) (Q2 X3)))))))))) of role axiom named fact_14_pinf_I2_J
% 0.47/0.66 A new axiom: (forall (P:(extended_ereal->Prop)) (P2:(extended_ereal->Prop)) (Q:(extended_ereal->Prop)) (Q2:(extended_ereal->Prop)), (((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal Z2) X4)->(((eq Prop) (P X4)) (P2 X4))))))->(((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal Z2) X4)->(((eq Prop) (Q X4)) (Q2 X4))))))->((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(((eq Prop) ((or (P X3)) (Q X3))) ((or (P2 X3)) (Q2 X3))))))))))
% 0.47/0.66 FOF formula (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(not (((eq extended_ereal) X3) T2))))))) of role axiom named fact_15_pinf_I3_J
% 0.47/0.66 A new axiom: (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(not (((eq extended_ereal) X3) T2)))))))
% 0.47/0.66 FOF formula (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(not (((eq extended_ereal) X3) T2))))))) of role axiom named fact_16_pinf_I4_J
% 0.47/0.66 A new axiom: (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(not (((eq extended_ereal) X3) T2)))))))
% 0.47/0.66 FOF formula (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(((ord_le2001149050_ereal X3) T2)->False)))))) of role axiom named fact_17_pinf_I5_J
% 0.47/0.66 A new axiom: (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->(((ord_le2001149050_ereal X3) T2)->False))))))
% 0.47/0.66 FOF formula (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->((ord_le2001149050_ereal T2) X3)))))) of role axiom named fact_18_pinf_I7_J
% 0.47/0.66 A new axiom: (forall (T2:extended_ereal), ((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal Z) X3)->((ord_le2001149050_ereal T2) X3))))))
% 0.47/0.67 FOF formula (forall (P:(extended_ereal->Prop)) (P2:(extended_ereal->Prop)) (Q:(extended_ereal->Prop)) (Q2:(extended_ereal->Prop)), (((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal X4) Z2)->(((eq Prop) (P X4)) (P2 X4))))))->(((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal X4) Z2)->(((eq Prop) (Q X4)) (Q2 X4))))))->((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(((eq Prop) ((and (P X3)) (Q X3))) ((and (P2 X3)) (Q2 X3)))))))))) of role axiom named fact_19_minf_I1_J
% 0.47/0.67 A new axiom: (forall (P:(extended_ereal->Prop)) (P2:(extended_ereal->Prop)) (Q:(extended_ereal->Prop)) (Q2:(extended_ereal->Prop)), (((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal X4) Z2)->(((eq Prop) (P X4)) (P2 X4))))))->(((ex extended_ereal) (fun (Z2:extended_ereal)=> (forall (X4:extended_ereal), (((ord_le2001149050_ereal X4) Z2)->(((eq Prop) (Q X4)) (Q2 X4))))))->((ex extended_ereal) (fun (Z:extended_ereal)=> (forall (X3:extended_ereal), (((ord_le2001149050_ereal X3) Z)->(((eq Prop) ((and (P X3)) (Q X3))) ((and (P2 X3)) (Q2 X3))))))))))
% 0.47/0.67 FOF formula (forall (A:extended_ereal), ((not (((eq extended_ereal) A) (uminus1208298309_ereal extend1289208545_ereal)))->((ord_le2001149050_ereal (uminus1208298309_ereal extend1289208545_ereal)) A))) of role axiom named fact_20_ereal__MInfty__lessI
% 0.47/0.67 A new axiom: (forall (A:extended_ereal), ((not (((eq extended_ereal) A) (uminus1208298309_ereal extend1289208545_ereal)))->((ord_le2001149050_ereal (uminus1208298309_ereal extend1289208545_ereal)) A)))
% 0.47/0.67 FOF formula (forall (X2:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal (uminus1208298309_ereal extend1289208545_ereal)) X2)) (not (((eq extended_ereal) X2) (uminus1208298309_ereal extend1289208545_ereal))))) of role axiom named fact_21_ereal__infty__less_I2_J
% 0.47/0.67 A new axiom: (forall (X2:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal (uminus1208298309_ereal extend1289208545_ereal)) X2)) (not (((eq extended_ereal) X2) (uminus1208298309_ereal extend1289208545_ereal)))))
% 0.47/0.67 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal (uminus1208298309_ereal A)) (uminus1208298309_ereal B))) ((ord_le2001149050_ereal B) A))) of role axiom named fact_22_ereal__minus__less__minus
% 0.47/0.67 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal (uminus1208298309_ereal A)) (uminus1208298309_ereal B))) ((ord_le2001149050_ereal B) A)))
% 0.47/0.67 FOF formula (forall (A:extended_ereal), ((not (((eq extended_ereal) A) extend1289208545_ereal))->((ord_le2001149050_ereal A) extend1289208545_ereal))) of role axiom named fact_23_ereal__less__PInfty
% 0.47/0.67 A new axiom: (forall (A:extended_ereal), ((not (((eq extended_ereal) A) extend1289208545_ereal))->((ord_le2001149050_ereal A) extend1289208545_ereal)))
% 0.47/0.67 FOF formula (forall (X2:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal X2) extend1289208545_ereal)) (not (((eq extended_ereal) X2) extend1289208545_ereal)))) of role axiom named fact_24_ereal__infty__less_I1_J
% 0.47/0.67 A new axiom: (forall (X2:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal X2) extend1289208545_ereal)) (not (((eq extended_ereal) X2) extend1289208545_ereal))))
% 0.47/0.67 FOF formula (forall (A:extended_ereal), (((ord_le2001149050_ereal A) (uminus1208298309_ereal extend1289208545_ereal))->False)) of role axiom named fact_25_less__ereal_Osimps_I3_J
% 0.47/0.67 A new axiom: (forall (A:extended_ereal), (((ord_le2001149050_ereal A) (uminus1208298309_ereal extend1289208545_ereal))->False))
% 0.47/0.67 FOF formula ((ord_le2001149050_ereal (uminus1208298309_ereal extend1289208545_ereal)) extend1289208545_ereal) of role axiom named fact_26_less__ereal_Osimps_I6_J
% 0.47/0.67 A new axiom: ((ord_le2001149050_ereal (uminus1208298309_ereal extend1289208545_ereal)) extend1289208545_ereal)
% 0.47/0.67 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) (uminus1208298309_ereal A)) (uminus1208298309_ereal B))) (((eq extended_ereal) A) B))) of role axiom named fact_27_ereal__uminus__eq__iff
% 0.47/0.68 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) (uminus1208298309_ereal A)) (uminus1208298309_ereal B))) (((eq extended_ereal) A) B)))
% 0.47/0.68 FOF formula (forall (A:extended_ereal), (((eq extended_ereal) (uminus1208298309_ereal (uminus1208298309_ereal A))) A)) of role axiom named fact_28_ereal__uminus__uminus
% 0.47/0.68 A new axiom: (forall (A:extended_ereal), (((eq extended_ereal) (uminus1208298309_ereal (uminus1208298309_ereal A))) A))
