TSTP Solution File: SYO345^5 by cocATP---0.2.0
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : cocATP---0.2.0
% Problem : SYO345^5 : TPTP v7.5.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : python CASC.py /export/starexec/sandbox2/benchmark/theBenchmark.p
% Computer : n004.cluster.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory : 8042.1875MB
% OS : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit : 0s
% DateTime : Tue Mar 29 00:51:12 EDT 2022
% Result : Timeout 286.11s 286.52s
% Output : None
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.11/0.11 % Problem : SYO345^5 : TPTP v7.5.0. Released v4.0.0.
% 0.11/0.12 % Command : python CASC.py /export/starexec/sandbox2/benchmark/theBenchmark.p
% 0.11/0.33 % Computer : n004.cluster.edu
% 0.11/0.33 % Model : x86_64 x86_64
% 0.11/0.33 % CPUModel : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.11/0.33 % RAMPerCPU : 8042.1875MB
% 0.11/0.33 % OS : Linux 3.10.0-693.el7.x86_64
% 0.11/0.33 % CPULimit : 300
% 0.11/0.33 % DateTime : Sat Mar 12 05:21:40 EST 2022
% 0.11/0.33 % CPUTime :
% 0.11/0.33 ModuleCmd_Load.c(213):ERROR:105: Unable to locate a modulefile for 'python/python27'
% 0.11/0.34 Python 2.7.5
% 4.28/4.52 Using paths ['/home/cristobal/cocATP/CASC/TPTP/', '/export/starexec/sandbox2/benchmark/', '/export/starexec/sandbox2/benchmark/']
% 4.28/4.52 FOF formula (<kernel.Constant object at 0xc4dc68>, <kernel.DependentProduct object at 0xc74ef0>) of role type named cH
% 4.28/4.52 Using role type
% 4.28/4.52 Declaring cH:(Prop->fofType)
% 4.28/4.52 FOF formula (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH False)) of role conjecture named cTHM615
% 4.28/4.52 Conjecture to prove = (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH False)):Prop
% 4.28/4.52 Parameter fofType_DUMMY:fofType.
% 4.28/4.52 We need to prove ['(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH False))']
% 4.28/4.52 Parameter fofType:Type.
% 4.28/4.52 Parameter cH:(Prop->fofType).
% 4.28/4.52 Trying to prove (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH False))
% 4.28/4.52 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 4.28/4.52 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 4.28/4.52 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 4.28/4.52 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 4.28/4.52 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 4.28/4.52 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 4.28/4.52 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH False))
% 4.28/4.52 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 4.28/4.52 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 4.28/4.52 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 4.28/4.52 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 4.28/4.52 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 4.28/4.52 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 4.28/4.52 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 4.28/4.52 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 4.28/4.52 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 4.28/4.52 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 4.28/4.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 4.28/4.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 4.28/4.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 4.28/4.52 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 4.28/4.52 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 4.28/4.52 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 4.28/4.52 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 4.28/4.52 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 4.28/4.52 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 4.28/4.52 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 4.28/4.52 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 4.28/4.52 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 4.28/4.52 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 4.28/4.52 Found x2:(P (cH False))
% 4.28/4.52 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 4.28/4.52 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 4.28/4.52 Found x2:(P (cH False))
% 4.28/4.52 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 4.28/4.52 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 4.28/4.52 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 4.28/4.52 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 9.35/9.59 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 9.35/9.59 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 9.35/9.59 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 9.35/9.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 9.35/9.59 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 9.35/9.59 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 9.35/9.59 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 9.35/9.59 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 9.35/9.59 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 9.35/9.59 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found x2:(P False)
% 9.35/9.59 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 9.35/9.59 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 9.35/9.59 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 9.35/9.59 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 9.35/9.59 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 9.35/9.59 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 9.35/9.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 9.35/9.59 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 9.35/9.59 Found x2:(P False)
% 9.35/9.59 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 9.35/9.59 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 9.35/9.59 Found x:(P (cH (((eq fofType) (cH True)) (cH False))))
% 9.35/9.59 Instantiate: b:=(cH (((eq fofType) (cH True)) (cH False))):fofType
% 9.35/9.59 Found x as proof of (P0 b)
% 9.35/9.59 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 9.35/9.59 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 9.35/9.59 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 11.54/11.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 11.54/11.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 11.54/11.73 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 11.54/11.73 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 11.54/11.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 11.54/11.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 11.54/11.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 11.54/11.73 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 11.54/11.73 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 11.54/11.73 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 11.54/11.73 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 11.54/11.73 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 11.54/11.73 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 11.54/11.73 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 11.54/11.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 11.54/11.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 11.54/11.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 11.54/11.73 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 11.54/11.73 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 11.54/11.73 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 11.54/11.73 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 11.54/11.73 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 11.54/11.73 Found x:(P (cH (((eq fofType) (cH True)) (cH False))))
% 11.54/11.73 Instantiate: a:=(((eq fofType) (cH True)) (cH False)):Prop
% 11.54/11.73 Found x as proof of (P0 (cH a))
% 11.54/11.73 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 11.54/11.73 Found (eq_ref0 a) as proof of (((eq Prop) a) False)
% 11.54/11.73 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 11.54/11.73 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 11.54/11.73 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 11.54/11.73 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 11.54/11.73 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 11.54/11.73 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 11.54/11.73 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 11.54/11.73 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 11.54/11.73 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 11.54/11.73 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH False))
% 11.54/11.73 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 11.54/11.73 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 11.54/11.73 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 11.54/11.73 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 11.54/11.73 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 11.54/11.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 11.54/11.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 11.54/11.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 11.54/11.73 Found x:(P (cH False))
% 11.54/11.73 Instantiate: b:=(cH False):fofType
% 11.54/11.73 Found x as proof of (P0 b)
% 11.54/11.73 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 15.47/15.65 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 15.47/15.65 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 15.47/15.65 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 15.47/15.65 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 15.47/15.65 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 15.47/15.65 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 15.47/15.65 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 15.47/15.65 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 15.47/15.65 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 15.47/15.65 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 15.47/15.65 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 15.47/15.65 Found x as proof of (P0 b)
% 15.47/15.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 15.47/15.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 15.47/15.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 15.47/15.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 15.47/15.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 15.47/15.65 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 15.47/15.65 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 15.47/15.65 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 15.47/15.65 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 15.47/15.65 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 15.47/15.65 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 15.47/15.65 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH False))
% 15.47/15.65 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 15.47/15.65 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 15.47/15.65 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 15.47/15.65 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 15.47/15.65 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 15.47/15.65 Found x as proof of (P0 b)
% 15.47/15.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 15.47/15.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 15.47/15.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 15.47/15.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 15.47/15.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 15.47/15.65 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 15.47/15.65 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 15.47/15.65 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 15.47/15.65 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 15.47/15.65 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 15.47/15.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 15.47/15.65 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 15.47/15.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 15.47/15.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 15.47/15.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 15.47/15.65 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 15.47/15.65 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 17.75/17.99 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 17.75/17.99 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 17.75/17.99 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 17.75/17.99 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 17.75/17.99 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 17.75/17.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 17.75/17.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 17.75/17.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 17.75/17.99 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 17.75/17.99 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 17.75/17.99 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 17.75/17.99 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 17.75/17.99 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 17.75/17.99 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 17.75/17.99 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 17.75/17.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 17.75/17.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 17.75/17.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 17.75/17.99 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 17.75/17.99 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 17.75/17.99 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 17.75/17.99 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 17.75/17.99 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 17.75/17.99 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 17.75/17.99 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 17.75/17.99 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 17.75/17.99 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 17.75/17.99 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 17.75/17.99 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 17.75/17.99 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 17.75/17.99 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 17.75/17.99 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 17.75/17.99 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 17.75/17.99 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 17.75/17.99 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 17.75/17.99 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 17.75/17.99 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 17.75/17.99 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 17.75/17.99 Found x2:(P b)
% 17.75/17.99 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 17.75/17.99 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 17.75/17.99 Found x2:(P1 (cH False))
% 17.75/17.99 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P1 (cH False))
% 17.75/17.99 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P2 (cH False))
% 17.75/17.99 Found x:(P (cH False))
% 17.75/17.99 Instantiate: a:=False:Prop
% 17.75/17.99 Found x as proof of (P0 (cH a))
% 17.75/17.99 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 17.75/17.99 Found (eq_ref0 a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 17.75/17.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 17.75/17.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 17.75/17.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 17.75/17.99 Found x2:(P1 (cH False))
