TSTP Solution File: ITP062^1 by cocATP---0.2.0
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- Process Solution
%------------------------------------------------------------------------------
% File : cocATP---0.2.0
% Problem : ITP062^1 : TPTP v7.5.0. Released v7.5.0.
% Transfm : none
% Format : tptp:raw
% Command : python CASC.py /export/starexec/sandbox/benchmark/theBenchmark.p
% Computer : n019.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 13:24:04 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
% 0.00/0.10 % Problem : ITP062^1 : TPTP v7.5.0. Released v7.5.0.
% 0.00/0.11 % Command : python CASC.py /export/starexec/sandbox/benchmark/theBenchmark.p
% 0.12/0.31 % Computer : n019.cluster.edu
% 0.12/0.31 % Model : x86_64 x86_64
% 0.12/0.31 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.31 % Memory : 8042.1875MB
% 0.12/0.31 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.31 % CPULimit : 300
% 0.12/0.31 % DateTime : Fri Mar 19 05:08:52 EDT 2021
% 0.12/0.31 % CPUTime :
% 0.18/0.32 ModuleCmd_Load.c(213):ERROR:105: Unable to locate a modulefile for 'python/python27'
% 0.18/0.33 Python 2.7.5
% 0.45/0.61 Using paths ['/home/cristobal/cocATP/CASC/TPTP/', '/export/starexec/sandbox/benchmark/', '/export/starexec/sandbox/benchmark/']
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e7956170>, <kernel.Type object at 0x2b77e7956518>) of role type named ty_n_t__Set__Oset_It__Real__Oreal_J
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring set_real:Type
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77dfe5aa70>, <kernel.Type object at 0x2b77e7956320>) of role type named ty_n_t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring real:Type
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0f2d8>, <kernel.Type object at 0x2b77e7956ab8>) of role type named ty_n_t__Num__Onum
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring num:Type
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0f2d8>, <kernel.Type object at 0x2b77e7956f80>) of role type named ty_n_t__Nat__Onat
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring nat:Type
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e7956248>, <kernel.DependentProduct object at 0x2b77e7956ab8>) of role type named sy_c_GenClock__Mirabelle__bsvkzpgbls_OPC
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring genClo1161277105lle_PC:(nat->(real->real))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e79564d0>, <kernel.Constant object at 0x2b77e7956ab8>) of role type named sy_c_GenClock__Mirabelle__bsvkzpgbls_O_092_060rho_062
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring genClo1144207539le_rho:real
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e7956368>, <kernel.DependentProduct object at 0x1de9998>) of role type named sy_c_GenClock__Mirabelle__bsvkzpgbls_Ocorrect
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring genClo1015804716orrect:(nat->(real->Prop))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e7956248>, <kernel.DependentProduct object at 0x1de9998>) of role type named sy_c_GenClock__Mirabelle__bsvkzpgbls_OokRead1
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring genClo293725281kRead1:((nat->real)->(real->((nat->Prop)->Prop)))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e7956368>, <kernel.DependentProduct object at 0x1de9c68>) of role type named sy_c_GenClock__Mirabelle__bsvkzpgbls_OokRead2
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring genClo293725282kRead2:((nat->real)->((nat->real)->(real->((nat->Prop)->Prop))))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e7956ab8>, <kernel.DependentProduct object at 0x1de99e0>) of role type named sy_c_GenClock__Mirabelle__bsvkzpgbls_Orho__bound1
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring genClo2108747022bound1:((nat->(real->real))->Prop)
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e7956368>, <kernel.DependentProduct object at 0x1de9c68>) of role type named sy_c_GenClock__Mirabelle__bsvkzpgbls_Orho__bound2
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring genClo2108747023bound2:((nat->(real->real))->Prop)
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e7956368>, <kernel.DependentProduct object at 0x1de9b48>) of role type named sy_c_Groups_Oabs__class_Oabs_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring abs_abs_real:(real->real)
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9638>, <kernel.DependentProduct object at 0x1de9e18>) of role type named sy_c_Groups_Ominus__class_Ominus_001t__Nat__Onat
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring minus_minus_nat:(nat->(nat->nat))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x2b77e795a128>, <kernel.DependentProduct object at 0x1de9c20>) of role type named sy_c_Groups_Ominus__class_Ominus_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring minus_minus_real:(real->(real->real))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9c68>, <kernel.Constant object at 0x1de9c20>) of role type named sy_c_Groups_Oone__class_Oone_001t__Nat__Onat
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring one_one_nat:nat
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9638>, <kernel.Constant object at 0x1de9c20>) of role type named sy_c_Groups_Oone__class_Oone_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring one_one_real:real
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9d40>, <kernel.DependentProduct object at 0x1de9c68>) of role type named sy_c_Groups_Oplus__class_Oplus_001t__Nat__Onat
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring plus_plus_nat:(nat->(nat->nat))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9ab8>, <kernel.DependentProduct object at 0x1de9638>) of role type named sy_c_Groups_Oplus__class_Oplus_001t__Num__Onum
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring plus_plus_num:(num->(num->num))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9a28>, <kernel.DependentProduct object at 0x1de9d40>) of role type named sy_c_Groups_Oplus__class_Oplus_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring plus_plus_real:(real->(real->real))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9638>, <kernel.DependentProduct object at 0x1e0e998>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Nat__Onat
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring times_times_nat:(nat->(nat->nat))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9ab8>, <kernel.DependentProduct object at 0x1e0e3f8>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Num__Onum
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring times_times_num:(num->(num->num))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9638>, <kernel.DependentProduct object at 0x1e0eab8>) of role type named sy_c_Groups_Otimes__class_Otimes_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring times_times_real:(real->(real->real))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9ab8>, <kernel.DependentProduct object at 0x1e0e998>) of role type named sy_c_Num_Oneg__numeral__class_Odbl_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring neg_numeral_dbl_real:(real->real)