% 0.47/0.68 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) (uminus1208298309_ereal A)) B)) (((eq extended_ereal) A) (uminus1208298309_ereal B)))) of role axiom named fact_29_ereal__uminus__eq__reorder
% 0.47/0.68 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) (uminus1208298309_ereal A)) B)) (((eq extended_ereal) A) (uminus1208298309_ereal B))))
% 0.47/0.68 FOF formula (not (((eq extended_ereal) extend1289208545_ereal) (uminus1208298309_ereal extend1289208545_ereal))) of role axiom named fact_30_MInfty__neq__PInfty_I1_J
% 0.47/0.68 A new axiom: (not (((eq extended_ereal) extend1289208545_ereal) (uminus1208298309_ereal extend1289208545_ereal)))
% 0.47/0.68 FOF formula (forall (A:extended_ereal), (((ord_le2001149050_ereal extend1289208545_ereal) A)->False)) of role axiom named fact_31_less__ereal_Osimps_I2_J
% 0.47/0.68 A new axiom: (forall (A:extended_ereal), (((ord_le2001149050_ereal extend1289208545_ereal) A)->False))
% 0.47/0.68 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal A) (uminus1208298309_ereal B))) ((ord_le2001149050_ereal B) (uminus1208298309_ereal A)))) of role axiom named fact_32_ereal__less__uminus__reorder
% 0.47/0.68 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal A) (uminus1208298309_ereal B))) ((ord_le2001149050_ereal B) (uminus1208298309_ereal A))))
% 0.47/0.68 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal (uminus1208298309_ereal A)) B)) ((ord_le2001149050_ereal (uminus1208298309_ereal B)) A))) of role axiom named fact_33_ereal__uminus__less__reorder
% 0.47/0.68 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal (uminus1208298309_ereal A)) B)) ((ord_le2001149050_ereal (uminus1208298309_ereal B)) A)))
% 0.47/0.68 FOF formula (forall (A:a) (P:(a->Prop)), (((eq Prop) ((member_a A) (collect_a P))) (P A))) of role axiom named fact_34_mem__Collect__eq
% 0.47/0.68 A new axiom: (forall (A:a) (P:(a->Prop)), (((eq Prop) ((member_a A) (collect_a P))) (P A)))
% 0.47/0.68 FOF formula (forall (A2:set_a), (((eq set_a) (collect_a (fun (X:a)=> ((member_a X) A2)))) A2)) of role axiom named fact_35_Collect__mem__eq
% 0.47/0.68 A new axiom: (forall (A2:set_a), (((eq set_a) (collect_a (fun (X:a)=> ((member_a X) A2)))) A2))
% 0.47/0.68 FOF formula (forall (P:(a->Prop)) (Q:(a->Prop)), ((forall (X4:a), (((eq Prop) (P X4)) (Q X4)))->(((eq set_a) (collect_a P)) (collect_a Q)))) of role axiom named fact_36_Collect__cong
% 0.47/0.68 A new axiom: (forall (P:(a->Prop)) (Q:(a->Prop)), ((forall (X4:a), (((eq Prop) (P X4)) (Q X4)))->(((eq set_a) (collect_a P)) (collect_a Q))))
% 0.47/0.68 FOF formula (((eq extended_ereal) extended_MInfty) (uminus1208298309_ereal extend1289208545_ereal)) of role axiom named fact_37_MInfty__eq__minfinity
% 0.47/0.68 A new axiom: (((eq extended_ereal) extended_MInfty) (uminus1208298309_ereal extend1289208545_ereal))
% 0.47/0.68 FOF formula (forall (A:extended_ereal), (((ord_le2001149050_ereal A) A)->False)) of role axiom named fact_38_verit__comp__simplify1_I1_J
% 0.47/0.68 A new axiom: (forall (A:extended_ereal), (((ord_le2001149050_ereal A) A)->False))
% 0.47/0.68 FOF formula (((eq extended_ereal) (uminus1208298309_ereal extended_PInfty)) extended_MInfty) of role axiom named fact_39_uminus__ereal_Osimps_I2_J
% 0.47/0.68 A new axiom: (((eq extended_ereal) (uminus1208298309_ereal extended_PInfty)) extended_MInfty)
% 0.47/0.68 FOF formula (((eq extended_ereal) (uminus1208298309_ereal extended_MInfty)) extended_PInfty) of role axiom named fact_40_uminus__ereal_Osimps_I3_J
% 0.47/0.68 A new axiom: (((eq extended_ereal) (uminus1208298309_ereal extended_MInfty)) extended_PInfty)
% 0.47/0.69 FOF formula ((ord_le2001149050_ereal (uminus1208298309_ereal extend1289208545_ereal)) zero_z163181189_ereal) of role axiom named fact_41_ereal__less_I6_J
% 0.47/0.69 A new axiom: ((ord_le2001149050_ereal (uminus1208298309_ereal extend1289208545_ereal)) zero_z163181189_ereal)
% 0.47/0.69 FOF formula (forall (A:extended_ereal), ((ex extended_ereal) (fun (B2:extended_ereal)=> ((or ((ord_le2001149050_ereal A) B2)) ((ord_le2001149050_ereal B2) A))))) of role axiom named fact_42_ex__gt__or__lt
% 0.47/0.69 A new axiom: (forall (A:extended_ereal), ((ex extended_ereal) (fun (B2:extended_ereal)=> ((or ((ord_le2001149050_ereal A) B2)) ((ord_le2001149050_ereal B2) A)))))
% 0.47/0.69 FOF formula (forall (B:extended_ereal) (A:extended_ereal), (((ord_le2001149050_ereal B) A)->(not (((eq extended_ereal) A) B)))) of role axiom named fact_43_dual__order_Ostrict__implies__not__eq
% 0.47/0.69 A new axiom: (forall (B:extended_ereal) (A:extended_ereal), (((ord_le2001149050_ereal B) A)->(not (((eq extended_ereal) A) B))))
% 0.47/0.69 FOF formula (forall (A:extended_ereal), (((eq Prop) (((eq extended_ereal) (uminus1208298309_ereal A)) zero_z163181189_ereal)) (((eq extended_ereal) A) zero_z163181189_ereal))) of role axiom named fact_44_ereal__uminus__zero__iff
% 0.47/0.69 A new axiom: (forall (A:extended_ereal), (((eq Prop) (((eq extended_ereal) (uminus1208298309_ereal A)) zero_z163181189_ereal)) (((eq extended_ereal) A) zero_z163181189_ereal)))
% 0.47/0.69 FOF formula (((eq extended_ereal) (uminus1208298309_ereal zero_z163181189_ereal)) zero_z163181189_ereal) of role axiom named fact_45_ereal__uminus__zero
% 0.47/0.69 A new axiom: (((eq extended_ereal) (uminus1208298309_ereal zero_z163181189_ereal)) zero_z163181189_ereal)
% 0.47/0.69 FOF formula (forall (A:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal zero_z163181189_ereal) (uminus1208298309_ereal A))) ((ord_le2001149050_ereal A) zero_z163181189_ereal))) of role axiom named fact_46_neg__0__less__iff__less__erea
% 0.47/0.69 A new axiom: (forall (A:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal zero_z163181189_ereal) (uminus1208298309_ereal A))) ((ord_le2001149050_ereal A) zero_z163181189_ereal)))
% 0.47/0.69 FOF formula (forall (X2:extended_ereal), (((eq Prop) (((eq extended_ereal) zero_z163181189_ereal) X2)) (((eq extended_ereal) X2) zero_z163181189_ereal))) of role axiom named fact_47_zero__reorient
% 0.47/0.69 A new axiom: (forall (X2:extended_ereal), (((eq Prop) (((eq extended_ereal) zero_z163181189_ereal) X2)) (((eq extended_ereal) X2) zero_z163181189_ereal)))