% 17.75/17.99 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P1 (cH False))
% 17.75/17.99 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P2 (cH False))
% 22.22/22.42 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 22.22/22.42 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 22.22/22.42 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 22.22/22.42 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 22.22/22.42 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 22.22/22.42 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 22.22/22.42 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 22.22/22.42 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 22.22/22.42 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 22.22/22.42 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 22.22/22.42 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 22.22/22.42 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 22.22/22.42 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 22.22/22.42 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 22.22/22.42 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 22.22/22.42 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 22.22/22.42 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 22.22/22.42 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 22.22/22.42 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 22.22/22.42 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 22.22/22.42 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 22.22/22.42 Found (eq_ref0 a) as proof of (((eq Prop) a) False)
% 22.22/22.42 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 22.22/22.42 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 22.22/22.42 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 22.22/22.42 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 22.22/22.42 Found (eq_ref0 a) as proof of (((eq Prop) a) True)
% 22.22/22.42 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 22.22/22.42 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 22.22/22.42 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 22.22/22.42 Found x:(P False)
% 22.22/22.42 Instantiate: b:=False:Prop
% 22.22/22.42 Found x as proof of (P0 b)
% 22.22/22.42 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 22.22/22.42 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 22.22/22.42 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 22.22/22.42 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 22.22/22.42 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 22.22/22.42 Found x3:(P (cH False))
% 22.22/22.42 Found (fun (x3:(P (cH False)))=> x3) as proof of (P (cH False))
% 22.22/22.42 Found (fun (x3:(P (cH False)))=> x3) as proof of (P0 (cH False))
% 22.22/22.42 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 22.22/22.42 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 22.22/22.42 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 22.22/22.42 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 22.22/22.42 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 22.22/22.42 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 22.22/22.42 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 22.22/22.42 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 22.22/22.42 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 22.22/22.42 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 22.22/22.42 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 22.22/22.42 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 22.22/22.42 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 22.22/22.42 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 27.86/28.05 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 27.86/28.05 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found x:(P False)
% 27.86/28.05 Instantiate: b:=False:Prop
% 27.86/28.05 Found x as proof of (P0 b)
% 27.86/28.05 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 27.86/28.05 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 27.86/28.05 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 27.86/28.05 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 27.86/28.05 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 27.86/28.05 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 27.86/28.05 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found x:(P False)
% 27.86/28.05 Instantiate: b:=False:Prop
% 27.86/28.05 Found x as proof of (P0 b)
% 27.86/28.05 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 27.86/28.05 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 27.86/28.05 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 27.86/28.05 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 27.86/28.05 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 27.86/28.05 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 27.86/28.05 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 27.86/28.05 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 27.86/28.05 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 27.86/28.05 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 27.86/28.05 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 27.86/28.05 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 27.86/28.05 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 27.86/28.05 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 27.86/28.05 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 27.86/28.05 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 27.86/28.05 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 31.01/31.22 Found x:(P False)
% 31.01/31.22 Instantiate: b:=False:Prop
% 31.01/31.22 Found x as proof of (P0 b)
% 31.01/31.22 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 31.01/31.22 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 31.01/31.22 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 31.01/31.22 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 31.01/31.22 Found x2:(P (cH False))
% 31.01/31.22 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 31.01/31.22 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 31.01/31.22 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 31.01/31.22 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 31.01/31.22 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 31.01/31.22 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 31.01/31.22 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 31.01/31.22 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 31.01/31.22 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 31.01/31.22 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 31.01/31.22 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 31.01/31.22 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 31.01/31.22 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 31.01/31.22 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 31.01/31.22 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 32.73/32.91 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 32.73/32.91 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 32.73/32.91 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 32.73/32.91 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 32.73/32.91 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 32.73/32.91 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 32.73/32.91 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 32.73/32.91 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 32.73/32.91 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 32.73/32.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 32.73/32.91 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 32.73/32.91 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 32.73/32.91 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 36.90/37.11 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 36.90/37.11 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 36.90/37.11 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 36.90/37.11 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 36.90/37.11 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH False))
% 36.90/37.11 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 36.90/37.11 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 36.90/37.11 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 36.90/37.11 Found x2:(P b)
% 36.90/37.11 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 36.90/37.11 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 36.90/37.11 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 36.90/37.11 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 36.90/37.11 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 36.90/37.11 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 36.90/37.11 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 36.90/37.11 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 36.90/37.11 Found (eq_ref0 b0) as proof of (((eq fofType) b0) b)
% 36.90/37.11 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 36.90/37.11 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 36.90/37.11 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 36.90/37.11 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 36.90/37.11 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 36.90/37.11 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 36.90/37.11 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 36.90/37.11 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found x2:(P1 False)
% 36.90/37.11 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 36.90/37.11 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 36.90/37.11 Found x2:(P1 False)
% 36.90/37.11 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 36.90/37.11 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 36.90/37.11 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 36.90/37.11 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 36.90/37.11 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 36.90/37.11 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 36.90/37.11 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 36.90/37.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 42.80/42.99 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found x2:(P1 False)
% 42.80/42.99 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 42.80/42.99 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 42.80/42.99 Found x2:(P1 False)
% 42.80/42.99 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 42.80/42.99 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 42.80/42.99 Found x2:(P1 False)
% 42.80/42.99 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 42.80/42.99 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 42.80/42.99 Found x2:(P b)
% 42.80/42.99 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 42.80/42.99 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 42.80/42.99 Found x3:(P False)
% 42.80/42.99 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 42.80/42.99 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 42.80/42.99 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 42.80/42.99 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 42.80/42.99 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 42.80/42.99 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 42.80/42.99 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 42.80/42.99 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 42.80/42.99 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 42.80/42.99 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 42.80/42.99 Found x3:(P False)
% 42.80/42.99 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 42.80/42.99 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 42.80/42.99 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 42.80/42.99 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 42.80/42.99 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 42.80/42.99 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 42.80/42.99 Found x2:(P (cH False))
% 42.80/42.99 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 42.80/42.99 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 42.80/42.99 Found x2:(P (cH False))
% 42.80/42.99 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 42.80/42.99 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 42.80/42.99 Found x2:(P1 False)
% 42.80/42.99 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 42.80/42.99 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 42.80/42.99 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 48.30/48.55 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 48.30/48.55 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 48.30/48.55 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 48.30/48.55 Found x:(P0 b)
% 48.30/48.55 Instantiate: b:=False:Prop
% 48.30/48.55 Found (fun (x:(P0 b))=> x) as proof of (P0 False)
% 48.30/48.55 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of ((P0 b)->(P0 False))
% 48.30/48.55 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of (P b)
% 48.30/48.55 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 48.30/48.55 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 48.30/48.55 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 48.30/48.55 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 48.30/48.55 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 48.30/48.55 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 48.30/48.55 Found x as proof of (P0 b)
% 48.30/48.55 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 48.30/48.55 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 48.30/48.55 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 48.30/48.55 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 48.30/48.55 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 48.30/48.55 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 48.30/48.55 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 48.30/48.55 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 48.30/48.55 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found x3:(P False)
% 48.30/48.55 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 48.30/48.55 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 48.30/48.55 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 48.30/48.55 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 48.30/48.55 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 48.30/48.55 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 48.30/48.55 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 48.30/48.55 Found x3:(P False)
% 48.30/48.55 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 48.30/48.55 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 48.30/48.55 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 48.30/48.55 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 50.48/50.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 50.48/50.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 50.48/50.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 50.48/50.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 50.48/50.69 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 50.48/50.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 50.48/50.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 50.48/50.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 50.48/50.69 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 50.48/50.69 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found x:(P0 b)