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9d40>, <kernel.DependentProduct object at 0x1e0e3f8>) of role type named sy_c_Num_Onum_OBit0
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring bit0:(num->num)
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1de9d40>, <kernel.Constant object at 0x1e0e3f8>) of role type named sy_c_Num_Onum_OOne
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring one:num
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0eab8>, <kernel.DependentProduct object at 0x1e0e2d8>) of role type named sy_c_Num_Onumeral__class_Onumeral_001t__Nat__Onat
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring numeral_numeral_nat:(num->nat)
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0ecf8>, <kernel.DependentProduct object at 0x1e0e758>) of role type named sy_c_Num_Onumeral__class_Onumeral_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring numeral_numeral_real:(num->real)
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0e3f8>, <kernel.DependentProduct object at 0x1e0e998>) of role type named sy_c_Orderings_Oord__class_Oless__eq_001t__Nat__Onat
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring ord_less_eq_nat:(nat->(nat->Prop))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0e2d8>, <kernel.DependentProduct object at 0x1e0e6c8>) of role type named sy_c_Orderings_Oord__class_Oless__eq_001t__Num__Onum
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring ord_less_eq_num:(num->(num->Prop))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0e758>, <kernel.DependentProduct object at 0x1e0eab8>) of role type named sy_c_Orderings_Oord__class_Oless__eq_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring ord_less_eq_real:(real->(real->Prop))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0ee18>, <kernel.DependentProduct object at 0x2b77e7939560>) of role type named sy_c_Set_OCollect_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring collect_real:((real->Prop)->set_real)
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0e998>, <kernel.DependentProduct object at 0x2b77e7939560>) of role type named sy_c_member_001t__Real__Oreal
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring member_real:(real->(set_real->Prop))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0ebd8>, <kernel.DependentProduct object at 0x1e0ee18>) of role type named sy_v_C
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring c:(nat->(real->real))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0eab8>, <kernel.DependentProduct object at 0x1e0e758>) of role type named sy_v_D
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring d:(nat->(real->real))
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0e5a8>, <kernel.Constant object at 0x1e0e758>) of role type named sy_v_p
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring p:nat
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0ebd8>, <kernel.Constant object at 0x1e0eab8>) of role type named sy_v_q
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring q:nat
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0e5a8>, <kernel.Constant object at 0x2b77e7939560>) of role type named sy_v_s
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring s:real
% 0.45/0.61 FOF formula (<kernel.Constant object at 0x1e0eab8>, <kernel.Constant object at 0x2b77e79396c8>) of role type named sy_v_t
% 0.45/0.61 Using role type
% 0.45/0.61 Declaring t:real
% 0.45/0.61 FOF formula (genClo2108747023bound2 d) of role axiom named fact_0_rb2
% 0.47/0.62 A new axiom: (genClo2108747023bound2 d)
% 0.47/0.62 FOF formula (genClo2108747022bound1 c) of role axiom named fact_1_rb1
% 0.47/0.62 A new axiom: (genClo2108747022bound1 c)
% 0.47/0.62 FOF formula ((ord_less_eq_real s) t) of role axiom named fact_2_ie
% 0.47/0.62 A new axiom: ((ord_less_eq_real s) t)
% 0.47/0.62 FOF formula (((eq real) (abs_abs_real ((minus_minus_real ((minus_minus_real ((c p) t)) ((c p) s))) ((minus_minus_real ((d q) t)) ((d q) s))))) ((minus_minus_real ((minus_minus_real ((c p) t)) ((c p) s))) ((minus_minus_real ((d q) t)) ((d q) s)))) of role axiom named fact_3_Eq1
% 0.47/0.62 A new axiom: (((eq real) (abs_abs_real ((minus_minus_real ((minus_minus_real ((c p) t)) ((c p) s))) ((minus_minus_real ((d q) t)) ((d q) s))))) ((minus_minus_real ((minus_minus_real ((c p) t)) ((c p) s))) ((minus_minus_real ((d q) t)) ((d q) s))))
% 0.47/0.62 FOF formula (((eq real) ((minus_minus_real ((times_times_real ((minus_minus_real t) s)) ((plus_plus_real one_one_real) genClo1144207539le_rho))) ((times_times_real ((minus_minus_real t) s)) ((minus_minus_real one_one_real) genClo1144207539le_rho)))) ((times_times_real ((times_times_real (numeral_numeral_real (bit0 one))) genClo1144207539le_rho)) ((minus_minus_real t) s))) of role axiom named fact_4_Eq4
% 0.47/0.62 A new axiom: (((eq real) ((minus_minus_real ((times_times_real ((minus_minus_real t) s)) ((plus_plus_real one_one_real) genClo1144207539le_rho))) ((times_times_real ((minus_minus_real t) s)) ((minus_minus_real one_one_real) genClo1144207539le_rho)))) ((times_times_real ((times_times_real (numeral_numeral_real (bit0 one))) genClo1144207539le_rho)) ((minus_minus_real t) s)))
% 0.47/0.62 FOF formula ((ord_less_eq_real ((minus_minus_real ((times_times_real ((minus_minus_real t) s)) ((plus_plus_real one_one_real) genClo1144207539le_rho))) ((minus_minus_real ((d q) t)) ((d q) s)))) ((minus_minus_real ((times_times_real ((minus_minus_real t) s)) ((plus_plus_real one_one_real) genClo1144207539le_rho))) ((times_times_real ((minus_minus_real t) s)) ((minus_minus_real one_one_real) genClo1144207539le_rho)))) of role axiom named fact_5_Eq3
% 0.47/0.62 A new axiom: ((ord_less_eq_real ((minus_minus_real ((times_times_real ((minus_minus_real t) s)) ((plus_plus_real one_one_real) genClo1144207539le_rho))) ((minus_minus_real ((d q) t)) ((d q) s)))) ((minus_minus_real ((times_times_real ((minus_minus_real t) s)) ((plus_plus_real one_one_real) genClo1144207539le_rho))) ((times_times_real ((minus_minus_real t) s)) ((minus_minus_real one_one_real) genClo1144207539le_rho))))
% 0.47/0.62 FOF formula ((genClo1015804716orrect q) t) of role axiom named fact_6_corr__q
% 0.47/0.62 A new axiom: ((genClo1015804716orrect q) t)
% 0.47/0.62 FOF formula ((ord_less_eq_real ((minus_minus_real ((d q) t)) ((d q) s))) ((minus_minus_real ((c p) t)) ((c p) s))) of role axiom named fact_7_PC__ie
% 0.47/0.62 A new axiom: ((ord_less_eq_real ((minus_minus_real ((d q) t)) ((d q) s))) ((minus_minus_real ((c p) t)) ((c p) s)))
% 0.47/0.62 FOF formula ((genClo1015804716orrect p) t) of role axiom named fact_8_corr__p
% 0.47/0.62 A new axiom: ((genClo1015804716orrect p) t)