% 0.47/0.69 FOF formula (not (((eq extended_ereal) extend1289208545_ereal) zero_z163181189_ereal)) of role axiom named fact_48_Infty__neq__0_I1_J
% 0.47/0.69 A new axiom: (not (((eq extended_ereal) extend1289208545_ereal) zero_z163181189_ereal))
% 0.47/0.69 FOF formula (((eq extended_ereal) extend1289208545_ereal) extended_PInfty) of role axiom named fact_49_infinity__ereal__def
% 0.47/0.69 A new axiom: (((eq extended_ereal) extend1289208545_ereal) extended_PInfty)
% 0.47/0.69 FOF formula (not (((eq extended_ereal) extended_PInfty) extended_MInfty)) of role axiom named fact_50_ereal_Odistinct_I5_J
% 0.47/0.69 A new axiom: (not (((eq extended_ereal) extended_PInfty) extended_MInfty))
% 0.47/0.69 FOF formula (not (((eq extended_ereal) (uminus1208298309_ereal extend1289208545_ereal)) zero_z163181189_ereal)) of role axiom named fact_51_Infty__neq__0_I3_J
% 0.47/0.69 A new axiom: (not (((eq extended_ereal) (uminus1208298309_ereal extend1289208545_ereal)) zero_z163181189_ereal))
% 0.47/0.69 FOF formula ((ord_le2001149050_ereal zero_z163181189_ereal) extend1289208545_ereal) of role axiom named fact_52_ereal__less_I5_J
% 0.47/0.69 A new axiom: ((ord_le2001149050_ereal zero_z163181189_ereal) extend1289208545_ereal)
% 0.47/0.69 FOF formula (forall (A:extended_ereal) (F:(extended_ereal->extended_ereal)) (B:extended_ereal) (C2:extended_ereal), ((((eq extended_ereal) A) (F B))->(((ord_le2001149050_ereal B) C2)->((forall (X4:extended_ereal) (Y2:extended_ereal), (((ord_le2001149050_ereal X4) Y2)->((ord_le2001149050_ereal (F X4)) (F Y2))))->((ord_le2001149050_ereal A) (F C2)))))) of role axiom named fact_53_ord__eq__less__subst
% 0.47/0.69 A new axiom: (forall (A:extended_ereal) (F:(extended_ereal->extended_ereal)) (B:extended_ereal) (C2:extended_ereal), ((((eq extended_ereal) A) (F B))->(((ord_le2001149050_ereal B) C2)->((forall (X4:extended_ereal) (Y2:extended_ereal), (((ord_le2001149050_ereal X4) Y2)->((ord_le2001149050_ereal (F X4)) (F Y2))))->((ord_le2001149050_ereal A) (F C2))))))
% 0.47/0.70 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (F:(extended_ereal->extended_ereal)) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->((((eq extended_ereal) (F B)) C2)->((forall (X4:extended_ereal) (Y2:extended_ereal), (((ord_le2001149050_ereal X4) Y2)->((ord_le2001149050_ereal (F X4)) (F Y2))))->((ord_le2001149050_ereal (F A)) C2))))) of role axiom named fact_54_ord__less__eq__subst
% 0.47/0.70 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (F:(extended_ereal->extended_ereal)) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->((((eq extended_ereal) (F B)) C2)->((forall (X4:extended_ereal) (Y2:extended_ereal), (((ord_le2001149050_ereal X4) Y2)->((ord_le2001149050_ereal (F X4)) (F Y2))))->((ord_le2001149050_ereal (F A)) C2)))))
% 0.47/0.70 FOF formula (forall (A:extended_ereal) (F:(extended_ereal->extended_ereal)) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) (F B))->(((ord_le2001149050_ereal B) C2)->((forall (X4:extended_ereal) (Y2:extended_ereal), (((ord_le2001149050_ereal X4) Y2)->((ord_le2001149050_ereal (F X4)) (F Y2))))->((ord_le2001149050_ereal A) (F C2)))))) of role axiom named fact_55_order__less__subst1
% 0.47/0.70 A new axiom: (forall (A:extended_ereal) (F:(extended_ereal->extended_ereal)) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) (F B))->(((ord_le2001149050_ereal B) C2)->((forall (X4:extended_ereal) (Y2:extended_ereal), (((ord_le2001149050_ereal X4) Y2)->((ord_le2001149050_ereal (F X4)) (F Y2))))->((ord_le2001149050_ereal A) (F C2))))))
% 0.47/0.70 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (F:(extended_ereal->extended_ereal)) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal (F B)) C2)->((forall (X4:extended_ereal) (Y2:extended_ereal), (((ord_le2001149050_ereal X4) Y2)->((ord_le2001149050_ereal (F X4)) (F Y2))))->((ord_le2001149050_ereal (F A)) C2))))) of role axiom named fact_56_order__less__subst2
% 0.47/0.70 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (F:(extended_ereal->extended_ereal)) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal (F B)) C2)->((forall (X4:extended_ereal) (Y2:extended_ereal), (((ord_le2001149050_ereal X4) Y2)->((ord_le2001149050_ereal (F X4)) (F Y2))))->((ord_le2001149050_ereal (F A)) C2)))))
% 0.47/0.70 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), ((not (((eq extended_ereal) X2) Y))->((((ord_le2001149050_ereal X2) Y)->False)->((ord_le2001149050_ereal Y) X2)))) of role axiom named fact_57_neqE
% 0.47/0.70 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), ((not (((eq extended_ereal) X2) Y))->((((ord_le2001149050_ereal X2) Y)->False)->((ord_le2001149050_ereal Y) X2))))
% 0.47/0.70 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((eq Prop) (not (((eq extended_ereal) X2) Y))) ((or ((ord_le2001149050_ereal X2) Y)) ((ord_le2001149050_ereal Y) X2)))) of role axiom named fact_58_neq__iff
% 0.47/0.70 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((eq Prop) (not (((eq extended_ereal) X2) Y))) ((or ((ord_le2001149050_ereal X2) Y)) ((ord_le2001149050_ereal Y) X2))))
% 0.47/0.70 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal B) A)->False))) of role axiom named fact_59_order_Oasym
% 0.47/0.70 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal B) A)->False)))
% 0.47/0.70 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->((ex extended_ereal) (fun (Z:extended_ereal)=> ((and ((ord_le2001149050_ereal X2) Z)) ((ord_le2001149050_ereal Z) Y)))))) of role axiom named fact_60_dense
% 0.47/0.70 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->((ex extended_ereal) (fun (Z:extended_ereal)=> ((and ((ord_le2001149050_ereal X2) Z)) ((ord_le2001149050_ereal Z) Y))))))
% 0.47/0.70 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(not (((eq extended_ereal) X2) Y)))) of role axiom named fact_61_less__imp__neq
% 0.47/0.72 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(not (((eq extended_ereal) X2) Y))))
% 0.47/0.72 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) X2)->False))) of role axiom named fact_62_less__asym
% 0.47/0.72 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) X2)->False)))