% 50.48/50.69 Instantiate: b:=False:Prop
% 50.48/50.69 Found (fun (x:(P0 b))=> x) as proof of (P0 False)
% 50.48/50.69 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of ((P0 b)->(P0 False))
% 50.48/50.69 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of (P b)
% 50.48/50.69 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 50.48/50.69 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 50.48/50.69 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 50.48/50.69 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 50.48/50.69 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 50.48/50.69 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 50.48/50.69 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 50.48/50.69 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 50.48/50.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 50.48/50.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 50.48/50.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 50.48/50.69 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 50.48/50.69 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 50.48/50.69 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 50.48/50.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 50.48/50.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 50.48/50.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 50.48/50.69 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 50.48/50.69 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 50.48/50.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 54.27/54.48 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 54.27/54.48 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 54.27/54.48 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 54.27/54.48 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 54.27/54.48 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 54.27/54.48 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 54.27/54.48 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 54.27/54.48 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 54.27/54.48 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 54.27/54.48 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 54.27/54.48 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 54.27/54.48 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 54.27/54.48 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 54.27/54.48 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 54.27/54.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 54.27/54.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 54.27/54.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 54.27/54.48 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 54.27/54.48 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 54.27/54.48 Found x as proof of (P0 b)
% 54.27/54.48 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 54.27/54.48 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 54.27/54.48 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 54.27/54.48 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 54.27/54.48 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 54.27/54.48 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 54.27/54.48 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH False))
% 54.27/54.48 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 54.27/54.48 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 54.27/54.48 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 54.27/54.48 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))))
% 54.27/54.48 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))) b)
% 54.27/54.48 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))) b)
% 54.27/54.48 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))) b)
% 54.27/54.48 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))) b)
% 54.27/54.48 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 54.27/54.48 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 54.27/54.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 54.27/54.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 54.27/54.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 54.27/54.48 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 54.27/54.48 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 54.27/54.48 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 54.27/54.48 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 54.27/54.48 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 54.27/54.48 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 54.27/54.48 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 54.27/54.48 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 54.27/54.48 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 54.27/54.48 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 54.27/54.48 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 58.92/59.15 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 58.92/59.15 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 58.92/59.15 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 58.92/59.15 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 58.92/59.15 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 58.92/59.15 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 58.92/59.15 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 58.92/59.15 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 58.92/59.15 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 58.92/59.15 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 58.92/59.15 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 58.92/59.15 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 58.92/59.15 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 58.92/59.15 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 58.92/59.15 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 58.92/59.15 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 58.92/59.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 58.92/59.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 58.92/59.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 58.92/59.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 58.92/59.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 58.92/59.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 58.92/59.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 58.92/59.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 58.92/59.15 Found x2:(P (cH False))
% 58.92/59.15 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 58.92/59.15 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 58.92/59.15 Found x2:(P (cH False))
% 58.92/59.15 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 58.92/59.15 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 58.92/59.15 Found x2:(P (cH False))
% 58.92/59.15 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 58.92/59.15 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 58.92/59.15 Found x2:(P (cH False))
% 58.92/59.15 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 58.92/59.15 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 58.92/59.15 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 58.92/59.15 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 58.92/59.15 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 58.92/59.15 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 58.92/59.15 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 58.92/59.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 58.92/59.15 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 58.92/59.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 58.92/59.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 58.92/59.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 58.92/59.15 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 58.92/59.15 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 58.92/59.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 58.92/59.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 58.92/59.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 58.92/59.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 58.92/59.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 58.92/59.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 58.92/59.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 58.92/59.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 58.92/59.15 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 63.47/63.69 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH False))
% 63.47/63.69 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 63.47/63.69 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 63.47/63.69 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 63.47/63.69 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 63.47/63.69 Found (eq_ref0 b) as proof of (((eq fofType) b) b0)
% 63.47/63.69 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 63.47/63.69 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 63.47/63.69 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 63.47/63.69 Found x2:(P b)
% 63.47/63.69 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 63.47/63.69 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 63.47/63.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 63.47/63.69 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 63.47/63.69 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 63.47/63.69 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 63.47/63.69 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 63.47/63.69 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 63.47/63.69 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 63.47/63.69 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 63.47/63.69 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 63.47/63.69 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 63.47/63.69 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 66.02/66.32 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 66.02/66.32 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 66.02/66.32 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 66.02/66.32 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 66.02/66.32 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 66.02/66.32 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 66.02/66.32 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 66.02/66.32 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 66.02/66.32 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 66.02/66.32 Found x2:(P b)
% 66.02/66.32 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 66.02/66.32 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 66.02/66.32 Found x2:(P b)
% 66.02/66.32 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 69.89/70.12 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 69.89/70.12 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 69.89/70.12 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 69.89/70.12 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 69.89/70.12 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 69.89/70.12 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 69.89/70.12 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 69.89/70.12 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 69.89/70.12 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 69.89/70.12 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 69.89/70.12 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 69.89/70.12 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 69.89/70.12 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 69.89/70.12 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 69.89/70.12 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 69.89/70.12 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 69.89/70.12 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 69.89/70.12 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 69.89/70.12 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 69.89/70.12 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 79.23/79.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 79.23/79.47 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 79.23/79.47 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 79.23/79.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 79.23/79.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 79.23/79.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 79.23/79.47 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 79.23/79.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 79.23/79.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 79.23/79.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 79.23/79.47 Found x2:(P b)
% 79.23/79.47 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 79.23/79.47 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 79.23/79.47 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 79.23/79.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 79.23/79.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 79.23/79.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 79.23/79.47 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 79.23/79.47 Found (eq_ref0 b0) as proof of (((eq Prop) b0) False)
% 79.23/79.47 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 79.23/79.47 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 79.23/79.47 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 79.23/79.47 Found x2:(P False)
% 79.23/79.47 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 79.23/79.47 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 79.23/79.47 Found x2:(P False)
% 79.23/79.47 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 79.23/79.47 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 79.23/79.47 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 79.23/79.47 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 79.23/79.47 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 79.23/79.47 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 79.23/79.47 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 79.23/79.47 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 79.23/79.47 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 79.23/79.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 81.42/81.69 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 81.42/81.69 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 81.42/81.69 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 81.42/81.69 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 81.42/81.69 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 81.42/81.69 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 81.42/81.69 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 81.42/81.69 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 81.42/81.69 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 81.42/81.69 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 81.42/81.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 81.42/81.69 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 81.42/81.69 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 85.93/86.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 85.93/86.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 85.93/86.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 85.93/86.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 85.93/86.18 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 85.93/86.18 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 85.93/86.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) False)