% 0.47/0.62 FOF formula ((ord_less_eq_real ((minus_minus_real ((minus_minus_real ((c p) t)) ((c p) s))) ((minus_minus_real ((d q) t)) ((d q) s)))) ((minus_minus_real ((times_times_real ((minus_minus_real t) s)) ((plus_plus_real one_one_real) genClo1144207539le_rho))) ((minus_minus_real ((d q) t)) ((d q) s)))) of role axiom named fact_9_Eq2
% 0.47/0.62 A new axiom: ((ord_less_eq_real ((minus_minus_real ((minus_minus_real ((c p) t)) ((c p) s))) ((minus_minus_real ((d q) t)) ((d q) s)))) ((minus_minus_real ((times_times_real ((minus_minus_real t) s)) ((plus_plus_real one_one_real) genClo1144207539le_rho))) ((minus_minus_real ((d q) t)) ((d q) s))))
% 0.47/0.62 FOF formula ((ord_less_eq_real ((times_times_real ((minus_minus_real t) s)) ((minus_minus_real one_one_real) genClo1144207539le_rho))) ((minus_minus_real ((d q) t)) ((d q) s))) of role axiom named fact_10__092_060open_062_It_A_N_As_J_A_K_A_I1_A_N_A_092_060rho_062_J_A_092_060le_062_AD_Aq_At_A_N_AD_Aq_As_092_060close_062
% 0.47/0.62 A new axiom: ((ord_less_eq_real ((times_times_real ((minus_minus_real t) s)) ((minus_minus_real one_one_real) genClo1144207539le_rho))) ((minus_minus_real ((d q) t)) ((d q) s)))
% 0.47/0.62 FOF formula (forall (A:real) (B:real) (V:num), (((eq real) ((times_times_real ((minus_minus_real A) B)) (numeral_numeral_real V))) ((minus_minus_real ((times_times_real A) (numeral_numeral_real V))) ((times_times_real B) (numeral_numeral_real V))))) of role axiom named fact_11_left__diff__distrib__numeral
% 0.48/0.63 A new axiom: (forall (A:real) (B:real) (V:num), (((eq real) ((times_times_real ((minus_minus_real A) B)) (numeral_numeral_real V))) ((minus_minus_real ((times_times_real A) (numeral_numeral_real V))) ((times_times_real B) (numeral_numeral_real V)))))
% 0.48/0.63 FOF formula (forall (V:num) (B:real) (C:real), (((eq real) ((times_times_real (numeral_numeral_real V)) ((minus_minus_real B) C))) ((minus_minus_real ((times_times_real (numeral_numeral_real V)) B)) ((times_times_real (numeral_numeral_real V)) C)))) of role axiom named fact_12_right__diff__distrib__numeral
% 0.48/0.63 A new axiom: (forall (V:num) (B:real) (C:real), (((eq real) ((times_times_real (numeral_numeral_real V)) ((minus_minus_real B) C))) ((minus_minus_real ((times_times_real (numeral_numeral_real V)) B)) ((times_times_real (numeral_numeral_real V)) C))))
% 0.48/0.63 FOF formula (forall (N:num), (((eq real) (abs_abs_real (numeral_numeral_real N))) (numeral_numeral_real N))) of role axiom named fact_13_abs__numeral
% 0.48/0.63 A new axiom: (forall (N:num), (((eq real) (abs_abs_real (numeral_numeral_real N))) (numeral_numeral_real N)))
% 0.48/0.63 FOF formula (forall (A:real), (((eq real) ((times_times_real (abs_abs_real A)) (abs_abs_real A))) ((times_times_real A) A))) of role axiom named fact_14_abs__mult__self__eq
% 0.48/0.63 A new axiom: (forall (A:real), (((eq real) ((times_times_real (abs_abs_real A)) (abs_abs_real A))) ((times_times_real A) A)))
% 0.48/0.63 FOF formula (forall (M:num), (not (((eq num) (bit0 M)) one))) of role axiom named fact_15_semiring__norm_I85_J
% 0.48/0.63 A new axiom: (forall (M:num), (not (((eq num) (bit0 M)) one)))
% 0.48/0.63 FOF formula (forall (N:num), (not (((eq num) one) (bit0 N)))) of role axiom named fact_16_semiring__norm_I83_J
% 0.48/0.63 A new axiom: (forall (N:num), (not (((eq num) one) (bit0 N))))
% 0.48/0.63 FOF formula (forall (V:num) (W:num) (Z:real), (((eq real) ((times_times_real (numeral_numeral_real V)) ((times_times_real (numeral_numeral_real W)) Z))) ((times_times_real (numeral_numeral_real ((times_times_num V) W))) Z))) of role axiom named fact_17_mult__numeral__left__semiring__numeral
% 0.48/0.63 A new axiom: (forall (V:num) (W:num) (Z:real), (((eq real) ((times_times_real (numeral_numeral_real V)) ((times_times_real (numeral_numeral_real W)) Z))) ((times_times_real (numeral_numeral_real ((times_times_num V) W))) Z)))
% 0.48/0.63 FOF formula (forall (V:num) (W:num) (Z:nat), (((eq nat) ((times_times_nat (numeral_numeral_nat V)) ((times_times_nat (numeral_numeral_nat W)) Z))) ((times_times_nat (numeral_numeral_nat ((times_times_num V) W))) Z))) of role axiom named fact_18_mult__numeral__left__semiring__numeral
% 0.48/0.63 A new axiom: (forall (V:num) (W:num) (Z:nat), (((eq nat) ((times_times_nat (numeral_numeral_nat V)) ((times_times_nat (numeral_numeral_nat W)) Z))) ((times_times_nat (numeral_numeral_nat ((times_times_num V) W))) Z)))
% 0.48/0.63 FOF formula (forall (M:num) (N:num), (((eq real) ((times_times_real (numeral_numeral_real M)) (numeral_numeral_real N))) (numeral_numeral_real ((times_times_num M) N)))) of role axiom named fact_19_numeral__times__numeral
% 0.48/0.63 A new axiom: (forall (M:num) (N:num), (((eq real) ((times_times_real (numeral_numeral_real M)) (numeral_numeral_real N))) (numeral_numeral_real ((times_times_num M) N))))
% 0.48/0.63 FOF formula (forall (M:num) (N:num), (((eq nat) ((times_times_nat (numeral_numeral_nat M)) (numeral_numeral_nat N))) (numeral_numeral_nat ((times_times_num M) N)))) of role axiom named fact_20_numeral__times__numeral
% 0.48/0.63 A new axiom: (forall (M:num) (N:num), (((eq nat) ((times_times_nat (numeral_numeral_nat M)) (numeral_numeral_nat N))) (numeral_numeral_nat ((times_times_num M) N))))
% 0.48/0.63 FOF formula (forall (M:num) (N:num), (((eq Prop) ((ord_less_eq_real (numeral_numeral_real M)) (numeral_numeral_real N))) ((ord_less_eq_num M) N))) of role axiom named fact_21_numeral__le__iff
% 0.48/0.63 A new axiom: (forall (M:num) (N:num), (((eq Prop) ((ord_less_eq_real (numeral_numeral_real M)) (numeral_numeral_real N))) ((ord_less_eq_num M) N)))
% 0.48/0.65 FOF formula (forall (M:num) (N:num), (((eq Prop) ((ord_less_eq_nat (numeral_numeral_nat M)) (numeral_numeral_nat N))) ((ord_less_eq_num M) N))) of role axiom named fact_22_numeral__le__iff
% 0.48/0.65 A new axiom: (forall (M:num) (N:num), (((eq Prop) ((ord_less_eq_nat (numeral_numeral_nat M)) (numeral_numeral_nat N))) ((ord_less_eq_num M) N)))
% 0.48/0.65 FOF formula (((eq ((nat->real)->((nat->real)->(real->((nat->Prop)->Prop))))) genClo293725282kRead2) (fun (F:(nat->real)) (G:(nat->real)) (X:real) (Ppred:(nat->Prop))=> (forall (P:nat), ((Ppred P)->((ord_less_eq_real (abs_abs_real ((minus_minus_real (F P)) (G P)))) X))))) of role axiom named fact_23_okRead2__def
% 0.48/0.65 A new axiom: (((eq ((nat->real)->((nat->real)->(real->((nat->Prop)->Prop))))) genClo293725282kRead2) (fun (F:(nat->real)) (G:(nat->real)) (X:real) (Ppred:(nat->Prop))=> (forall (P:nat), ((Ppred P)->((ord_less_eq_real (abs_abs_real ((minus_minus_real (F P)) (G P)))) X)))))
% 0.48/0.65 FOF formula (forall (A:real) (B:real), ((ord_less_eq_real ((minus_minus_real (abs_abs_real A)) (abs_abs_real B))) (abs_abs_real ((minus_minus_real A) B)))) of role axiom named fact_24_abs__triangle__ineq2
% 0.48/0.65 A new axiom: (forall (A:real) (B:real), ((ord_less_eq_real ((minus_minus_real (abs_abs_real A)) (abs_abs_real B))) (abs_abs_real ((minus_minus_real A) B))))
% 0.48/0.65 FOF formula (forall (A:real) (B:real), ((ord_less_eq_real (abs_abs_real ((minus_minus_real (abs_abs_real A)) (abs_abs_real B)))) (abs_abs_real ((minus_minus_real A) B)))) of role axiom named fact_25_abs__triangle__ineq3