% 0.47/0.72 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal B) A)->False))) of role axiom named fact_63_less__asym_H
% 0.47/0.72 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal B) A)->False)))
% 0.47/0.72 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal) (Z3:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) Z3)->((ord_le2001149050_ereal X2) Z3)))) of role axiom named fact_64_less__trans
% 0.47/0.72 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal) (Z3:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) Z3)->((ord_le2001149050_ereal X2) Z3))))
% 0.47/0.72 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), ((or ((or ((ord_le2001149050_ereal X2) Y)) (((eq extended_ereal) X2) Y))) ((ord_le2001149050_ereal Y) X2))) of role axiom named fact_65_less__linear
% 0.47/0.72 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), ((or ((or ((ord_le2001149050_ereal X2) Y)) (((eq extended_ereal) X2) Y))) ((ord_le2001149050_ereal Y) X2)))
% 0.47/0.72 FOF formula (forall (X2:extended_ereal), (((ord_le2001149050_ereal X2) X2)->False)) of role axiom named fact_66_less__irrefl
% 0.47/0.72 A new axiom: (forall (X2:extended_ereal), (((ord_le2001149050_ereal X2) X2)->False))
% 0.47/0.72 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), ((((eq extended_ereal) A) B)->(((ord_le2001149050_ereal B) C2)->((ord_le2001149050_ereal A) C2)))) of role axiom named fact_67_ord__eq__less__trans
% 0.47/0.72 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), ((((eq extended_ereal) A) B)->(((ord_le2001149050_ereal B) C2)->((ord_le2001149050_ereal A) C2))))
% 0.47/0.72 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->((((eq extended_ereal) B) C2)->((ord_le2001149050_ereal A) C2)))) of role axiom named fact_68_ord__less__eq__trans
% 0.47/0.72 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->((((eq extended_ereal) B) C2)->((ord_le2001149050_ereal A) C2))))
% 0.47/0.72 FOF formula (forall (B:extended_ereal) (A:extended_ereal), (((ord_le2001149050_ereal B) A)->(((ord_le2001149050_ereal A) B)->False))) of role axiom named fact_69_dual__order_Oasym
% 0.47/0.72 A new axiom: (forall (B:extended_ereal) (A:extended_ereal), (((ord_le2001149050_ereal B) A)->(((ord_le2001149050_ereal A) B)->False)))
% 0.47/0.72 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(not (((eq extended_ereal) X2) Y)))) of role axiom named fact_70_less__imp__not__eq
% 0.47/0.72 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(not (((eq extended_ereal) X2) Y))))
% 0.47/0.72 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) X2)->False))) of role axiom named fact_71_less__not__sym
% 0.47/0.72 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) X2)->False)))
% 0.47/0.72 FOF formula (forall (Y:extended_ereal) (X2:extended_ereal), ((((ord_le2001149050_ereal Y) X2)->False)->(((eq Prop) (((ord_le2001149050_ereal X2) Y)->False)) (((eq extended_ereal) X2) Y)))) of role axiom named fact_72_antisym__conv3
% 0.47/0.72 A new axiom: (forall (Y:extended_ereal) (X2:extended_ereal), ((((ord_le2001149050_ereal Y) X2)->False)->(((eq Prop) (((ord_le2001149050_ereal X2) Y)->False)) (((eq extended_ereal) X2) Y))))
% 0.47/0.72 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(not (((eq extended_ereal) Y) X2)))) of role axiom named fact_73_less__imp__not__eq2
% 0.56/0.73 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(not (((eq extended_ereal) Y) X2))))
% 0.56/0.73 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal) (P:Prop), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) X2)->P))) of role axiom named fact_74_less__imp__triv
% 0.56/0.73 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal) (P:Prop), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) X2)->P)))
% 0.56/0.73 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), ((((ord_le2001149050_ereal X2) Y)->False)->((not (((eq extended_ereal) X2) Y))->((ord_le2001149050_ereal Y) X2)))) of role axiom named fact_75_linorder__cases
% 0.56/0.73 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), ((((ord_le2001149050_ereal X2) Y)->False)->((not (((eq extended_ereal) X2) Y))->((ord_le2001149050_ereal Y) X2))))
% 0.56/0.73 FOF formula (forall (A:extended_ereal), (((ord_le2001149050_ereal A) A)->False)) of role axiom named fact_76_dual__order_Oirrefl
% 0.56/0.73 A new axiom: (forall (A:extended_ereal), (((ord_le2001149050_ereal A) A)->False))
% 0.56/0.73 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal B) C2)->((ord_le2001149050_ereal A) C2)))) of role axiom named fact_77_order_Ostrict__trans
% 0.56/0.73 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal B) C2)->((ord_le2001149050_ereal A) C2))))
% 0.56/0.73 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) X2)->False))) of role axiom named fact_78_less__imp__not__less
% 0.56/0.73 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((ord_le2001149050_ereal X2) Y)->(((ord_le2001149050_ereal Y) X2)->False)))
% 0.56/0.73 FOF formula (forall (P:(extended_ereal->(extended_ereal->Prop))) (A:extended_ereal) (B:extended_ereal), ((forall (A3:extended_ereal) (B2:extended_ereal), (((ord_le2001149050_ereal A3) B2)->((P A3) B2)))->((forall (A3:extended_ereal), ((P A3) A3))->((forall (A3:extended_ereal) (B2:extended_ereal), (((P B2) A3)->((P A3) B2)))->((P A) B))))) of role axiom named fact_79_linorder__less__wlog
% 0.56/0.73 A new axiom: (forall (P:(extended_ereal->(extended_ereal->Prop))) (A:extended_ereal) (B:extended_ereal), ((forall (A3:extended_ereal) (B2:extended_ereal), (((ord_le2001149050_ereal A3) B2)->((P A3) B2)))->((forall (A3:extended_ereal), ((P A3) A3))->((forall (A3:extended_ereal) (B2:extended_ereal), (((P B2) A3)->((P A3) B2)))->((P A) B)))))
% 0.56/0.73 FOF formula (forall (B:extended_ereal) (A:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal B) A)->(((ord_le2001149050_ereal C2) B)->((ord_le2001149050_ereal C2) A)))) of role axiom named fact_80_dual__order_Ostrict__trans
% 0.56/0.73 A new axiom: (forall (B:extended_ereal) (A:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal B) A)->(((ord_le2001149050_ereal C2) B)->((ord_le2001149050_ereal C2) A))))