% 85.93/86.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 85.93/86.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 85.93/86.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 85.93/86.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 85.93/86.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 85.93/86.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 85.93/86.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 85.93/86.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 85.93/86.18 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 85.93/86.18 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 85.93/86.18 Found x2:(P False)
% 85.93/86.18 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 85.93/86.18 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 85.93/86.18 Found x2:(P False)
% 85.93/86.18 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 85.93/86.18 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 85.93/86.18 Found x2:(P False)
% 85.93/86.18 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 85.93/86.18 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 85.93/86.18 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 85.93/86.18 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 85.93/86.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 85.93/86.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 85.93/86.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 85.93/86.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 85.93/86.18 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 85.93/86.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 85.93/86.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 85.93/86.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 85.93/86.18 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 85.93/86.18 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 85.93/86.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 85.93/86.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 85.93/86.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 85.93/86.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 85.93/86.18 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 88.20/88.43 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 88.20/88.43 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 88.20/88.43 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 88.20/88.43 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 88.20/88.43 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 88.20/88.43 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 88.20/88.43 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 88.20/88.43 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 88.20/88.43 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 88.20/88.43 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 88.20/88.43 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 88.20/88.43 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found eq_ref000:=(eq_ref00 P):((P (((eq fofType) (cH True)) (cH False)))->(P (((eq fofType) (cH True)) (cH False))))
% 88.20/88.43 Found (eq_ref00 P) as proof of (P0 (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found ((eq_ref0 (((eq fofType) (cH True)) (cH False))) P) as proof of (P0 (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found (((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) P) as proof of (P0 (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found (((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) P) as proof of (P0 (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found x2:(P False)
% 88.20/88.43 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 88.20/88.43 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 88.20/88.43 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 88.20/88.43 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 88.20/88.43 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 88.20/88.43 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 88.20/88.43 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 88.20/88.43 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 88.20/88.43 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 88.20/88.43 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 88.20/88.43 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 88.20/88.43 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 88.20/88.43 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 88.20/88.43 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 88.20/88.43 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 88.20/88.43 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 88.20/88.43 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 88.20/88.43 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 88.20/88.43 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 88.20/88.43 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 88.20/88.43 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 93.47/93.74 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 93.47/93.74 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 93.47/93.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.47/93.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.47/93.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.47/93.74 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 93.47/93.74 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 93.47/93.74 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 93.47/93.74 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 93.47/93.74 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 93.47/93.74 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 93.47/93.74 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 93.47/93.74 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 93.47/93.74 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 93.47/93.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 93.47/93.74 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found x2:(P False)
% 93.47/93.74 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 93.47/93.74 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 93.47/93.74 Found x2:(P False)
% 93.47/93.74 Found (fun (x2:(P False))=> x2) as proof of (P False)
% 93.47/93.74 Found (fun (x2:(P False))=> x2) as proof of (P0 False)
% 93.47/93.74 Found eq_ref000:=(eq_ref00 P):((P (((eq fofType) (cH True)) (cH False)))->(P (((eq fofType) (cH True)) (cH False))))
% 93.47/93.74 Found (eq_ref00 P) as proof of (P0 (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found ((eq_ref0 (((eq fofType) (cH True)) (cH False))) P) as proof of (P0 (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found (((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) P) as proof of (P0 (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found (((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) P) as proof of (P0 (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 93.47/93.74 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 93.47/93.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 93.47/93.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 93.47/93.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 93.47/93.74 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))):(((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 93.47/93.74 Found (eq_ref0 (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) b)
% 93.47/93.74 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) b)
% 93.47/93.74 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) b)
% 93.47/93.74 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) b)
% 93.47/93.74 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 93.47/93.74 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 93.47/93.74 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 102.53/102.77 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 102.53/102.77 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 102.53/102.77 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 102.53/102.77 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 102.53/102.77 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 102.53/102.77 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 102.53/102.77 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 102.53/102.77 Found x:(P (cH (((eq fofType) (cH True)) (cH False))))
% 102.53/102.77 Instantiate: b:=(cH (((eq fofType) (cH True)) (cH False))):fofType
% 102.53/102.77 Found x as proof of (P0 b)
% 102.53/102.77 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 102.53/102.77 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 102.53/102.77 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 102.53/102.77 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 102.53/102.77 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 102.53/102.77 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 102.53/102.77 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 102.53/102.77 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 102.53/102.77 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 102.53/102.77 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 102.53/102.77 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))):(((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 102.53/102.77 Found (eq_ref0 (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) b)
% 102.53/102.77 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) b)
% 102.53/102.77 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) b)
% 102.53/102.77 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))) b)
% 102.53/102.77 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 102.53/102.77 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 102.53/102.77 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 102.53/102.77 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 102.53/102.77 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 102.53/102.77 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 102.53/102.77 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))))
% 102.53/102.77 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))))
% 102.53/102.77 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))))
% 102.53/102.77 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False))))))
% 102.53/102.77 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 102.53/102.77 Found (eq_ref0 b0) as proof of (((eq Prop) b0) False)
% 102.53/102.77 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 102.53/102.77 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 102.53/102.77 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 102.53/102.77 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 102.53/102.77 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 102.53/102.77 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 102.53/102.77 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 107.56/107.85 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 107.56/107.85 Found (eq_ref0 b0) as proof of (((eq Prop) b0) False)
% 107.56/107.85 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 107.56/107.85 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 107.56/107.85 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) False)
% 107.56/107.85 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 107.56/107.85 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b0)
% 107.56/107.85 Found x2:(P0 (cH False))
% 107.56/107.85 Found (fun (x2:(P0 (cH False)))=> x2) as proof of (P0 (cH False))
% 107.56/107.85 Found (fun (x2:(P0 (cH False)))=> x2) as proof of (P1 (cH False))
% 107.56/107.85 Found x2:(P0 (cH False))
% 107.56/107.85 Found (fun (x2:(P0 (cH False)))=> x2) as proof of (P0 (cH False))
% 107.56/107.85 Found (fun (x2:(P0 (cH False)))=> x2) as proof of (P1 (cH False))
% 107.56/107.85 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 107.56/107.85 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 107.56/107.85 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 107.56/107.85 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 107.56/107.85 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 107.56/107.85 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 107.56/107.85 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 107.56/107.85 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 107.56/107.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 112.79/113.09 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 112.79/113.09 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 112.79/113.09 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 112.79/113.09 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 112.79/113.09 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 112.79/113.09 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 112.79/113.09 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 112.79/113.09 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 112.79/113.09 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 112.79/113.09 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 112.79/113.09 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 114.97/115.25 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 114.97/115.25 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 114.97/115.25 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 114.97/115.25 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 114.97/115.25 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 114.97/115.25 Found x:(P (cH (((eq fofType) (cH True)) (cH False))))
% 114.97/115.25 Instantiate: a:=(((eq fofType) (cH True)) (cH False)):Prop
% 114.97/115.25 Found x as proof of (P0 (cH a))
% 114.97/115.25 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 114.97/115.25 Found (eq_ref0 a) as proof of (((eq Prop) a) False)
% 114.97/115.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 114.97/115.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 114.97/115.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 114.97/115.25 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 114.97/115.25 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 114.97/115.25 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 114.97/115.25 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 114.97/115.25 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 114.97/115.25 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 114.97/115.25 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH False))
