TSTP Solution File: SEV312^5 by cocATP---0.2.0
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- Process Solution
%------------------------------------------------------------------------------
% File : cocATP---0.2.0
% Problem : SEV312^5 : TPTP v6.1.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : python CASC.py /export/starexec/sandbox/benchmark/theBenchmark.p
% Computer : n107.star.cs.uiowa.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2609 0 2.40GHz
% Memory : 32286.75MB
% OS : Linux 2.6.32-431.20.3.el6.x86_64
% CPULimit : 300s
% DateTime : Thu Jul 17 13:34:02 EDT 2014
% Result : Timeout 300.10s
% Output : None
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----NO SOLUTION OUTPUT BY SYSTEM
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% % Problem : SEV312^5 : TPTP v6.1.0. Released v4.0.0.
% % Command : python CASC.py /export/starexec/sandbox/benchmark/theBenchmark.p
% % Computer : n107.star.cs.uiowa.edu
% % Model : x86_64 x86_64
% % CPU : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz
% % Memory : 32286.75MB
% % OS : Linux 2.6.32-431.20.3.el6.x86_64
% % CPULimit : 300
% % DateTime : Thu Jul 17 08:48:36 CDT 2014
% % CPUTime : 300.10
% Python 2.7.5
% Using paths ['/home/cristobal/cocATP/CASC/TPTP/', '/export/starexec/sandbox/benchmark/', '/export/starexec/sandbox/benchmark/']
% FOF formula (forall (K:((fofType->Prop)->(fofType->Prop))), (((and (forall (Xx:(fofType->Prop)) (Xy:(fofType->Prop)), ((forall (Xx0:fofType), ((Xx Xx0)->(Xy Xx0)))->(forall (Xx0:fofType), (((K Xx) Xx0)->((K Xy) Xx0)))))) (forall (Xx:(fofType->Prop)) (Xy:(fofType->Prop)), ((forall (Xx0:fofType), ((Xx Xx0)->(Xy Xx0)))->(forall (Xx0:fofType), (((K Xx) Xx0)->((K Xy) Xx0))))))->((ex (fofType->Prop)) (fun (Xu:(fofType->Prop))=> (forall (Xx:fofType), ((iff ((K Xu) Xx)) (Xu Xx))))))) of role conjecture named cTHM2_B_pme
% Conjecture to prove = (forall (K:((fofType->Prop)->(fofType->Prop))), (((and (forall (Xx:(fofType->Prop)) (Xy:(fofType->Prop)), ((forall (Xx0:fofType), ((Xx Xx0)->(Xy Xx0)))->(forall (Xx0:fofType), (((K Xx) Xx0)->((K Xy) Xx0)))))) (forall (Xx:(fofType->Prop)) (Xy:(fofType->Prop)), ((forall (Xx0:fofType), ((Xx Xx0)->(Xy Xx0)))->(forall (Xx0:fofType), (((K Xx) Xx0)->((K Xy) Xx0))))))->((ex (fofType->Prop)) (fun (Xu:(fofType->Prop))=> (forall (Xx:fofType), ((iff ((K Xu) Xx)) (Xu Xx))))))):Prop
% Parameter fofType_DUMMY:fofType.
% We need to prove ['(forall (K:((fofType->Prop)->(fofType->Prop))), (((and (forall (Xx:(fofType->Prop)) (Xy:(fofType->Prop)), ((forall (Xx0:fofType), ((Xx Xx0)->(Xy Xx0)))->(forall (Xx0:fofType), (((K Xx) Xx0)->((K Xy) Xx0)))))) (forall (Xx:(fofType->Prop)) (Xy:(fofType->Prop)), ((forall (Xx0:fofType), ((Xx Xx0)->(Xy Xx0)))->(forall (Xx0:fofType), (((K Xx) Xx0)->((K Xy) Xx0))))))->((ex (fofType->Prop)) (fun (Xu:(fofType->Prop))=> (forall (Xx:fofType), ((iff ((K Xu) Xx)) (Xu Xx)))))))']
% Parameter fofType:Type.
% Trying to prove (forall (K:((fofType->Prop)->(fofType->Prop))), (((and (forall (Xx:(fofType->Prop)) (Xy:(fofType->Prop)), ((forall (Xx0:fofType), ((Xx Xx0)->(Xy Xx0)))->(forall (Xx0:fofType), (((K Xx) Xx0)->((K Xy) Xx0)))))) (forall (Xx:(fofType->Prop)) (Xy:(fofType->Prop)), ((forall (Xx0:fofType), ((Xx Xx0)->(Xy Xx0)))->(forall (Xx0:fofType), (((K Xx) Xx0)->((K Xy) Xx0))))))->((ex (fofType->Prop)) (fun (Xu:(fofType->Prop))=> (forall (Xx:fofType), ((iff ((K Xu) Xx)) (Xu Xx)))))))
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x2 Xx)
% Instantiate: x2:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x3:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x3 as proof of ((K Xx0) Xx)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x1:(x0 Xx)
% Instantiate: x0:=(K Xx0):(fofType->Prop)
% Found x1 as proof of ((K Xx0) Xx)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx1):(fofType->Prop)
% Found x4 as proof of ((K Xx1) Xx00)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x4:(Xx0 Xx00)
% Instantiate: Xx0:=(K Xx01):(fofType->Prop)
% Found x4 as proof of ((K Xx01) Xx00)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x5:(Xx1 Xx000)
% Instantiate: Xx1:=(K Xx2):(fofType->Prop)
% Found x5 as proof of ((K Xx2) Xx000)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx2 Xx01)
% Instantiate: Xx2:=(K Xx3):(fofType->Prop)
% Found x6 as proof of ((K Xx3) Xx01)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x5:(Xx01 Xx000)
% Instantiate: Xx01:=(K Xx02):(fofType->Prop)
% Found x5 as proof of ((K Xx02) Xx000)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6 as proof of ((K Xx03) Xx001)
% Found x6:(Xx02 Xx001)
% Instantiate: Xx02:=(K Xx03):(fofType->Prop)
% Found x6
% EOF
%------------------------------------------------------------------------------