% 0.56/0.73 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((eq Prop) (((ord_le2001149050_ereal X2) Y)->False)) ((or ((ord_le2001149050_ereal Y) X2)) (((eq extended_ereal) X2) Y)))) of role axiom named fact_81_not__less__iff__gr__or__eq
% 0.56/0.73 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((eq Prop) (((ord_le2001149050_ereal X2) Y)->False)) ((or ((ord_le2001149050_ereal Y) X2)) (((eq extended_ereal) X2) Y))))
% 0.56/0.73 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal A) B)->(not (((eq extended_ereal) A) B)))) of role axiom named fact_82_order_Ostrict__implies__not__eq
% 0.56/0.73 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal A) B)->(not (((eq extended_ereal) A) B))))
% 0.56/0.73 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) ((times_1966848393_ereal A) B)) extend1289208545_ereal)) ((or ((or ((or ((and (((eq extended_ereal) A) extend1289208545_ereal)) ((ord_le2001149050_ereal zero_z163181189_ereal) B))) ((and ((ord_le2001149050_ereal zero_z163181189_ereal) A)) (((eq extended_ereal) B) extend1289208545_ereal)))) ((and (((eq extended_ereal) A) (uminus1208298309_ereal extend1289208545_ereal))) ((ord_le2001149050_ereal B) zero_z163181189_ereal)))) ((and ((ord_le2001149050_ereal A) zero_z163181189_ereal)) (((eq extended_ereal) B) (uminus1208298309_ereal extend1289208545_ereal)))))) of role axiom named fact_83_ereal__mult__eq__PInfty
% 0.56/0.74 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) ((times_1966848393_ereal A) B)) extend1289208545_ereal)) ((or ((or ((or ((and (((eq extended_ereal) A) extend1289208545_ereal)) ((ord_le2001149050_ereal zero_z163181189_ereal) B))) ((and ((ord_le2001149050_ereal zero_z163181189_ereal) A)) (((eq extended_ereal) B) extend1289208545_ereal)))) ((and (((eq extended_ereal) A) (uminus1208298309_ereal extend1289208545_ereal))) ((ord_le2001149050_ereal B) zero_z163181189_ereal)))) ((and ((ord_le2001149050_ereal A) zero_z163181189_ereal)) (((eq extended_ereal) B) (uminus1208298309_ereal extend1289208545_ereal))))))
% 0.56/0.74 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) ((times_1966848393_ereal A) B)) (uminus1208298309_ereal extend1289208545_ereal))) ((or ((or ((or ((and (((eq extended_ereal) A) extend1289208545_ereal)) ((ord_le2001149050_ereal B) zero_z163181189_ereal))) ((and ((ord_le2001149050_ereal A) zero_z163181189_ereal)) (((eq extended_ereal) B) extend1289208545_ereal)))) ((and (((eq extended_ereal) A) (uminus1208298309_ereal extend1289208545_ereal))) ((ord_le2001149050_ereal zero_z163181189_ereal) B)))) ((and ((ord_le2001149050_ereal zero_z163181189_ereal) A)) (((eq extended_ereal) B) (uminus1208298309_ereal extend1289208545_ereal)))))) of role axiom named fact_84_ereal__mult__eq__MInfty
% 0.56/0.74 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) ((times_1966848393_ereal A) B)) (uminus1208298309_ereal extend1289208545_ereal))) ((or ((or ((or ((and (((eq extended_ereal) A) extend1289208545_ereal)) ((ord_le2001149050_ereal B) zero_z163181189_ereal))) ((and ((ord_le2001149050_ereal A) zero_z163181189_ereal)) (((eq extended_ereal) B) extend1289208545_ereal)))) ((and (((eq extended_ereal) A) (uminus1208298309_ereal extend1289208545_ereal))) ((ord_le2001149050_ereal zero_z163181189_ereal) B)))) ((and ((ord_le2001149050_ereal zero_z163181189_ereal) A)) (((eq extended_ereal) B) (uminus1208298309_ereal extend1289208545_ereal))))))
% 0.56/0.74 FOF formula (forall (A:extended_ereal), ((and ((((eq extended_ereal) A) zero_z163181189_ereal)->(((eq extended_ereal) ((times_1966848393_ereal A) extend1289208545_ereal)) zero_z163181189_ereal))) ((not (((eq extended_ereal) A) zero_z163181189_ereal))->((and (((ord_le2001149050_ereal zero_z163181189_ereal) A)->(((eq extended_ereal) ((times_1966848393_ereal A) extend1289208545_ereal)) extend1289208545_ereal))) ((((ord_le2001149050_ereal zero_z163181189_ereal) A)->False)->(((eq extended_ereal) ((times_1966848393_ereal A) extend1289208545_ereal)) (uminus1208298309_ereal extend1289208545_ereal))))))) of role axiom named fact_85_ereal__mult__infty
% 0.56/0.74 A new axiom: (forall (A:extended_ereal), ((and ((((eq extended_ereal) A) zero_z163181189_ereal)->(((eq extended_ereal) ((times_1966848393_ereal A) extend1289208545_ereal)) zero_z163181189_ereal))) ((not (((eq extended_ereal) A) zero_z163181189_ereal))->((and (((ord_le2001149050_ereal zero_z163181189_ereal) A)->(((eq extended_ereal) ((times_1966848393_ereal A) extend1289208545_ereal)) extend1289208545_ereal))) ((((ord_le2001149050_ereal zero_z163181189_ereal) A)->False)->(((eq extended_ereal) ((times_1966848393_ereal A) extend1289208545_ereal)) (uminus1208298309_ereal extend1289208545_ereal)))))))
% 0.56/0.74 FOF formula (forall (A:extended_ereal), ((and ((((eq extended_ereal) A) zero_z163181189_ereal)->(((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) A)) zero_z163181189_ereal))) ((not (((eq extended_ereal) A) zero_z163181189_ereal))->((and (((ord_le2001149050_ereal zero_z163181189_ereal) A)->(((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) A)) extend1289208545_ereal))) ((((ord_le2001149050_ereal zero_z163181189_ereal) A)->False)->(((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) A)) (uminus1208298309_ereal extend1289208545_ereal))))))) of role axiom named fact_86_ereal__infty__mult
% 0.56/0.74 A new axiom: (forall (A:extended_ereal), ((and ((((eq extended_ereal) A) zero_z163181189_ereal)->(((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) A)) zero_z163181189_ereal))) ((not (((eq extended_ereal) A) zero_z163181189_ereal))->((and (((ord_le2001149050_ereal zero_z163181189_ereal) A)->(((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) A)) extend1289208545_ereal))) ((((ord_le2001149050_ereal zero_z163181189_ereal) A)->False)->(((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) A)) (uminus1208298309_ereal extend1289208545_ereal)))))))
% 0.56/0.74 FOF formula (forall (X2:extended_ereal), (((eq extended_ereal) ((divide595620860_ereal X2) (uminus1208298309_ereal extend1289208545_ereal))) zero_z163181189_ereal)) of role axiom named fact_87_ereal__divide__Infty_I2_J