% 114.97/115.25 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 114.97/115.25 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 114.97/115.25 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 114.97/115.25 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 114.97/115.25 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 114.97/115.25 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 114.97/115.25 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 114.97/115.25 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 114.97/115.25 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 114.97/115.25 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 114.97/115.25 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 114.97/115.25 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 114.97/115.25 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 114.97/115.25 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 114.97/115.25 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 114.97/115.25 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 114.97/115.25 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 114.97/115.25 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 114.97/115.25 Found x:(P (cH False))
% 114.97/115.25 Instantiate: b:=(cH False):fofType
% 114.97/115.25 Found x as proof of (P0 b)
% 114.97/115.25 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 114.97/115.25 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 114.97/115.25 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 114.97/115.25 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 114.97/115.25 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 114.97/115.25 Found x:(P (cH False))
% 114.97/115.25 Instantiate: b:=(cH False):fofType
% 114.97/115.25 Found x as proof of (P0 b)
% 124.59/124.86 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 124.59/124.86 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 124.59/124.86 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 124.59/124.86 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 124.59/124.86 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 124.59/124.86 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 124.59/124.86 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 124.59/124.86 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 124.59/124.86 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 124.59/124.86 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 124.59/124.86 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 124.59/124.86 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 124.59/124.86 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 124.59/124.86 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 124.59/124.86 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 124.59/124.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 124.59/124.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 124.59/124.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 124.59/124.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 124.59/124.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 124.59/124.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 124.59/124.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 124.59/124.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 124.59/124.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 124.59/124.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 124.59/124.86 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 124.59/124.86 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 124.59/124.86 Found x as proof of (P0 b)
% 124.59/124.86 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 124.59/124.86 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 124.59/124.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 124.59/124.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 124.59/124.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 124.59/124.86 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 124.59/124.86 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 124.59/124.86 Found x as proof of (P0 b)
% 124.59/124.86 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 124.59/124.86 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 124.59/124.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 124.59/124.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 124.59/124.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 124.59/124.86 Found x:(P (cH (((eq fofType) (cH True)) (cH False))))
% 124.59/124.86 Instantiate: a:=(cH (((eq fofType) (cH True)) (cH False))):fofType
% 124.59/124.86 Found x as proof of (P0 a)
% 124.59/124.86 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 124.59/124.86 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH False))
% 124.59/124.86 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 124.59/124.86 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 124.59/124.86 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH False))
% 124.59/124.86 Found eq_ref00:=(eq_ref0 a):(((eq fofType) a) a)
% 124.59/124.86 Found (eq_ref0 a) as proof of (((eq fofType) a) b)
% 124.59/124.86 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 124.59/124.86 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 124.59/124.86 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 124.59/124.86 Found eq_ref00:=(eq_ref0 a):(((eq fofType) a) a)
% 124.59/124.86 Found (eq_ref0 a) as proof of (((eq fofType) a) b)
% 124.59/124.86 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 124.59/124.86 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 124.59/124.86 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 124.59/124.86 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 134.18/134.46 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 134.18/134.46 Found x as proof of (P0 b)
% 134.18/134.46 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 134.18/134.46 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 134.18/134.46 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 134.18/134.46 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 134.18/134.46 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 134.18/134.46 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 134.18/134.46 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 134.18/134.46 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 134.18/134.46 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 134.18/134.46 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 134.18/134.46 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 134.18/134.46 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH False))
% 134.18/134.46 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 134.18/134.46 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 134.18/134.46 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 134.18/134.46 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 134.18/134.46 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 134.18/134.46 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 134.18/134.46 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 134.18/134.46 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 134.18/134.46 Found x:(P1 (cH False))
% 134.18/134.46 Instantiate: b:=(cH False):fofType
% 134.18/134.46 Found x as proof of (P2 b)
% 134.18/134.46 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 134.18/134.46 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 134.18/134.46 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 134.18/134.46 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 134.18/134.46 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b)
% 134.18/134.46 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 134.18/134.46 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 134.18/134.46 Found x as proof of (P0 b)
% 134.18/134.46 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 134.18/134.46 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 134.18/134.46 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 134.18/134.46 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 134.18/134.46 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 134.18/134.46 Found eq_ref000:=(eq_ref00 P1):((P1 (cH False))->(P1 (cH False)))
% 134.18/134.46 Found (eq_ref00 P1) as proof of (P2 (cH False))
% 134.18/134.46 Found ((eq_ref0 (cH False)) P1) as proof of (P2 (cH False))
% 134.18/134.46 Found (((eq_ref fofType) (cH False)) P1) as proof of (P2 (cH False))
% 134.18/134.46 Found (((eq_ref fofType) (cH False)) P1) as proof of (P2 (cH False))
% 134.18/134.46 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 134.18/134.46 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 134.18/134.46 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 134.18/134.46 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 134.18/134.46 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 134.18/134.46 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 135.96/136.24 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 135.96/136.24 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 135.96/136.24 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 135.96/136.24 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 135.96/136.24 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 135.96/136.24 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 135.96/136.24 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 135.96/136.24 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 135.96/136.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 135.96/136.24 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 135.96/136.24 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 137.88/138.16 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 137.88/138.16 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 137.88/138.16 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 137.88/138.16 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 137.88/138.16 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 137.88/138.16 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 137.88/138.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 137.88/138.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 137.88/138.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 137.88/138.16 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 137.88/138.16 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 137.88/138.16 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 137.88/138.16 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 137.88/138.16 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 137.88/138.16 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 137.88/138.16 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 137.88/138.16 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 137.88/138.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 137.88/138.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 137.88/138.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 137.88/138.16 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 137.88/138.16 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 137.88/138.16 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 137.88/138.16 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 137.88/138.16 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 137.88/138.16 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 137.88/138.16 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 137.88/138.16 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 137.88/138.16 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 137.88/138.16 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 137.88/138.16 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 137.88/138.16 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 137.88/138.16 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 137.88/138.16 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 137.88/138.16 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 142.77/143.06 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 142.77/143.06 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 142.77/143.06 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 142.77/143.06 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 142.77/143.06 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 142.77/143.06 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 142.77/143.06 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 142.77/143.06 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 142.77/143.06 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 142.77/143.06 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 142.77/143.06 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 142.77/143.06 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 142.77/143.06 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 142.77/143.06 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 142.77/143.06 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 142.77/143.06 Found x2:(P b)
% 142.77/143.06 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 142.77/143.06 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 142.77/143.06 Found x2:(P b)
% 142.77/143.06 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 142.77/143.06 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 142.77/143.06 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 142.77/143.06 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 142.77/143.06 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 142.77/143.06 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 142.77/143.06 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 142.77/143.06 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 142.77/143.06 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 142.77/143.06 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 142.77/143.06 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 142.77/143.06 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 142.77/143.06 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 142.77/143.06 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 142.77/143.06 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 142.77/143.06 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 142.77/143.06 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 142.77/143.06 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 142.77/143.06 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 142.77/143.06 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 142.77/143.06 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 142.77/143.06 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 142.77/143.06 Found x:(P (cH False))
% 142.77/143.06 Instantiate: a:=False:Prop
% 142.77/143.06 Found x as proof of (P0 (cH a))
% 142.77/143.06 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 142.77/143.06 Found (eq_ref0 a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 142.77/143.06 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 142.77/143.06 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 142.77/143.06 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 142.77/143.06 Found x2:(P1 (cH False))
% 142.77/143.06 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P1 (cH False))
% 142.77/143.06 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P2 (cH False))
% 142.77/143.06 Found x2:(P1 (cH False))
% 142.77/143.06 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P1 (cH False))
% 142.77/143.06 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P2 (cH False))
% 142.77/143.06 Found x:(P (cH False))
% 142.77/143.06 Instantiate: a:=False:Prop
% 142.77/143.06 Found x as proof of (P0 (cH a))