% 0.48/0.65 A new axiom: (forall (A:real) (B:real), ((ord_less_eq_real (abs_abs_real ((minus_minus_real (abs_abs_real A)) (abs_abs_real B)))) (abs_abs_real ((minus_minus_real A) B))))
% 0.48/0.65 FOF formula (forall (M:num) (N:num), (((eq Prop) (((eq real) (numeral_numeral_real M)) (numeral_numeral_real N))) (((eq num) M) N))) of role axiom named fact_26_numeral__eq__iff
% 0.48/0.65 A new axiom: (forall (M:num) (N:num), (((eq Prop) (((eq real) (numeral_numeral_real M)) (numeral_numeral_real N))) (((eq num) M) N)))
% 0.48/0.65 FOF formula (forall (M:num) (N:num), (((eq Prop) (((eq nat) (numeral_numeral_nat M)) (numeral_numeral_nat N))) (((eq num) M) N))) of role axiom named fact_27_numeral__eq__iff
% 0.48/0.65 A new axiom: (forall (M:num) (N:num), (((eq Prop) (((eq nat) (numeral_numeral_nat M)) (numeral_numeral_nat N))) (((eq num) M) N)))
% 0.48/0.65 FOF formula (forall (A:real) (B:real) (C:real), (((eq Prop) (((eq real) ((plus_plus_real A) B)) ((plus_plus_real A) C))) (((eq real) B) C))) of role axiom named fact_28_add__left__cancel
% 0.48/0.65 A new axiom: (forall (A:real) (B:real) (C:real), (((eq Prop) (((eq real) ((plus_plus_real A) B)) ((plus_plus_real A) C))) (((eq real) B) C)))
% 0.48/0.65 FOF formula (forall (A:nat) (B:nat) (C:nat), (((eq Prop) (((eq nat) ((plus_plus_nat A) B)) ((plus_plus_nat A) C))) (((eq nat) B) C))) of role axiom named fact_29_add__left__cancel
% 0.48/0.65 A new axiom: (forall (A:nat) (B:nat) (C:nat), (((eq Prop) (((eq nat) ((plus_plus_nat A) B)) ((plus_plus_nat A) C))) (((eq nat) B) C)))
% 0.48/0.65 FOF formula (forall (B:real) (A:real) (C:real), (((eq Prop) (((eq real) ((plus_plus_real B) A)) ((plus_plus_real C) A))) (((eq real) B) C))) of role axiom named fact_30_add__right__cancel
% 0.48/0.65 A new axiom: (forall (B:real) (A:real) (C:real), (((eq Prop) (((eq real) ((plus_plus_real B) A)) ((plus_plus_real C) A))) (((eq real) B) C)))
% 0.48/0.65 FOF formula (forall (B:nat) (A:nat) (C:nat), (((eq Prop) (((eq nat) ((plus_plus_nat B) A)) ((plus_plus_nat C) A))) (((eq nat) B) C))) of role axiom named fact_31_add__right__cancel
% 0.48/0.65 A new axiom: (forall (B:nat) (A:nat) (C:nat), (((eq Prop) (((eq nat) ((plus_plus_nat B) A)) ((plus_plus_nat C) A))) (((eq nat) B) C)))
% 0.48/0.65 FOF formula (forall (M:num) (N:num), (((eq Prop) (((eq num) (bit0 M)) (bit0 N))) (((eq num) M) N))) of role axiom named fact_32_semiring__norm_I87_J
% 0.48/0.65 A new axiom: (forall (M:num) (N:num), (((eq Prop) (((eq num) (bit0 M)) (bit0 N))) (((eq num) M) N)))
% 0.48/0.65 FOF formula (forall (A:real), (((eq real) (abs_abs_real (abs_abs_real A))) (abs_abs_real A))) of role axiom named fact_33_abs__idempotent
% 0.48/0.65 A new axiom: (forall (A:real), (((eq real) (abs_abs_real (abs_abs_real A))) (abs_abs_real A)))
% 0.48/0.66 FOF formula (forall (A:real), (((eq real) (abs_abs_real (abs_abs_real A))) (abs_abs_real A))) of role axiom named fact_34_abs__abs
% 0.48/0.66 A new axiom: (forall (A:real), (((eq real) (abs_abs_real (abs_abs_real A))) (abs_abs_real A)))
% 0.48/0.66 FOF formula (forall (A:real) (C:real) (B:real), (((eq Prop) ((ord_less_eq_real ((plus_plus_real A) C)) ((plus_plus_real B) C))) ((ord_less_eq_real A) B))) of role axiom named fact_35_add__le__cancel__right
% 0.48/0.66 A new axiom: (forall (A:real) (C:real) (B:real), (((eq Prop) ((ord_less_eq_real ((plus_plus_real A) C)) ((plus_plus_real B) C))) ((ord_less_eq_real A) B)))
% 0.48/0.66 FOF formula (forall (A:nat) (C:nat) (B:nat), (((eq Prop) ((ord_less_eq_nat ((plus_plus_nat A) C)) ((plus_plus_nat B) C))) ((ord_less_eq_nat A) B))) of role axiom named fact_36_add__le__cancel__right
% 0.48/0.66 A new axiom: (forall (A:nat) (C:nat) (B:nat), (((eq Prop) ((ord_less_eq_nat ((plus_plus_nat A) C)) ((plus_plus_nat B) C))) ((ord_less_eq_nat A) B)))
% 0.48/0.66 FOF formula (forall (C:real) (A:real) (B:real), (((eq Prop) ((ord_less_eq_real ((plus_plus_real C) A)) ((plus_plus_real C) B))) ((ord_less_eq_real A) B))) of role axiom named fact_37_add__le__cancel__left
% 0.48/0.66 A new axiom: (forall (C:real) (A:real) (B:real), (((eq Prop) ((ord_less_eq_real ((plus_plus_real C) A)) ((plus_plus_real C) B))) ((ord_less_eq_real A) B)))
% 0.48/0.66 FOF formula (forall (C:nat) (A:nat) (B:nat), (((eq Prop) ((ord_less_eq_nat ((plus_plus_nat C) A)) ((plus_plus_nat C) B))) ((ord_less_eq_nat A) B))) of role axiom named fact_38_add__le__cancel__left
% 0.48/0.66 A new axiom: (forall (C:nat) (A:nat) (B:nat), (((eq Prop) ((ord_less_eq_nat ((plus_plus_nat C) A)) ((plus_plus_nat C) B))) ((ord_less_eq_nat A) B)))
% 0.48/0.66 FOF formula (forall (A:real), (((eq real) ((times_times_real A) one_one_real)) A)) of role axiom named fact_39_mult_Oright__neutral
% 0.48/0.66 A new axiom: (forall (A:real), (((eq real) ((times_times_real A) one_one_real)) A))
% 0.48/0.66 FOF formula (forall (A:nat), (((eq nat) ((times_times_nat A) one_one_nat)) A)) of role axiom named fact_40_mult_Oright__neutral
% 0.48/0.66 A new axiom: (forall (A:nat), (((eq nat) ((times_times_nat A) one_one_nat)) A))
% 0.48/0.66 FOF formula (forall (A:real), (((eq real) ((times_times_real one_one_real) A)) A)) of role axiom named fact_41_mult_Oleft__neutral
% 0.48/0.66 A new axiom: (forall (A:real), (((eq real) ((times_times_real one_one_real) A)) A))
% 0.48/0.66 FOF formula (forall (A:nat), (((eq nat) ((times_times_nat one_one_nat) A)) A)) of role axiom named fact_42_mult_Oleft__neutral
% 0.48/0.66 A new axiom: (forall (A:nat), (((eq nat) ((times_times_nat one_one_nat) A)) A))
% 0.48/0.66 FOF formula (forall (M:num) (N:num), (((eq real) ((plus_plus_real (numeral_numeral_real M)) (numeral_numeral_real N))) (numeral_numeral_real ((plus_plus_num M) N)))) of role axiom named fact_43_numeral__plus__numeral
% 0.48/0.66 A new axiom: (forall (M:num) (N:num), (((eq real) ((plus_plus_real (numeral_numeral_real M)) (numeral_numeral_real N))) (numeral_numeral_real ((plus_plus_num M) N))))
% 0.48/0.66 FOF formula (forall (M:num) (N:num), (((eq nat) ((plus_plus_nat (numeral_numeral_nat M)) (numeral_numeral_nat N))) (numeral_numeral_nat ((plus_plus_num M) N)))) of role axiom named fact_44_numeral__plus__numeral
% 0.48/0.66 A new axiom: (forall (M:num) (N:num), (((eq nat) ((plus_plus_nat (numeral_numeral_nat M)) (numeral_numeral_nat N))) (numeral_numeral_nat ((plus_plus_num M) N))))
% 0.48/0.66 FOF formula (forall (V:num) (W:num) (Z:real), (((eq real) ((plus_plus_real (numeral_numeral_real V)) ((plus_plus_real (numeral_numeral_real W)) Z))) ((plus_plus_real (numeral_numeral_real ((plus_plus_num V) W))) Z))) of role axiom named fact_45_add__numeral__left
% 0.48/0.66 A new axiom: (forall (V:num) (W:num) (Z:real), (((eq real) ((plus_plus_real (numeral_numeral_real V)) ((plus_plus_real (numeral_numeral_real W)) Z))) ((plus_plus_real (numeral_numeral_real ((plus_plus_num V) W))) Z)))
% 0.48/0.66 FOF formula (forall (V:num) (W:num) (Z:nat), (((eq nat) ((plus_plus_nat (numeral_numeral_nat V)) ((plus_plus_nat (numeral_numeral_nat W)) Z))) ((plus_plus_nat (numeral_numeral_nat ((plus_plus_num V) W))) Z))) of role axiom named fact_46_add__numeral__left