% 0.56/0.74 A new axiom: (forall (X2:extended_ereal), (((eq extended_ereal) ((divide595620860_ereal X2) (uminus1208298309_ereal extend1289208545_ereal))) zero_z163181189_ereal))
% 0.56/0.74 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal (uminus1208298309_ereal A)) B)) (uminus1208298309_ereal ((times_1966848393_ereal A) B)))) of role axiom named fact_88_ereal__mult__minus__left
% 0.56/0.74 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal (uminus1208298309_ereal A)) B)) (uminus1208298309_ereal ((times_1966848393_ereal A) B))))
% 0.56/0.74 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal A) (uminus1208298309_ereal B))) (uminus1208298309_ereal ((times_1966848393_ereal A) B)))) of role axiom named fact_89_ereal__mult__minus__right
% 0.56/0.74 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal A) (uminus1208298309_ereal B))) (uminus1208298309_ereal ((times_1966848393_ereal A) B))))
% 0.56/0.74 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) ((times_1966848393_ereal A) B)) zero_z163181189_ereal)) ((or (((eq extended_ereal) A) zero_z163181189_ereal)) (((eq extended_ereal) B) zero_z163181189_ereal)))) of role axiom named fact_90_ereal__zero__times
% 0.56/0.74 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) (((eq extended_ereal) ((times_1966848393_ereal A) B)) zero_z163181189_ereal)) ((or (((eq extended_ereal) A) zero_z163181189_ereal)) (((eq extended_ereal) B) zero_z163181189_ereal))))
% 0.56/0.74 FOF formula (forall (A:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal zero_z163181189_ereal) A)) zero_z163181189_ereal)) of role axiom named fact_91_ereal__zero__mult
% 0.56/0.74 A new axiom: (forall (A:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal zero_z163181189_ereal) A)) zero_z163181189_ereal))
% 0.56/0.74 FOF formula (forall (A:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal A) zero_z163181189_ereal)) zero_z163181189_ereal)) of role axiom named fact_92_ereal__mult__zero
% 0.56/0.74 A new axiom: (forall (A:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal A) zero_z163181189_ereal)) zero_z163181189_ereal))
% 0.56/0.74 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal), (((eq extended_ereal) ((divide595620860_ereal (uminus1208298309_ereal X2)) Y)) (uminus1208298309_ereal ((divide595620860_ereal X2) Y)))) of role axiom named fact_93_ereal__uminus__divide
% 0.56/0.74 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal), (((eq extended_ereal) ((divide595620860_ereal (uminus1208298309_ereal X2)) Y)) (uminus1208298309_ereal ((divide595620860_ereal X2) Y))))
% 0.56/0.74 FOF formula (forall (A:extended_ereal), (((eq extended_ereal) ((divide595620860_ereal zero_z163181189_ereal) A)) zero_z163181189_ereal)) of role axiom named fact_94_ereal__divide__zero__left
% 0.56/0.74 A new axiom: (forall (A:extended_ereal), (((eq extended_ereal) ((divide595620860_ereal zero_z163181189_ereal) A)) zero_z163181189_ereal))
% 0.56/0.75 FOF formula (forall (B:extended_ereal) (C2:extended_ereal) (A:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal ((divide595620860_ereal B) C2)) A)) ((divide595620860_ereal ((times_1966848393_ereal B) A)) C2))) of role axiom named fact_95_ereal__times__divide__eq__left
% 0.56/0.75 A new axiom: (forall (B:extended_ereal) (C2:extended_ereal) (A:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal ((divide595620860_ereal B) C2)) A)) ((divide595620860_ereal ((times_1966848393_ereal B) A)) C2)))
% 0.56/0.75 FOF formula (forall (X2:extended_ereal), (((eq extended_ereal) ((divide595620860_ereal X2) extend1289208545_ereal)) zero_z163181189_ereal)) of role axiom named fact_96_ereal__divide__Infty_I1_J
% 0.56/0.75 A new axiom: (forall (X2:extended_ereal), (((eq extended_ereal) ((divide595620860_ereal X2) extend1289208545_ereal)) zero_z163181189_ereal))
% 0.56/0.75 FOF formula (forall (B:extended_ereal) (A:extended_ereal) (C2:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal B) ((times_1966848393_ereal A) C2))) ((times_1966848393_ereal A) ((times_1966848393_ereal B) C2)))) of role axiom named fact_97_mult_Oleft__commute
% 0.56/0.75 A new axiom: (forall (B:extended_ereal) (A:extended_ereal) (C2:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal B) ((times_1966848393_ereal A) C2))) ((times_1966848393_ereal A) ((times_1966848393_ereal B) C2))))
% 0.56/0.75 FOF formula (((eq (extended_ereal->(extended_ereal->extended_ereal))) times_1966848393_ereal) (fun (A4:extended_ereal) (B3:extended_ereal)=> ((times_1966848393_ereal B3) A4))) of role axiom named fact_98_mult_Ocommute
% 0.56/0.75 A new axiom: (((eq (extended_ereal->(extended_ereal->extended_ereal))) times_1966848393_ereal) (fun (A4:extended_ereal) (B3:extended_ereal)=> ((times_1966848393_ereal B3) A4)))
% 0.56/0.75 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal ((times_1966848393_ereal A) B)) C2)) ((times_1966848393_ereal A) ((times_1966848393_ereal B) C2)))) of role axiom named fact_99_mult_Oassoc
% 0.56/0.75 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal ((times_1966848393_ereal A) B)) C2)) ((times_1966848393_ereal A) ((times_1966848393_ereal B) C2))))
% 0.56/0.75 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal A) ((divide595620860_ereal B) C2))) ((divide595620860_ereal ((times_1966848393_ereal A) B)) C2))) of role axiom named fact_100_ereal__times__divide__eq
% 0.56/0.75 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal A) ((divide595620860_ereal B) C2))) ((divide595620860_ereal ((times_1966848393_ereal A) B)) C2)))
% 0.56/0.75 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal ((times_1966848393_ereal A) B)) C2)) ((times_1966848393_ereal A) ((times_1966848393_ereal B) C2)))) of role axiom named fact_101_ab__semigroup__mult__class_Omult__ac_I1_J
% 0.56/0.75 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((eq extended_ereal) ((times_1966848393_ereal ((times_1966848393_ereal A) B)) C2)) ((times_1966848393_ereal A) ((times_1966848393_ereal B) C2))))
% 0.56/0.75 FOF formula (((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) extend1289208545_ereal)) extend1289208545_ereal) of role axiom named fact_102_times__ereal_Osimps_I6_J
% 0.56/0.75 A new axiom: (((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) extend1289208545_ereal)) extend1289208545_ereal)