% 142.77/143.06 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 142.77/143.06 Found (eq_ref0 a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 152.97/153.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 152.97/153.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 152.97/153.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 152.97/153.25 Found x2:(P1 (cH False))
% 152.97/153.25 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P1 (cH False))
% 152.97/153.25 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P2 (cH False))
% 152.97/153.25 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 152.97/153.25 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 152.97/153.25 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 152.97/153.25 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 152.97/153.25 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 152.97/153.25 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 152.97/153.25 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 152.97/153.25 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 152.97/153.25 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 152.97/153.25 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 152.97/153.25 Found x2:(P1 (cH False))
% 152.97/153.25 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P1 (cH False))
% 152.97/153.25 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P2 (cH False))
% 152.97/153.25 Found x:(P b)
% 152.97/153.25 Instantiate: b0:=b:fofType
% 152.97/153.25 Found x as proof of (P0 b0)
% 152.97/153.25 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 152.97/153.25 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 152.97/153.25 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 152.97/153.25 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 152.97/153.25 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 152.97/153.25 Found x:(P1 (((eq fofType) (cH True)) (cH False)))
% 152.97/153.25 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 152.97/153.25 Found x as proof of (P2 b)
% 152.97/153.25 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 152.97/153.25 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found x:(P1 (((eq fofType) (cH True)) (cH False)))
% 152.97/153.25 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 152.97/153.25 Found x as proof of (P2 b)
% 152.97/153.25 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 152.97/153.25 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 152.97/153.25 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 152.97/153.25 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 152.97/153.25 Instantiate: a:=(((eq fofType) (cH True)) (cH False)):Prop
% 152.97/153.25 Found x as proof of (P0 a)
% 152.97/153.25 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 152.97/153.25 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 152.97/153.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 152.97/153.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 152.97/153.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 152.97/153.25 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 152.97/153.25 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 152.97/153.25 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 152.97/153.25 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 152.97/153.25 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 152.97/153.25 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 152.97/153.25 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 152.97/153.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 152.97/153.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 152.97/153.25 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 156.30/156.61 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 156.30/156.61 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 156.30/156.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 156.30/156.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 156.30/156.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 156.30/156.61 Found eq_ref000:=(eq_ref00 P1):((P1 (cH False))->(P1 (cH False)))
% 156.30/156.61 Found (eq_ref00 P1) as proof of (P2 (cH False))
% 156.30/156.61 Found ((eq_ref0 (cH False)) P1) as proof of (P2 (cH False))
% 156.30/156.61 Found (((eq_ref fofType) (cH False)) P1) as proof of (P2 (cH False))
% 156.30/156.61 Found (((eq_ref fofType) (cH False)) P1) as proof of (P2 (cH False))
% 156.30/156.61 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 156.30/156.61 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 156.30/156.61 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 156.30/156.61 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 156.30/156.61 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 156.30/156.61 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 156.30/156.61 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH False))
% 156.30/156.61 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 156.30/156.61 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 156.30/156.61 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 156.30/156.61 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 156.30/156.61 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 156.30/156.61 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 156.30/156.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 156.30/156.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 156.30/156.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 156.30/156.61 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 156.30/156.61 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 156.30/156.61 Found (eq_ref0 a) as proof of (((eq Prop) a) True)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 156.30/156.61 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 156.30/156.61 Found (eq_ref0 a) as proof of (((eq Prop) a) False)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 156.30/156.61 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 156.30/156.61 Found (eq_ref0 a) as proof of (((eq Prop) a) True)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 156.30/156.61 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 156.30/156.61 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 156.30/156.61 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 156.30/156.61 Found (eq_ref0 a) as proof of (((eq Prop) a) False)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 156.30/156.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 158.37/158.73 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 158.37/158.73 Found x3:(P (cH False))
% 158.37/158.73 Found (fun (x3:(P (cH False)))=> x3) as proof of (P (cH False))
% 158.37/158.73 Found (fun (x3:(P (cH False)))=> x3) as proof of (P0 (cH False))
% 158.37/158.73 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 158.37/158.73 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 158.37/158.73 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 158.37/158.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 158.37/158.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 158.37/158.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 158.37/158.73 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 158.37/158.73 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 158.37/158.73 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 158.37/158.73 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 158.37/158.73 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 158.37/158.73 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 158.37/158.73 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 158.37/158.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 158.37/158.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 158.37/158.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 158.37/158.73 Found x:(P False)
% 158.37/158.73 Instantiate: b:=False:Prop
% 158.37/158.73 Found x as proof of (P0 b)
% 158.37/158.73 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 158.37/158.73 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 158.37/158.73 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 158.37/158.73 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 158.37/158.73 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 158.37/158.73 Found x3:(P (cH False))
% 158.37/158.73 Found (fun (x3:(P (cH False)))=> x3) as proof of (P (cH False))
% 158.37/158.73 Found (fun (x3:(P (cH False)))=> x3) as proof of (P0 (cH False))
% 158.37/158.73 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 158.37/158.73 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 158.37/158.73 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 158.37/158.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 158.37/158.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 158.37/158.73 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 158.37/158.73 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 158.37/158.73 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 158.37/158.73 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 161.93/162.21 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 161.93/162.21 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 161.93/162.21 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 161.93/162.21 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 161.93/162.21 Found x:(P False)
% 161.93/162.21 Instantiate: b:=False:Prop
% 161.93/162.21 Found x as proof of (P0 b)
% 161.93/162.21 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 161.93/162.21 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found x:(P False)
% 161.93/162.21 Instantiate: b:=False:Prop
% 161.93/162.21 Found x as proof of (P0 b)
% 161.93/162.21 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 161.93/162.21 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found x:(P (cH False))
% 161.93/162.21 Instantiate: a:=(cH False):fofType
% 161.93/162.21 Found x as proof of (P0 a)
% 161.93/162.21 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 161.93/162.21 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 161.93/162.21 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 161.93/162.21 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 161.93/162.21 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 161.93/162.21 Found eq_ref00:=(eq_ref0 a):(((eq fofType) a) a)
% 161.93/162.21 Found (eq_ref0 a) as proof of (((eq fofType) a) b)
% 161.93/162.21 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 161.93/162.21 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 161.93/162.21 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 161.93/162.21 Found eq_ref00:=(eq_ref0 a):(((eq fofType) a) a)
% 161.93/162.21 Found (eq_ref0 a) as proof of (((eq fofType) a) b)
% 161.93/162.21 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 161.93/162.21 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 161.93/162.21 Found ((eq_ref fofType) a) as proof of (((eq fofType) a) b)
% 161.93/162.21 Found x:(P False)
% 161.93/162.21 Instantiate: b:=False:Prop
% 161.93/162.21 Found x as proof of (P0 b)
% 161.93/162.21 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 161.93/162.21 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 161.93/162.21 Found x:(P b)
% 161.93/162.21 Found x as proof of (P0 (cH (((eq fofType) (cH True)) (cH False))))
% 161.93/162.21 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 161.93/162.21 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 161.93/162.21 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 167.38/167.67 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 167.38/167.67 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 167.38/167.67 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH False))
% 167.38/167.67 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 167.38/167.67 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 167.38/167.67 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 167.38/167.67 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 167.38/167.67 Found (eq_ref0 b0) as proof of (((eq fofType) b0) b)
% 167.38/167.67 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 167.38/167.67 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 167.38/167.67 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 167.38/167.67 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 167.38/167.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 167.38/167.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 167.38/167.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 167.38/167.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 167.38/167.67 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 167.38/167.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 167.38/167.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 167.38/167.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH (((eq fofType) (cH True)) (cH False)))))
% 167.38/167.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 167.38/167.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 167.38/167.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 167.38/167.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 167.38/167.67 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 167.38/167.67 Instantiate: a:=(((eq fofType) (cH True)) (cH False)):Prop
% 167.38/167.67 Found x as proof of (P0 a)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 167.38/167.67 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 167.38/167.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 167.38/167.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 167.38/167.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 167.38/167.67 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 167.38/167.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 167.38/167.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 167.38/167.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 167.38/167.67 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 167.38/167.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 167.38/167.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 167.38/167.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 167.38/167.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 167.38/167.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 169.28/169.57 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 169.28/169.57 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 169.28/169.57 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 169.28/169.57 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 169.28/169.57 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 169.28/169.57 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 169.28/169.57 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 169.28/169.57 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 169.28/169.57 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 169.28/169.57 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 169.28/169.57 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 169.28/169.57 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 169.28/169.57 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 169.28/169.57 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 169.28/169.57 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 169.28/169.57 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 169.28/169.57 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 169.28/169.57 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 169.28/169.57 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 169.28/169.57 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 169.28/169.57 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 169.28/169.57 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 169.28/169.57 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 169.28/169.57 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 169.28/169.57 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 169.28/169.57 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH False))