% 0.48/0.66 A new axiom: (forall (V:num) (W:num) (Z:nat), (((eq nat) ((plus_plus_nat (numeral_numeral_nat V)) ((plus_plus_nat (numeral_numeral_nat W)) Z))) ((plus_plus_nat (numeral_numeral_nat ((plus_plus_num V) W))) Z)))
% 0.48/0.67 FOF formula (forall (A:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real A) B)) B)) A)) of role axiom named fact_47_add__diff__cancel__right_H
% 0.48/0.67 A new axiom: (forall (A:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real A) B)) B)) A))
% 0.48/0.67 FOF formula (forall (A:nat) (B:nat), (((eq nat) ((minus_minus_nat ((plus_plus_nat A) B)) B)) A)) of role axiom named fact_48_add__diff__cancel__right_H
% 0.48/0.67 A new axiom: (forall (A:nat) (B:nat), (((eq nat) ((minus_minus_nat ((plus_plus_nat A) B)) B)) A))
% 0.48/0.67 FOF formula (forall (A:real) (C:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real A) C)) ((plus_plus_real B) C))) ((minus_minus_real A) B))) of role axiom named fact_49_add__diff__cancel__right
% 0.48/0.67 A new axiom: (forall (A:real) (C:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real A) C)) ((plus_plus_real B) C))) ((minus_minus_real A) B)))
% 0.48/0.67 FOF formula (forall (A:nat) (C:nat) (B:nat), (((eq nat) ((minus_minus_nat ((plus_plus_nat A) C)) ((plus_plus_nat B) C))) ((minus_minus_nat A) B))) of role axiom named fact_50_add__diff__cancel__right
% 0.48/0.67 A new axiom: (forall (A:nat) (C:nat) (B:nat), (((eq nat) ((minus_minus_nat ((plus_plus_nat A) C)) ((plus_plus_nat B) C))) ((minus_minus_nat A) B)))
% 0.48/0.67 FOF formula (forall (A:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real A) B)) A)) B)) of role axiom named fact_51_add__diff__cancel__left_H
% 0.48/0.67 A new axiom: (forall (A:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real A) B)) A)) B))
% 0.48/0.67 FOF formula (forall (A:nat) (B:nat), (((eq nat) ((minus_minus_nat ((plus_plus_nat A) B)) A)) B)) of role axiom named fact_52_add__diff__cancel__left_H
% 0.48/0.67 A new axiom: (forall (A:nat) (B:nat), (((eq nat) ((minus_minus_nat ((plus_plus_nat A) B)) A)) B))
% 0.48/0.67 FOF formula (forall (C:real) (A:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real C) A)) ((plus_plus_real C) B))) ((minus_minus_real A) B))) of role axiom named fact_53_add__diff__cancel__left
% 0.48/0.67 A new axiom: (forall (C:real) (A:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real C) A)) ((plus_plus_real C) B))) ((minus_minus_real A) B)))
% 0.48/0.67 FOF formula (forall (C:nat) (A:nat) (B:nat), (((eq nat) ((minus_minus_nat ((plus_plus_nat C) A)) ((plus_plus_nat C) B))) ((minus_minus_nat A) B))) of role axiom named fact_54_add__diff__cancel__left
% 0.48/0.67 A new axiom: (forall (C:nat) (A:nat) (B:nat), (((eq nat) ((minus_minus_nat ((plus_plus_nat C) A)) ((plus_plus_nat C) B))) ((minus_minus_nat A) B)))
% 0.48/0.67 FOF formula (forall (A:real) (B:real), (((eq real) ((plus_plus_real ((minus_minus_real A) B)) B)) A)) of role axiom named fact_55_diff__add__cancel
% 0.48/0.67 A new axiom: (forall (A:real) (B:real), (((eq real) ((plus_plus_real ((minus_minus_real A) B)) B)) A))
% 0.48/0.67 FOF formula (forall (A:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real A) B)) B)) A)) of role axiom named fact_56_add__diff__cancel
% 0.48/0.67 A new axiom: (forall (A:real) (B:real), (((eq real) ((minus_minus_real ((plus_plus_real A) B)) B)) A))
% 0.48/0.67 FOF formula (forall (A:real) (B:real), (((eq real) (abs_abs_real ((plus_plus_real (abs_abs_real A)) (abs_abs_real B)))) ((plus_plus_real (abs_abs_real A)) (abs_abs_real B)))) of role axiom named fact_57_abs__add__abs
% 0.48/0.67 A new axiom: (forall (A:real) (B:real), (((eq real) (abs_abs_real ((plus_plus_real (abs_abs_real A)) (abs_abs_real B)))) ((plus_plus_real (abs_abs_real A)) (abs_abs_real B))))
% 0.48/0.67 FOF formula (((eq real) (abs_abs_real one_one_real)) one_one_real) of role axiom named fact_58_abs__1
% 0.48/0.67 A new axiom: (((eq real) (abs_abs_real one_one_real)) one_one_real)
% 0.48/0.67 FOF formula (forall (A:real) (P2:(real->Prop)), (((eq Prop) ((member_real A) (collect_real P2))) (P2 A))) of role axiom named fact_59_mem__Collect__eq
% 0.48/0.67 A new axiom: (forall (A:real) (P2:(real->Prop)), (((eq Prop) ((member_real A) (collect_real P2))) (P2 A)))
% 0.48/0.67 FOF formula (forall (A2:set_real), (((eq set_real) (collect_real (fun (X:real)=> ((member_real X) A2)))) A2)) of role axiom named fact_60_Collect__mem__eq
% 0.48/0.67 A new axiom: (forall (A2:set_real), (((eq set_real) (collect_real (fun (X:real)=> ((member_real X) A2)))) A2))
% 0.48/0.69 FOF formula (forall (M:num) (N:num), (((eq num) ((times_times_num (bit0 M)) (bit0 N))) (bit0 (bit0 ((times_times_num M) N))))) of role axiom named fact_61_semiring__norm_I13_J
% 0.48/0.69 A new axiom: (forall (M:num) (N:num), (((eq num) ((times_times_num (bit0 M)) (bit0 N))) (bit0 (bit0 ((times_times_num M) N)))))
% 0.48/0.69 FOF formula (forall (M:num), (((eq num) ((times_times_num M) one)) M)) of role axiom named fact_62_semiring__norm_I11_J
% 0.48/0.69 A new axiom: (forall (M:num), (((eq num) ((times_times_num M) one)) M))
% 0.48/0.69 FOF formula (forall (N:num), (((eq num) ((times_times_num one) N)) N)) of role axiom named fact_63_semiring__norm_I12_J
% 0.48/0.69 A new axiom: (forall (N:num), (((eq num) ((times_times_num one) N)) N))
% 0.48/0.69 FOF formula (forall (M:num) (N:num), (((eq Prop) ((ord_less_eq_num (bit0 M)) (bit0 N))) ((ord_less_eq_num M) N))) of role axiom named fact_64_semiring__norm_I71_J
% 0.48/0.69 A new axiom: (forall (M:num) (N:num), (((eq Prop) ((ord_less_eq_num (bit0 M)) (bit0 N))) ((ord_less_eq_num M) N)))
% 0.48/0.69 FOF formula (forall (N:num), ((ord_less_eq_num one) N)) of role axiom named fact_65_semiring__norm_I68_J
% 0.48/0.69 A new axiom: (forall (N:num), ((ord_less_eq_num one) N))
% 0.48/0.69 FOF formula (forall (B:real) (A:real), (((ord_less_eq_real B) A)->(((eq real) ((plus_plus_real ((minus_minus_real A) B)) B)) A))) of role axiom named fact_66_le__add__diff__inverse2
% 0.48/0.69 A new axiom: (forall (B:real) (A:real), (((ord_less_eq_real B) A)->(((eq real) ((plus_plus_real ((minus_minus_real A) B)) B)) A)))
% 0.48/0.69 FOF formula (forall (B:nat) (A:nat), (((ord_less_eq_nat B) A)->(((eq nat) ((plus_plus_nat ((minus_minus_nat A) B)) B)) A))) of role axiom named fact_67_le__add__diff__inverse2
% 0.48/0.69 A new axiom: (forall (B:nat) (A:nat), (((ord_less_eq_nat B) A)->(((eq nat) ((plus_plus_nat ((minus_minus_nat A) B)) B)) A)))
% 0.48/0.69 FOF formula (forall (B:real) (A:real), (((ord_less_eq_real B) A)->(((eq real) ((plus_plus_real B) ((minus_minus_real A) B))) A))) of role axiom named fact_68_le__add__diff__inverse
% 0.48/0.69 A new axiom: (forall (B:real) (A:real), (((ord_less_eq_real B) A)->(((eq real) ((plus_plus_real B) ((minus_minus_real A) B))) A)))