% 0.56/0.75 FOF formula (forall (C2:extended_ereal) (D:extended_ereal) (A:extended_ereal) (B:extended_ereal), ((((eq extended_ereal) C2) D)->(((not (((eq extended_ereal) D) zero_z163181189_ereal))->(((eq extended_ereal) A) B))->(((eq extended_ereal) ((times_1966848393_ereal C2) A)) ((times_1966848393_ereal D) B))))) of role axiom named fact_103_ereal__right__mult__cong
% 0.56/0.75 A new axiom: (forall (C2:extended_ereal) (D:extended_ereal) (A:extended_ereal) (B:extended_ereal), ((((eq extended_ereal) C2) D)->(((not (((eq extended_ereal) D) zero_z163181189_ereal))->(((eq extended_ereal) A) B))->(((eq extended_ereal) ((times_1966848393_ereal C2) A)) ((times_1966848393_ereal D) B)))))
% 0.56/0.76 FOF formula (forall (C2:extended_ereal) (D:extended_ereal) (A:extended_ereal) (B:extended_ereal), ((((eq extended_ereal) C2) D)->(((not (((eq extended_ereal) D) zero_z163181189_ereal))->(((eq extended_ereal) A) B))->(((eq extended_ereal) ((times_1966848393_ereal A) C2)) ((times_1966848393_ereal B) D))))) of role axiom named fact_104_ereal__left__mult__cong
% 0.56/0.76 A new axiom: (forall (C2:extended_ereal) (D:extended_ereal) (A:extended_ereal) (B:extended_ereal), ((((eq extended_ereal) C2) D)->(((not (((eq extended_ereal) D) zero_z163181189_ereal))->(((eq extended_ereal) A) B))->(((eq extended_ereal) ((times_1966848393_ereal A) C2)) ((times_1966848393_ereal B) D)))))
% 0.56/0.76 FOF formula (forall (B:extended_ereal) (A:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) B)->(((ord_le2001149050_ereal B) extend1289208545_ereal)->(((eq extended_ereal) ((times_1966848393_ereal B) ((divide595620860_ereal A) B))) A)))) of role axiom named fact_105_ereal__mult__divide
% 0.56/0.76 A new axiom: (forall (B:extended_ereal) (A:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) B)->(((ord_le2001149050_ereal B) extend1289208545_ereal)->(((eq extended_ereal) ((times_1966848393_ereal B) ((divide595620860_ereal A) B))) A))))
% 0.56/0.76 FOF formula (forall (C2:extended_ereal) (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal C2) extend1289208545_ereal)->(((eq Prop) ((ord_le2001149050_ereal ((divide595620860_ereal A) C2)) B)) ((ord_le2001149050_ereal A) ((times_1966848393_ereal B) C2)))))) of role axiom named fact_106_ereal__divide__less__iff
% 0.56/0.76 A new axiom: (forall (C2:extended_ereal) (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal C2) extend1289208545_ereal)->(((eq Prop) ((ord_le2001149050_ereal ((divide595620860_ereal A) C2)) B)) ((ord_le2001149050_ereal A) ((times_1966848393_ereal B) C2))))))
% 0.56/0.76 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal) (Z3:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) X2)->((not (((eq extended_ereal) X2) extend1289208545_ereal))->(((eq Prop) ((ord_le2001149050_ereal ((divide595620860_ereal Y) X2)) Z3)) ((ord_le2001149050_ereal Y) ((times_1966848393_ereal X2) Z3)))))) of role axiom named fact_107_ereal__divide__less__pos
% 0.56/0.76 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal) (Z3:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) X2)->((not (((eq extended_ereal) X2) extend1289208545_ereal))->(((eq Prop) ((ord_le2001149050_ereal ((divide595620860_ereal Y) X2)) Z3)) ((ord_le2001149050_ereal Y) ((times_1966848393_ereal X2) Z3))))))
% 0.56/0.76 FOF formula (forall (C2:extended_ereal) (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal C2) extend1289208545_ereal)->(((eq Prop) ((ord_le2001149050_ereal A) ((divide595620860_ereal B) C2))) ((ord_le2001149050_ereal ((times_1966848393_ereal A) C2)) B))))) of role axiom named fact_108_ereal__less__divide__iff
% 0.56/0.76 A new axiom: (forall (C2:extended_ereal) (A:extended_ereal) (B:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal C2) extend1289208545_ereal)->(((eq Prop) ((ord_le2001149050_ereal A) ((divide595620860_ereal B) C2))) ((ord_le2001149050_ereal ((times_1966848393_ereal A) C2)) B)))))
% 0.56/0.76 FOF formula (forall (X2:extended_ereal) (Y:extended_ereal) (Z3:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) X2)->((not (((eq extended_ereal) X2) extend1289208545_ereal))->(((eq Prop) ((ord_le2001149050_ereal Y) ((divide595620860_ereal Z3) X2))) ((ord_le2001149050_ereal ((times_1966848393_ereal X2) Y)) Z3))))) of role axiom named fact_109_ereal__less__divide__pos
% 0.56/0.76 A new axiom: (forall (X2:extended_ereal) (Y:extended_ereal) (Z3:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) X2)->((not (((eq extended_ereal) X2) extend1289208545_ereal))->(((eq Prop) ((ord_le2001149050_ereal Y) ((divide595620860_ereal Z3) X2))) ((ord_le2001149050_ereal ((times_1966848393_ereal X2) Y)) Z3)))))
% 0.56/0.77 FOF formula (((eq extended_ereal) ((times_1966848393_ereal (uminus1208298309_ereal extend1289208545_ereal)) (uminus1208298309_ereal extend1289208545_ereal))) extend1289208545_ereal) of role axiom named fact_110_times__ereal_Osimps_I9_J
% 0.56/0.77 A new axiom: (((eq extended_ereal) ((times_1966848393_ereal (uminus1208298309_ereal extend1289208545_ereal)) (uminus1208298309_ereal extend1289208545_ereal))) extend1289208545_ereal)
% 0.56/0.77 FOF formula (((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) (uminus1208298309_ereal extend1289208545_ereal))) (uminus1208298309_ereal extend1289208545_ereal)) of role axiom named fact_111_times__ereal_Osimps_I8_J
% 0.56/0.77 A new axiom: (((eq extended_ereal) ((times_1966848393_ereal extend1289208545_ereal) (uminus1208298309_ereal extend1289208545_ereal))) (uminus1208298309_ereal extend1289208545_ereal))
% 0.56/0.77 FOF formula (((eq extended_ereal) ((times_1966848393_ereal (uminus1208298309_ereal extend1289208545_ereal)) extend1289208545_ereal)) (uminus1208298309_ereal extend1289208545_ereal)) of role axiom named fact_112_times__ereal_Osimps_I7_J
% 0.56/0.77 A new axiom: (((eq extended_ereal) ((times_1966848393_ereal (uminus1208298309_ereal extend1289208545_ereal)) extend1289208545_ereal)) (uminus1208298309_ereal extend1289208545_ereal))
% 0.56/0.77 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal ((times_1966848393_ereal A) B)) zero_z163181189_ereal)) ((or ((and ((ord_le2001149050_ereal zero_z163181189_ereal) A)) ((ord_le2001149050_ereal B) zero_z163181189_ereal))) ((and ((ord_le2001149050_ereal A) zero_z163181189_ereal)) ((ord_le2001149050_ereal zero_z163181189_ereal) B))))) of role axiom named fact_113_ereal__mult__less__0__iff