% 169.28/169.57 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 169.28/169.57 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 169.28/169.57 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 169.28/169.57 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 169.28/169.57 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 169.28/169.57 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 169.28/169.57 Found x:(P False)
% 169.28/169.57 Instantiate: b:=False:Prop
% 169.28/169.57 Found x as proof of (P0 b)
% 169.28/169.57 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 169.28/169.57 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 169.28/169.57 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 169.28/169.57 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 173.34/173.63 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 173.34/173.63 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 173.34/173.63 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 173.34/173.63 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 173.34/173.63 Found x:(P False)
% 173.34/173.63 Instantiate: b:=False:Prop
% 173.34/173.63 Found x as proof of (P0 b)
% 173.34/173.63 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 173.34/173.63 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found x:(P False)
% 173.34/173.63 Instantiate: b:=False:Prop
% 173.34/173.63 Found x as proof of (P0 b)
% 173.34/173.63 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 173.34/173.63 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 173.34/173.63 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 173.34/173.63 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 173.34/173.63 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 173.34/173.63 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 173.34/173.63 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 173.34/173.63 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 173.34/173.63 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 173.34/173.63 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 173.34/173.63 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 173.34/173.63 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 173.34/173.63 Found x:(P False)
% 173.34/173.63 Instantiate: b:=False:Prop
% 173.34/173.63 Found x as proof of (P0 b)
% 173.34/173.63 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 173.34/173.63 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 173.34/173.63 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 184.90/185.24 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 184.90/185.24 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 184.90/185.24 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 184.90/185.24 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 184.90/185.24 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 184.90/185.24 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 184.90/185.24 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 184.90/185.24 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 184.90/185.24 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 184.90/185.24 Found x:(P False)
% 184.90/185.24 Instantiate: b:=False:Prop
% 184.90/185.24 Found x as proof of (P0 b)
% 184.90/185.24 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 184.90/185.24 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 184.90/185.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 184.90/185.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 184.90/185.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 184.90/185.24 Found x2:(P0 False)
% 184.90/185.24 Found (fun (x2:(P0 False))=> x2) as proof of (P0 False)
% 184.90/185.24 Found (fun (x2:(P0 False))=> x2) as proof of (P1 False)
% 184.90/185.24 Found x:(P False)
% 184.90/185.24 Instantiate: b:=False:Prop
% 184.90/185.24 Found x as proof of (P0 b)
% 184.90/185.24 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 184.90/185.24 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 184.90/185.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 184.90/185.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 184.90/185.24 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 184.90/185.24 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 184.90/185.24 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 184.90/185.24 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 184.90/185.24 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 184.90/185.24 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 184.90/185.24 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 184.90/185.24 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 184.90/185.24 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 184.90/185.24 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 184.90/185.24 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 184.90/185.24 Found x2:(P1 b)
% 184.90/185.24 Found (fun (x2:(P1 b))=> x2) as proof of (P1 b)
% 184.90/185.24 Found (fun (x2:(P1 b))=> x2) as proof of (P2 b)
% 184.90/185.24 Found eq_ref000:=(eq_ref00 P1):((P1 a)->(P1 a))
% 184.90/185.24 Found (eq_ref00 P1) as proof of (P2 a)
% 184.90/185.24 Found ((eq_ref0 a) P1) as proof of (P2 a)
% 184.90/185.24 Found (((eq_ref Prop) a) P1) as proof of (P2 a)
% 184.90/185.24 Found (((eq_ref Prop) a) P1) as proof of (P2 a)
% 184.90/185.24 Found x:(P1 (cH False))
% 184.90/185.24 Instantiate: a:=False:Prop
% 184.90/185.24 Found x as proof of (P2 (cH a))
% 184.90/185.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 184.90/185.24 Found (eq_ref0 a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 184.90/185.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 184.90/185.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 184.90/185.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) (((eq fofType) (cH True)) (cH False)))
% 184.90/185.24 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 198.12/198.47 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 198.12/198.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 198.12/198.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 198.12/198.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 198.12/198.47 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 198.12/198.47 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 198.12/198.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 198.12/198.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 198.12/198.47 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 198.12/198.47 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 198.12/198.47 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 198.12/198.47 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 198.12/198.47 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 198.12/198.47 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 198.12/198.47 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 198.12/198.47 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 198.12/198.47 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 198.12/198.47 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 198.12/198.47 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 198.12/198.47 Found x:(P False)
% 198.12/198.47 Instantiate: b:=False:Prop
% 198.12/198.47 Found x as proof of (P0 b)
% 198.12/198.47 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 198.12/198.47 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 198.12/198.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 198.12/198.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 198.12/198.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 198.12/198.47 Found x:(P False)
% 198.12/198.47 Instantiate: b:=False:Prop
% 198.12/198.47 Found x as proof of (P0 b)
% 198.12/198.47 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 198.12/198.47 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 198.12/198.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 198.12/198.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 198.12/198.47 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 198.12/198.47 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 198.12/198.47 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 198.12/198.47 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 198.12/198.47 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 198.12/198.47 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 198.12/198.47 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 198.12/198.47 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 198.12/198.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 198.12/198.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 198.12/198.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 198.12/198.47 Found x2:(P b)
% 198.12/198.47 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 198.12/198.47 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 198.12/198.47 Found x2:(P (cH False))
% 198.12/198.47 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 198.12/198.47 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 198.12/198.47 Found x:(P b)
% 198.12/198.47 Instantiate: a:=(((eq fofType) (cH True)) (cH False)):Prop
% 198.12/198.47 Found x as proof of (P0 (cH a))
% 198.12/198.47 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 198.12/198.47 Found (eq_ref0 a) as proof of (((eq Prop) a) False)
% 198.12/198.47 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 198.12/198.47 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 198.12/198.47 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 198.12/198.47 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 198.12/198.47 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 198.12/198.47 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 199.60/199.95 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 199.60/199.95 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.60/199.95 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.60/199.95 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 199.60/199.95 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.60/199.95 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 199.60/199.95 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 199.60/199.95 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.60/199.95 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 199.60/199.95 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 199.60/199.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.60/199.95 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 199.60/199.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.60/199.95 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 200.83/201.18 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 200.83/201.18 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 200.83/201.18 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 200.83/201.18 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 200.83/201.18 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 200.83/201.18 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 200.83/201.18 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 200.83/201.18 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 200.83/201.18 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 200.83/201.18 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 200.83/201.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 200.83/201.18 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 200.83/201.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 202.53/202.86 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.53/202.86 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 202.53/202.86 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.53/202.86 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 202.53/202.86 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.53/202.86 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.53/202.86 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 202.53/202.86 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.53/202.86 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 202.53/202.86 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 202.53/202.86 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 202.53/202.86 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 202.53/202.86 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 202.53/202.86 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 202.53/202.86 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 202.53/202.86 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 202.53/202.86 Found x:(P0 b0)
% 202.53/202.86 Instantiate: b0:=(cH (((eq fofType) (cH True)) (cH False))):fofType
% 202.53/202.86 Found (fun (x:(P0 b0))=> x) as proof of (P0 b)
% 202.53/202.86 Found (fun (P0:(fofType->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 b))
% 204.74/205.07 Found (fun (P0:(fofType->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 204.74/205.07 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 204.74/205.07 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 204.74/205.07 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 204.74/205.07 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 204.74/205.07 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 204.74/205.07 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 204.74/205.07 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 204.74/205.07 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 204.74/205.07 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 204.74/205.07 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 204.74/205.07 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 204.74/205.07 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 204.74/205.07 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 204.74/205.07 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 204.74/205.07 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 206.32/206.67 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 206.32/206.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 206.32/206.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 206.32/206.67 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 206.32/206.67 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 206.32/206.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 206.32/206.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 206.32/206.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 206.32/206.67 Found x:(P0 b0)
% 206.32/206.67 Instantiate: b0:=(cH (((eq fofType) (cH True)) (cH False))):fofType
% 206.32/206.67 Found (fun (x:(P0 b0))=> x) as proof of (P0 b)
% 206.32/206.67 Found (fun (P0:(fofType->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 b))