% 0.48/0.69 FOF formula (forall (B:nat) (A:nat), (((ord_less_eq_nat B) A)->(((eq nat) ((plus_plus_nat B) ((minus_minus_nat A) B))) A))) of role axiom named fact_69_le__add__diff__inverse
% 0.48/0.69 A new axiom: (forall (B:nat) (A:nat), (((ord_less_eq_nat B) A)->(((eq nat) ((plus_plus_nat B) ((minus_minus_nat A) B))) A)))
% 0.48/0.69 FOF formula (forall (A:real) (B:real) (V:num), (((eq real) ((times_times_real ((plus_plus_real A) B)) (numeral_numeral_real V))) ((plus_plus_real ((times_times_real A) (numeral_numeral_real V))) ((times_times_real B) (numeral_numeral_real V))))) of role axiom named fact_70_distrib__right__numeral
% 0.48/0.69 A new axiom: (forall (A:real) (B:real) (V:num), (((eq real) ((times_times_real ((plus_plus_real A) B)) (numeral_numeral_real V))) ((plus_plus_real ((times_times_real A) (numeral_numeral_real V))) ((times_times_real B) (numeral_numeral_real V)))))
% 0.48/0.69 FOF formula (forall (A:nat) (B:nat) (V:num), (((eq nat) ((times_times_nat ((plus_plus_nat A) B)) (numeral_numeral_nat V))) ((plus_plus_nat ((times_times_nat A) (numeral_numeral_nat V))) ((times_times_nat B) (numeral_numeral_nat V))))) of role axiom named fact_71_distrib__right__numeral
% 0.48/0.69 A new axiom: (forall (A:nat) (B:nat) (V:num), (((eq nat) ((times_times_nat ((plus_plus_nat A) B)) (numeral_numeral_nat V))) ((plus_plus_nat ((times_times_nat A) (numeral_numeral_nat V))) ((times_times_nat B) (numeral_numeral_nat V)))))
% 0.48/0.69 FOF formula (forall (V:num) (B:real) (C:real), (((eq real) ((times_times_real (numeral_numeral_real V)) ((plus_plus_real B) C))) ((plus_plus_real ((times_times_real (numeral_numeral_real V)) B)) ((times_times_real (numeral_numeral_real V)) C)))) of role axiom named fact_72_distrib__left__numeral
% 0.48/0.69 A new axiom: (forall (V:num) (B:real) (C:real), (((eq real) ((times_times_real (numeral_numeral_real V)) ((plus_plus_real B) C))) ((plus_plus_real ((times_times_real (numeral_numeral_real V)) B)) ((times_times_real (numeral_numeral_real V)) C))))
% 0.48/0.69 FOF formula (forall (V:num) (B:nat) (C:nat), (((eq nat) ((times_times_nat (numeral_numeral_nat V)) ((plus_plus_nat B) C))) ((plus_plus_nat ((times_times_nat (numeral_numeral_nat V)) B)) ((times_times_nat (numeral_numeral_nat V)) C)))) of role axiom named fact_73_distrib__left__numeral
% 0.48/0.70 A new axiom: (forall (V:num) (B:nat) (C:nat), (((eq nat) ((times_times_nat (numeral_numeral_nat V)) ((plus_plus_nat B) C))) ((plus_plus_nat ((times_times_nat (numeral_numeral_nat V)) B)) ((times_times_nat (numeral_numeral_nat V)) C))))
% 0.48/0.70 FOF formula (forall (N:num), (((eq Prop) (((eq real) one_one_real) (numeral_numeral_real N))) (((eq num) one) N))) of role axiom named fact_74_one__eq__numeral__iff
% 0.48/0.70 A new axiom: (forall (N:num), (((eq Prop) (((eq real) one_one_real) (numeral_numeral_real N))) (((eq num) one) N)))
% 0.48/0.70 FOF formula (forall (N:num), (((eq Prop) (((eq nat) one_one_nat) (numeral_numeral_nat N))) (((eq num) one) N))) of role axiom named fact_75_one__eq__numeral__iff
% 0.48/0.70 A new axiom: (forall (N:num), (((eq Prop) (((eq nat) one_one_nat) (numeral_numeral_nat N))) (((eq num) one) N)))
% 0.48/0.70 FOF formula (forall (N:num), (((eq Prop) (((eq real) (numeral_numeral_real N)) one_one_real)) (((eq num) N) one))) of role axiom named fact_76_numeral__eq__one__iff
% 0.48/0.70 A new axiom: (forall (N:num), (((eq Prop) (((eq real) (numeral_numeral_real N)) one_one_real)) (((eq num) N) one)))
% 0.48/0.70 FOF formula (forall (N:num), (((eq Prop) (((eq nat) (numeral_numeral_nat N)) one_one_nat)) (((eq num) N) one))) of role axiom named fact_77_numeral__eq__one__iff
% 0.48/0.70 A new axiom: (forall (N:num), (((eq Prop) (((eq nat) (numeral_numeral_nat N)) one_one_nat)) (((eq num) N) one)))
% 0.48/0.70 FOF formula (forall (N:num), (((eq num) ((times_times_num (bit0 one)) N)) (bit0 N))) of role axiom named fact_78_num__double
% 0.48/0.70 A new axiom: (forall (N:num), (((eq num) ((times_times_num (bit0 one)) N)) (bit0 N)))
% 0.48/0.70 FOF formula (forall (M:num), (((ord_less_eq_num (bit0 M)) one)->False)) of role axiom named fact_79_semiring__norm_I69_J
% 0.48/0.70 A new axiom: (forall (M:num), (((ord_less_eq_num (bit0 M)) one)->False))
% 0.48/0.70 FOF formula (forall (N:num), (((eq real) ((plus_plus_real one_one_real) (numeral_numeral_real N))) (numeral_numeral_real ((plus_plus_num one) N)))) of role axiom named fact_80_one__plus__numeral
% 0.48/0.70 A new axiom: (forall (N:num), (((eq real) ((plus_plus_real one_one_real) (numeral_numeral_real N))) (numeral_numeral_real ((plus_plus_num one) N))))
% 0.48/0.70 FOF formula (forall (N:num), (((eq nat) ((plus_plus_nat one_one_nat) (numeral_numeral_nat N))) (numeral_numeral_nat ((plus_plus_num one) N)))) of role axiom named fact_81_one__plus__numeral
% 0.48/0.70 A new axiom: (forall (N:num), (((eq nat) ((plus_plus_nat one_one_nat) (numeral_numeral_nat N))) (numeral_numeral_nat ((plus_plus_num one) N))))
% 0.48/0.70 FOF formula (forall (N:num), (((eq real) ((plus_plus_real (numeral_numeral_real N)) one_one_real)) (numeral_numeral_real ((plus_plus_num N) one)))) of role axiom named fact_82_numeral__plus__one
% 0.48/0.70 A new axiom: (forall (N:num), (((eq real) ((plus_plus_real (numeral_numeral_real N)) one_one_real)) (numeral_numeral_real ((plus_plus_num N) one))))
% 0.48/0.70 FOF formula (forall (N:num), (((eq nat) ((plus_plus_nat (numeral_numeral_nat N)) one_one_nat)) (numeral_numeral_nat ((plus_plus_num N) one)))) of role axiom named fact_83_numeral__plus__one
% 0.48/0.70 A new axiom: (forall (N:num), (((eq nat) ((plus_plus_nat (numeral_numeral_nat N)) one_one_nat)) (numeral_numeral_nat ((plus_plus_num N) one))))
% 0.48/0.70 FOF formula (((eq real) ((plus_plus_real one_one_real) one_one_real)) (numeral_numeral_real (bit0 one))) of role axiom named fact_84_one__add__one
% 0.48/0.70 A new axiom: (((eq real) ((plus_plus_real one_one_real) one_one_real)) (numeral_numeral_real (bit0 one)))
% 0.48/0.70 FOF formula (((eq nat) ((plus_plus_nat one_one_nat) one_one_nat)) (numeral_numeral_nat (bit0 one))) of role axiom named fact_85_one__add__one
% 0.48/0.70 A new axiom: (((eq nat) ((plus_plus_nat one_one_nat) one_one_nat)) (numeral_numeral_nat (bit0 one)))
% 0.48/0.70 FOF formula (forall (N:num), (((eq Prop) ((ord_less_eq_real (numeral_numeral_real N)) one_one_real)) ((ord_less_eq_num N) one))) of role axiom named fact_86_numeral__le__one__iff
% 0.48/0.70 A new axiom: (forall (N:num), (((eq Prop) ((ord_less_eq_real (numeral_numeral_real N)) one_one_real)) ((ord_less_eq_num N) one)))
% 0.56/0.71 FOF formula (forall (N:num), (((eq Prop) ((ord_less_eq_nat (numeral_numeral_nat N)) one_one_nat)) ((ord_less_eq_num N) one))) of role axiom named fact_87_numeral__le__one__iff
% 0.56/0.71 A new axiom: (forall (N:num), (((eq Prop) ((ord_less_eq_nat (numeral_numeral_nat N)) one_one_nat)) ((ord_less_eq_num N) one)))
% 0.56/0.71 FOF formula (forall (A:real) (B:real) (C:real), (((eq real) ((plus_plus_real ((plus_plus_real A) B)) C)) ((plus_plus_real A) ((plus_plus_real B) C)))) of role axiom named fact_88_ab__semigroup__add__class_Oadd__ac_I1_J