% 0.56/0.77 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal ((times_1966848393_ereal A) B)) zero_z163181189_ereal)) ((or ((and ((ord_le2001149050_ereal zero_z163181189_ereal) A)) ((ord_le2001149050_ereal B) zero_z163181189_ereal))) ((and ((ord_le2001149050_ereal A) zero_z163181189_ereal)) ((ord_le2001149050_ereal zero_z163181189_ereal) B)))))
% 0.56/0.77 FOF formula (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal zero_z163181189_ereal) ((times_1966848393_ereal A) B))) ((or ((and ((ord_le2001149050_ereal zero_z163181189_ereal) A)) ((ord_le2001149050_ereal zero_z163181189_ereal) B))) ((and ((ord_le2001149050_ereal A) zero_z163181189_ereal)) ((ord_le2001149050_ereal B) zero_z163181189_ereal))))) of role axiom named fact_114_ereal__zero__less__0__iff
% 0.56/0.77 A new axiom: (forall (A:extended_ereal) (B:extended_ereal), (((eq Prop) ((ord_le2001149050_ereal zero_z163181189_ereal) ((times_1966848393_ereal A) B))) ((or ((and ((ord_le2001149050_ereal zero_z163181189_ereal) A)) ((ord_le2001149050_ereal zero_z163181189_ereal) B))) ((and ((ord_le2001149050_ereal A) zero_z163181189_ereal)) ((ord_le2001149050_ereal B) zero_z163181189_ereal)))))
% 0.56/0.77 FOF formula (forall (B:extended_ereal) (C2:extended_ereal) (A:extended_ereal) (D:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) B)->(((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal C2) D)->((ord_le2001149050_ereal ((times_1966848393_ereal A) C2)) ((times_1966848393_ereal B) D))))))) of role axiom named fact_115_ereal__mult__mono__strict
% 0.56/0.77 A new axiom: (forall (B:extended_ereal) (C2:extended_ereal) (A:extended_ereal) (D:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) B)->(((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal C2) D)->((ord_le2001149050_ereal ((times_1966848393_ereal A) C2)) ((times_1966848393_ereal B) D)))))))
% 0.56/0.77 FOF formula (forall (A:extended_ereal) (C2:extended_ereal) (B:extended_ereal) (D:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) A)->(((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal C2) D)->((ord_le2001149050_ereal ((times_1966848393_ereal A) C2)) ((times_1966848393_ereal B) D))))))) of role axiom named fact_116_ereal__mult__mono__strict_H
% 0.56/0.78 A new axiom: (forall (A:extended_ereal) (C2:extended_ereal) (B:extended_ereal) (D:extended_ereal), (((ord_le2001149050_ereal zero_z163181189_ereal) A)->(((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal C2) D)->((ord_le2001149050_ereal ((times_1966848393_ereal A) C2)) ((times_1966848393_ereal B) D)))))))
% 0.56/0.78 FOF formula (forall (B:extended_ereal) (A:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal ((times_1966848393_ereal B) A)) ((times_1966848393_ereal C2) A))->(((ord_le2001149050_ereal zero_z163181189_ereal) A)->(((ord_le2001149050_ereal A) extend1289208545_ereal)->((ord_le2001149050_ereal B) C2))))) of role axiom named fact_117_ereal__mult__less__right
% 0.56/0.78 A new axiom: (forall (B:extended_ereal) (A:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal ((times_1966848393_ereal B) A)) ((times_1966848393_ereal C2) A))->(((ord_le2001149050_ereal zero_z163181189_ereal) A)->(((ord_le2001149050_ereal A) extend1289208545_ereal)->((ord_le2001149050_ereal B) C2)))))
% 0.56/0.78 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal C2) extend1289208545_ereal)->((ord_le2001149050_ereal ((times_1966848393_ereal C2) A)) ((times_1966848393_ereal C2) B)))))) of role axiom named fact_118_ereal__mult__strict__left__mono
% 0.56/0.78 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal C2) extend1289208545_ereal)->((ord_le2001149050_ereal ((times_1966848393_ereal C2) A)) ((times_1966848393_ereal C2) B))))))
% 0.56/0.78 FOF formula (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal C2) extend1289208545_ereal)->((ord_le2001149050_ereal ((times_1966848393_ereal A) C2)) ((times_1966848393_ereal B) C2)))))) of role axiom named fact_119_ereal__mult__strict__right__mono
% 0.56/0.78 A new axiom: (forall (A:extended_ereal) (B:extended_ereal) (C2:extended_ereal), (((ord_le2001149050_ereal A) B)->(((ord_le2001149050_ereal zero_z163181189_ereal) C2)->(((ord_le2001149050_ereal C2) extend1289208545_ereal)->((ord_le2001149050_ereal ((times_1966848393_ereal A) C2)) ((times_1966848393_ereal B) C2))))))
% 0.56/0.78 <<<% Conjectures (1)
% 0.56/0.78 thf(conj_0,conjecture,(
% 0.56/0.78 ( lower_191460856_ereal @ x0 @ f )
% 0.56/0.78 != ( ~ !>>>!!!<<< [C: extended_ereal] :
% 0.56/0.78 ( ( ord_le2001149050_ereal @ C @ ( f @ x0 ) )
% 0.56/0.78 =>>>>
% 0.56/0.78 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, 11, 22, 30, 36, 43, 50, 99, 120, 187, 221, 124]
% 0.56/0.78 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, LexToken(THF,'thf',1,39772), LexToken(LPAR,'(',1,39775), name, LexToken(COMMA,',',1,39782), formula_role, LexToken(COMMA,',',1,39793), LexToken(LPAR,'(',1,39794), thf_unitary_formula, thf_pair_connective, LexToken(LPAR,'(',1,39839), unary_connective]
% 0.56/0.78 Unexpected exception Syntax error at '!':BANG
% 0.56/0.78 Traceback (most recent call last):
% 0.56/0.78 File "CASC.py", line 79, in <module>
% 0.56/0.78 problem=TPTP.TPTPproblem(env=environment,debug=1,file=file)
% 0.56/0.78 File "/export/starexec/sandbox2/solver/bin/TPTP.py", line 38, in __init__
% 0.56/0.78 parser.parse(file.read(),debug=0,lexer=lexer)
% 0.56/0.78 File "/export/starexec/sandbox2/solver/bin/ply/yacc.py", line 265, in parse
% 0.56/0.78 return self.parseopt_notrack(input,lexer,debug,tracking,tokenfunc)
% 0.56/0.78 File "/export/starexec/sandbox2/solver/bin/ply/yacc.py", line 1047, in parseopt_notrack
% 0.56/0.78 tok = self.errorfunc(errtoken)
% 0.56/0.78 File "/export/starexec/sandbox2/solver/bin/TPTPparser.py", line 2099, in p_error
% 0.56/0.78 raise TPTPParsingError("Syntax error at '%s':%s" % (t.value,t.type))
% 0.56/0.78 TPTPparser.TPTPParsingError: Syntax error at '!':BANG
%------------------------------------------------------------------------------