% 0.56/0.71 A new axiom: (forall (A:real) (B:real) (C:real), (((eq real) ((plus_plus_real ((plus_plus_real A) B)) C)) ((plus_plus_real A) ((plus_plus_real B) C))))
% 0.56/0.71 FOF formula (forall (A:nat) (B:nat) (C:nat), (((eq nat) ((plus_plus_nat ((plus_plus_nat A) B)) C)) ((plus_plus_nat A) ((plus_plus_nat B) C)))) of role axiom named fact_89_ab__semigroup__add__class_Oadd__ac_I1_J
% 0.56/0.71 A new axiom: (forall (A:nat) (B:nat) (C:nat), (((eq nat) ((plus_plus_nat ((plus_plus_nat A) B)) C)) ((plus_plus_nat A) ((plus_plus_nat B) C))))
% 0.56/0.71 FOF formula (forall (A:real) (B:real) (C:real), (((eq real) ((plus_plus_real ((plus_plus_real A) B)) C)) ((plus_plus_real A) ((plus_plus_real B) C)))) of role axiom named fact_90_is__num__normalize_I1_J
% 0.56/0.71 A new axiom: (forall (A:real) (B:real) (C:real), (((eq real) ((plus_plus_real ((plus_plus_real A) B)) C)) ((plus_plus_real A) ((plus_plus_real B) C))))
% 0.56/0.71 FOF formula (forall (_TPTP_I:real) (J:real) (K:real) (L:real), (((and (((eq real) _TPTP_I) J)) (((eq real) K) L))->(((eq real) ((plus_plus_real _TPTP_I) K)) ((plus_plus_real J) L)))) of role axiom named fact_91_add__mono__thms__linordered__semiring_I4_J
% 0.56/0.71 A new axiom: (forall (_TPTP_I:real) (J:real) (K:real) (L:real), (((and (((eq real) _TPTP_I) J)) (((eq real) K) L))->(((eq real) ((plus_plus_real _TPTP_I) K)) ((plus_plus_real J) L))))
% 0.56/0.71 FOF formula (forall (_TPTP_I:nat) (J:nat) (K:nat) (L:nat), (((and (((eq nat) _TPTP_I) J)) (((eq nat) K) L))->(((eq nat) ((plus_plus_nat _TPTP_I) K)) ((plus_plus_nat J) L)))) of role axiom named fact_92_add__mono__thms__linordered__semiring_I4_J
% 0.56/0.71 A new axiom: (forall (_TPTP_I:nat) (J:nat) (K:nat) (L:nat), (((and (((eq nat) _TPTP_I) J)) (((eq nat) K) L))->(((eq nat) ((plus_plus_nat _TPTP_I) K)) ((plus_plus_nat J) L))))
% 0.56/0.71 FOF formula (forall (X2:real), (((eq Prop) (((eq real) one_one_real) X2)) (((eq real) X2) one_one_real))) of role axiom named fact_93_one__reorient
% 0.56/0.71 A new axiom: (forall (X2:real), (((eq Prop) (((eq real) one_one_real) X2)) (((eq real) X2) one_one_real)))
% 0.56/0.71 FOF formula (forall (X2:nat), (((eq Prop) (((eq nat) one_one_nat) X2)) (((eq nat) X2) one_one_nat))) of role axiom named fact_94_one__reorient
% 0.56/0.71 A new axiom: (forall (X2:nat), (((eq Prop) (((eq nat) one_one_nat) X2)) (((eq nat) X2) one_one_nat)))
% 0.56/0.71 FOF formula (forall (A2:real) (K:real) (A:real) (B:real), ((((eq real) A2) ((plus_plus_real K) A))->(((eq real) ((plus_plus_real A2) B)) ((plus_plus_real K) ((plus_plus_real A) B))))) of role axiom named fact_95_group__cancel_Oadd1
% 0.56/0.71 A new axiom: (forall (A2:real) (K:real) (A:real) (B:real), ((((eq real) A2) ((plus_plus_real K) A))->(((eq real) ((plus_plus_real A2) B)) ((plus_plus_real K) ((plus_plus_real A) B)))))
% 0.56/0.71 FOF formula (forall (A2:nat) (K:nat) (A:nat) (B:nat), ((((eq nat) A2) ((plus_plus_nat K) A))->(((eq nat) ((plus_plus_nat A2) B)) ((plus_plus_nat K) ((plus_plus_nat A) B))))) of role axiom named fact_96_group__cancel_Oadd1
% 0.56/0.71 A new axiom: (forall (A2:nat) (K:nat) (A:nat) (B:nat), ((((eq nat) A2) ((plus_plus_nat K) A))->(((eq nat) ((plus_plus_nat A2) B)) ((plus_plus_nat K) ((plus_plus_nat A) B)))))
% 0.56/0.71 FOF formula (forall (B2:real) (K:real) (B:real) (A:real), ((((eq real) B2) ((plus_plus_real K) B))->(((eq real) ((plus_plus_real A) B2)) ((plus_plus_real K) ((plus_plus_real A) B))))) of role axiom named fact_97_group__cancel_Oadd2
% 0.56/0.71 A new axiom: (forall (B2:real) (K:real) (B:real) (A:real), ((((eq real) B2) ((plus_plus_real K) B))->(((eq real) ((plus_plus_real A) B2)) ((plus_plus_real K) ((plus_plus_real A) B)))))
% 0.56/0.71 FOF formula (forall (B2:nat) (K:nat) (B:nat) (A:nat), ((((eq nat) B2) ((plus_plus_nat K) B))->(((eq nat) ((plus_plus_nat A) B2)) ((plus_plus_nat K) ((plus_plus_nat A) B))))) of role axiom named fact_98_group__cancel_Oadd2
% 0.56/0.73 A new axiom: (forall (B2:nat) (K:nat) (B:nat) (A:nat), ((((eq nat) B2) ((plus_plus_nat K) B))->(((eq nat) ((plus_plus_nat A) B2)) ((plus_plus_nat K) ((plus_plus_nat A) B)))))
% 0.56/0.73 FOF formula (forall (A:real) (B:real) (C:real), (((eq real) ((plus_plus_real ((plus_plus_real A) B)) C)) ((plus_plus_real A) ((plus_plus_real B) C)))) of role axiom named fact_99_add_Oassoc
% 0.56/0.73 A new axiom: (forall (A:real) (B:real) (C:real), (((eq real) ((plus_plus_real ((plus_plus_real A) B)) C)) ((plus_plus_real A) ((plus_plus_real B) C))))
% 0.56/0.73 FOF formula (forall (A:nat) (B:nat) (C:nat), (((eq nat) ((plus_plus_nat ((plus_plus_nat A) B)) C)) ((plus_plus_nat A) ((plus_plus_nat B) C)))) of role axiom named fact_100_add_Oassoc
% 0.56/0.73 A new axiom: (forall (A:nat) (B:nat) (C:nat), (((eq nat) ((plus_plus_nat ((plus_plus_nat A) B)) C)) ((plus_plus_nat A) ((plus_plus_nat B) C))))
% 0.56/0.73 FOF formula (forall (A:real) (B:real) (C:real), (((eq Prop) (((eq real) ((plus_plus_real A) B)) ((plus_plus_real A) C))) (((eq real) B) C))) of role axiom named fact_101_add_Oleft__cancel
% 0.56/0.73 A new axiom: (forall (A:real) (B:real) (C:real), (((eq Prop) (((eq real) ((plus_plus_real A) B)) ((plus_plus_real A) C))) (((eq real) B) C)))
% 0.56/0.73 FOF formula (forall (B:real) (A:real) (C:real), (((eq Prop) (((eq real) ((plus_plus_real B) A)) ((plus_plus_real C) A))) (((eq real) B) C))) of role axiom named fact_102_add_Oright__cancel
% 0.56/0.73 A new axiom: (forall (B:real) (A:real) (C:real), (((eq Prop) (((eq real) ((plus_plus_real B) A)) ((plus_plus_real C) A))) (((eq real) B) C)))
% 0.56/0.73 FOF formula (((eq (real->(real->real))) plus_plus_real) (fun (A3:real) (B3:real)=> ((plus_plus_real B3) A3))) of role axiom named fact_103_add_Ocommute
% 0.56/0.73 A new axiom: (((eq (real->(real->real))) plus_plus_real) (fun (A3:real) (B3:real)=> ((plus_plus_real B3) A3)))
% 0.56/0.73 FOF formula (((eq (nat->(nat->nat))) plus_plus_nat) (fun (A3:nat) (B3:nat)=> ((plus_plus_nat B3) A3))) of role axiom named fact_104_add_Ocommute
% 0.56/0.73 A new axiom: (((eq (nat->(nat->nat))) plus_plus_nat) (fun (A3:nat) (B3:nat)=> ((plus_plus_nat B3) A3)))
% 0.56/0.73 FOF formula (forall (B:real) (A:real) (C:real), (((eq real) ((plus_plus_real B) ((plus_plus_real A) C))) ((plus_plus_real A) ((plus_plus_real B) C)))) of role axiom named fact_105_add_Oleft__commute
% 0.56/0.73 A new axiom: (forall (B:real) (A:real) (C:real), (((eq real) ((plus_plus_real B) ((plus_plus_real A) C))) ((plus_plus_real A) ((plus_plus_real B) C))))
% 0.56/0.73 FOF formula (forall (B:nat) (A:nat) (C:nat), (((eq nat) ((plus_plus_nat B) ((plus_plus_nat A) C))) ((plus_plus_nat A) ((plus_plus_nat B) C)))) of role axiom named fact_106_add_Oleft__commute
% 0.56/0.73 A new axiom: (forall (B:nat) (A:nat) (C:nat), (((eq nat) ((plus_plus_nat B) ((plus_plus_nat A) C))) ((plus_plus_nat A) ((plus_plus_nat B) C))))
% 0.56/0.73 FOF formula (forall (A:real) (B:real) (C:real), ((((eq real) ((plus_plus_real A) B)) ((plus_plus_real A) C))->(((eq real) B) C))) of role axiom named fact_107_add__left__imp__eq
% 0.56/0.73 A new axiom: (forall (A:real) (B:real) (C:real), ((((eq real) ((plus_plus_real A) B)) ((plus_plus_real A) C))->(((eq real) B) C)))
% 0.56/0.73 FOF formula (forall (A:nat) (B:nat) (C:nat), ((((eq nat) ((plus_plus_nat A) B)) ((plus_plus_nat A) C))->(((eq nat) B) C))) of role axiom named fact_108_add__left__imp__eq
% 0.56/0.73 A new axiom: (forall (A:nat) (B:nat) (C:nat), ((((eq nat) ((plus_plus_nat A) B)) ((plus_plus_nat A) C))->(((eq nat) B) C)))
% 0.56/0.73 FOF formula (forall (B:real) (A:real) (C:real), ((((eq real) ((plus_plus_real B) A)) ((plus_plus_real C) A))->(((eq real) B) C))) of role axiom named fact_109_add__right__imp__eq
% 0.56/0.73 A new axiom: (forall (B:real) (A:real) (C:real), ((((eq real) ((plus_plus_real B) A)) ((plus_plus_real C) A))->(((eq real) B) C)))
% 0.56/0.73 FOF formula (forall (B:nat) (A:nat) (C:nat), ((((eq nat) ((plus_plus_nat B) A)) ((plus_plus_nat C) A))->(((eq nat) B) C))) of role axiom named fact_110_add__right__imp__eq
% 0.56/0.73 A new axiom: (forall (B:nat) (A:nat) (C:nat), ((((eq nat) ((plus_plus_nat B) A)) ((plus_plus_nat C) A))->(((eq nat) B) C)))
% 0.56/0.73 FOF formula (forall (X2:num), (((eq Prop) ((ord_less_eq_num X2) one)) (((eq num) X2) one))) of role axiom named fact_111_le__num__One__iff
% 0.56/0.74 A new axiom: (forall (X2:num), (((eq Prop) ((ord_less_eq_num X2) one)) (((eq num) X2) one)))
% 0.56/0.74 FOF formula (forall (X2:num), (((eq real) ((plus_plus_real one_one_real) (numeral_numeral_real X2))) ((plus_plus_real (numeral_numeral_real X2)) one_one_real))) of role axiom named fact_112_one__plus__numeral__commute
% 0.56/0.74 A new axiom: (forall (X2:num), (((eq real) ((plus_plus_real one_one_real) (numeral_numeral_real X2))) ((plus_plus_real (numeral_numeral_real X2)) one_one_real)))
% 0.56/0.74 FOF formula (forall (X2:num), (((eq nat) ((plus_plus_nat one_one_nat) (numeral_numeral_nat X2))) ((plus_plus_nat (numeral_numeral_nat X2)) one_one_nat))) of role axiom named fact_113_one__plus__numeral__commute
% 0.56/0.74 A new axiom: (forall (X2:num), (((eq nat) ((plus_plus_nat one_one_nat) (numeral_numeral_nat X2))) ((plus_plus_nat (numeral_numeral_nat X2)) one_one_nat)))
% 0.56/0.74 FOF formula (forall (P3:nat) (S:real) (T:real), (((and ((ord_less_eq_real S) T)) ((genClo1015804716orrect P3) T))->((genClo1015804716orrect P3) S))) of role axiom named fact_114_correct__closed
% 0.56/0.74 A new axiom: (forall (P3:nat) (S:real) (T:real), (((and ((ord_less_eq_real S) T)) ((genClo1015804716orrect P3) T))->((genClo1015804716orrect P3) S)))
% 0.56/0.74 FOF formula (forall (A:real) (C:real) (B:real), (((ord_less_eq_real ((plus_plus_real A) C)) ((plus_plus_real B) C))->((ord_less_eq_real A) B))) of role axiom named fact_115_add__le__imp__le__right
% 0.56/0.74 A new axiom: (forall (A:real) (C:real) (B:real), (((ord_less_eq_real ((plus_plus_real A) C)) ((plus_plus_real B) C))->((ord_less_eq_real A) B)))
% 0.56/0.74 FOF formula (forall (A:nat) (C:nat) (B:nat), (((ord_less_eq_nat ((plus_plus_nat A) C)) ((plus_plus_nat B) C))->((ord_less_eq_nat A) B))) of role axiom named fact_116_add__le__imp__le__right
% 0.56/0.74 A new axiom: (forall (A:nat) (C:nat) (B:nat), (((ord_less_eq_nat ((plus_plus_nat A) C)) ((plus_plus_nat B) C))->((ord_less_eq_nat A) B)))
% 0.56/0.74 FOF formula (forall (C:real) (A:real) (B:real), (((ord_less_eq_real ((plus_plus_real C) A)) ((plus_plus_real C) B))->((ord_less_eq_real A) B))) of role axiom named fact_117_add__le__imp__le__left
% 0.56/0.74 A new axiom: (forall (C:real) (A:real) (B:real), (((ord_less_eq_real ((plus_plus_real C) A)) ((plus_plus_real C) B))->((ord_less_eq_real A) B)))
% 0.56/0.74 FOF formula (forall (C:nat) (A:nat) (B:nat), (((ord_less_eq_nat ((plus_plus_nat C) A)) ((plus_plus_nat C) B))->((ord_less_eq_nat A) B))) of role axiom named fact_118_add__le__imp__le__left
% 0.56/0.74 A new axiom: (forall (C:nat) (A:nat) (B:nat), (((ord_less_eq_nat ((plus_plus_nat C) A)) ((plus_plus_nat C) B))->((ord_less_eq_nat A) B)))
% 0.56/0.74 FOF formula (((eq (nat->(nat->Prop))) ord_less_eq_nat) (fun (A3:nat) (B3:nat)=> ((ex nat) (fun (C2:nat)=> (((eq nat) B3) ((plus_plus_nat A3) C2)))))) of role axiom named fact_119_le__iff__add
% 0.56/0.74 A new axiom: (((eq (nat->(nat->Prop))) ord_less_eq_nat) (fun (A3:nat) (B3:nat)=> ((ex nat) (fun (C2:nat)=> (((eq nat) B3) ((plus_plus_nat A3) C2))))))
% 0.56/0.74 FOF formula (forall (A:real) (B:real) (C:real), (((ord_less_eq_real A) B)->((ord_less_eq_real ((plus_plus_real A) C)) ((plus_plus_real B) C)))) of role axiom named fact_120_add__right__mono
% 0.56/0.74 A new axiom: (forall (A:real) (B:real) (C:real), (((ord_less_eq_real A) B)->((ord_less_eq_real ((plus_plus_real A) C)) ((plus_plus_real B) C))))
% 0.56/0.74 FOF formula (forall (A:nat) (B:nat) (C:nat), (((ord_less_eq_nat A) B)->((ord_less_eq_nat ((plus_plus_nat A) C)) ((plus_plus_nat B) C)))) of role axiom named fact_121_add__right__mono
% 0.56/0.74 A new axiom: (forall (A:nat) (B:nat) (C:nat), (((ord_less_eq_nat A) B)->((ord_less_eq_nat ((plus_plus_nat A) C)) ((plus_plus_nat B) C))))
% 0.56/0.74 <<<_less__eqE,axiom,(
% 0.56/0.74 ! [A: nat,B: nat] :
% 0.56/0.74 ( ( ord_less_eq_nat @ A @ B )
% 0.56/0.74 => ~ !>>>!!!<<< [C3: nat] :
% 0.56/0.74 ( B
% 0.56/0.74 != ( plus_plus_nat @ A @ C3 ) ) ) )).
% 0.56/0.74
% 0.56/0.74 % less_eqE
% 0.56/0.74 >>>
% 0.56/0.74 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, 11, 22, 30, 36, 43, 50, 99, 113, 185, 229, 265, 285, 300, 221, 120, 187, 124]
% 0.56/0.74 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, LexToken(THF,'thf',1,30589), LexToken(LPAR,'(',1,30592), name, LexToken(COMMA,',',1,30611), formula_role, LexToken(COMMA,',',1,30617), LexToken(LPAR,'(',1,30618), thf_quantified_formula_PRE, thf_quantifier, LexToken(LBRACKET,'[',1,30626), thf_variable_list, LexToken(RBRACKET,']',1,30640), LexToken(COLON,':',1,30642), LexToken(LPAR,'(',1,30650), thf_unitary_formula, thf_pair_connective, unary_connective]
% 0.56/0.74 Unexpected exception Syntax error at '!':BANG
% 0.56/0.74 Traceback (most recent call last):
% 0.56/0.74 File "CASC.py", line 79, in <module>
% 0.56/0.74 problem=TPTP.TPTPproblem(env=environment,debug=1,file=file)
% 0.56/0.74 File "/export/starexec/sandbox/solver/bin/TPTP.py", line 38, in __init__
% 0.56/0.74 parser.parse(file.read(),debug=0,lexer=lexer)
% 0.56/0.74 File "/export/starexec/sandbox/solver/bin/ply/yacc.py", line 265, in parse
% 0.56/0.74 return self.parseopt_notrack(input,lexer,debug,tracking,tokenfunc)
% 0.56/0.74 File "/export/starexec/sandbox/solver/bin/ply/yacc.py", line 1047, in parseopt_notrack
% 0.56/0.74 tok = self.errorfunc(errtoken)
% 0.56/0.74 File "/export/starexec/sandbox/solver/bin/TPTPparser.py", line 2099, in p_error
% 0.56/0.74 raise TPTPParsingError("Syntax error at '%s':%s" % (t.value,t.type))
% 0.56/0.74 TPTPparser.TPTPParsingError: Syntax error at '!':BANG
%------------------------------------------------------------------------------