% 206.32/206.67 Found (fun (P0:(fofType->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 206.32/206.67 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 206.32/206.67 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 206.32/206.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 206.32/206.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 206.32/206.67 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 206.32/206.67 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b1)
% 206.32/206.67 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b1)
% 206.32/206.67 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b1)
% 206.32/206.67 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b1)
% 206.32/206.67 Found eq_ref00:=(eq_ref0 b1):(((eq fofType) b1) b1)
% 206.32/206.67 Found (eq_ref0 b1) as proof of (((eq fofType) b1) (cH False))
% 206.32/206.67 Found ((eq_ref fofType) b1) as proof of (((eq fofType) b1) (cH False))
% 206.32/206.67 Found ((eq_ref fofType) b1) as proof of (((eq fofType) b1) (cH False))
% 206.32/206.67 Found ((eq_ref fofType) b1) as proof of (((eq fofType) b1) (cH False))
% 206.32/206.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 207.32/207.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 207.32/207.65 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 207.32/207.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 207.32/207.65 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 207.32/207.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 207.32/207.65 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 207.32/207.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 207.32/207.65 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 207.32/207.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 207.32/207.65 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 207.32/207.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 207.32/207.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 207.32/207.65 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 207.32/207.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 211.96/212.29 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 211.96/212.29 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 211.96/212.29 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 211.96/212.29 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 211.96/212.29 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 211.96/212.29 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 211.96/212.29 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 211.96/212.29 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 211.96/212.29 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 211.96/212.29 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 211.96/212.29 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 211.96/212.29 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 211.96/212.29 Found x2:(P b)
% 211.96/212.29 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 211.96/212.29 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 211.96/212.29 Found x2:(P b)
% 211.96/212.29 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 211.96/212.29 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 211.96/212.29 Found x2:(P b)
% 211.96/212.29 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 211.96/212.29 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 211.96/212.29 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 211.96/212.29 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found x:(P (cH False))
% 211.96/212.29 Instantiate: b0:=(cH False):fofType
% 211.96/212.29 Found x as proof of (P0 b0)
% 211.96/212.29 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 211.96/212.29 Found (eq_ref0 b) as proof of (((eq fofType) b) b0)
% 211.96/212.29 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 211.96/212.29 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 211.96/212.29 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 211.96/212.29 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 211.96/212.29 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found x:(P (cH False))
% 211.96/212.29 Instantiate: b0:=(cH False):fofType
% 211.96/212.29 Found x as proof of (P0 b0)
% 211.96/212.29 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 211.96/212.29 Found (eq_ref0 b) as proof of (((eq fofType) b) b0)
% 211.96/212.29 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 211.96/212.29 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 211.96/212.29 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 211.96/212.29 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 211.96/212.29 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 211.96/212.29 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 211.96/212.29 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 211.96/212.29 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 211.96/212.29 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 211.96/212.29 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 211.96/212.29 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 211.96/212.29 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 211.96/212.29 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 211.96/212.29 Found x2:(P b)
% 211.96/212.29 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 211.96/212.29 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 211.96/212.29 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 211.96/212.29 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 211.96/212.29 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 214.05/214.38 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 214.05/214.38 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 214.05/214.38 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 214.05/214.38 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 214.05/214.38 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 214.05/214.38 Found (eq_ref0 a) as proof of (((eq Prop) a) False)
% 214.05/214.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 214.05/214.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 214.05/214.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) False)
% 214.05/214.38 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 214.05/214.38 Found (eq_ref0 a) as proof of (((eq Prop) a) True)
% 214.05/214.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 214.05/214.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 214.05/214.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) True)
% 214.05/214.38 Found x3:(P1 (cH False))
% 214.05/214.38 Found (fun (x3:(P1 (cH False)))=> x3) as proof of (P1 (cH False))
% 214.05/214.38 Found (fun (x3:(P1 (cH False)))=> x3) as proof of (P2 (cH False))
% 214.05/214.38 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 214.05/214.38 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 214.05/214.38 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 214.05/214.38 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 214.05/214.38 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 214.05/214.38 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 214.05/214.38 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 214.05/214.38 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 214.05/214.38 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 214.05/214.38 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 214.05/214.38 Found (eq_ref0 b0) as proof of (((eq fofType) b0) b)
% 214.05/214.38 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 214.05/214.38 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 214.05/214.38 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 214.05/214.38 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 214.05/214.38 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 214.05/214.38 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 221.89/222.27 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 221.89/222.27 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 221.89/222.27 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 221.89/222.27 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 221.89/222.27 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 221.89/222.27 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 221.89/222.27 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 221.89/222.27 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 221.89/222.27 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 221.89/222.27 Found (eq_ref0 b0) as proof of (((eq fofType) b0) b)
% 221.89/222.27 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 221.89/222.27 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 221.89/222.27 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 221.89/222.27 Found x2:(P0 False)
% 221.89/222.27 Found (fun (x2:(P0 False))=> x2) as proof of (P0 False)
% 221.89/222.27 Found (fun (x2:(P0 False))=> x2) as proof of (P1 False)
% 221.89/222.27 Found x:(P1 False)
% 221.89/222.27 Instantiate: b:=False:Prop
% 221.89/222.27 Found x as proof of (P2 b)
% 221.89/222.27 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 221.89/222.27 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found x:(P1 False)
% 221.89/222.27 Instantiate: b:=False:Prop
% 221.89/222.27 Found x as proof of (P2 b)
% 221.89/222.27 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 221.89/222.27 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found x:(P1 False)
% 221.89/222.27 Instantiate: b:=False:Prop
% 221.89/222.27 Found x as proof of (P2 b)
% 221.89/222.27 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 221.89/222.27 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 221.89/222.27 Found x:(P b)
% 221.89/222.27 Instantiate: b0:=b:Prop
% 224.87/225.28 Found x as proof of (P0 b0)
% 224.87/225.28 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 224.87/225.28 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 224.87/225.28 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 224.87/225.28 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 224.87/225.28 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 224.87/225.28 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 224.87/225.28 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 224.87/225.28 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (P (cH (((eq fofType) (cH True)) (cH False))))
% 224.87/225.28 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (P (cH (((eq fofType) (cH True)) (cH False))))
% 224.87/225.28 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (P (cH (((eq fofType) (cH True)) (cH False))))
% 224.87/225.28 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 224.87/225.28 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH False))
% 224.87/225.28 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 224.87/225.28 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 224.87/225.28 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 224.87/225.28 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 224.87/225.28 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 224.87/225.28 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 224.87/225.28 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 224.87/225.28 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 224.87/225.28 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 224.87/225.28 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 224.87/225.28 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 224.87/225.28 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 224.87/225.28 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 226.80/227.20 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 226.80/227.20 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 226.80/227.20 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 226.80/227.20 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 226.80/227.20 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 226.80/227.20 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 226.80/227.20 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 226.80/227.20 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 226.80/227.20 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 226.80/227.20 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 226.80/227.20 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 226.80/227.20 Found x2:(P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 226.80/227.20 Found x2:(P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 226.80/227.20 Found x2:(P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 226.80/227.20 Found x2:(P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 226.80/227.20 Found x2:(P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 226.80/227.20 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found eq_ref000:=(eq_ref00 P1):((P1 False)->(P1 False))
% 235.34/235.71 Found (eq_ref00 P1) as proof of (P2 False)
% 235.34/235.71 Found ((eq_ref0 False) P1) as proof of (P2 False)
% 235.34/235.71 Found (((eq_ref Prop) False) P1) as proof of (P2 False)
% 235.34/235.71 Found (((eq_ref Prop) False) P1) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 235.34/235.71 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 235.34/235.71 Found x2:(P b)
% 235.34/235.71 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 235.34/235.71 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 235.34/235.71 Found x2:(P b)
% 235.34/235.71 Found (fun (x2:(P b))=> x2) as proof of (P b)
% 235.34/235.71 Found (fun (x2:(P b))=> x2) as proof of (P0 b)
% 235.34/235.71 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 235.34/235.71 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 235.34/235.71 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 235.34/235.71 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 235.34/235.71 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 235.34/235.71 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 235.34/235.71 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 235.34/235.71 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 235.34/235.71 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 235.34/235.71 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 235.34/235.71 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 235.34/235.71 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 235.34/235.71 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 235.34/235.71 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 235.34/235.71 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 235.34/235.71 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 235.34/235.71 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 235.34/235.71 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 238.95/239.34 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 238.95/239.34 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 238.95/239.34 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 238.95/239.34 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 238.95/239.34 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 238.95/239.34 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 238.95/239.34 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 238.95/239.34 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found x:(P1 False)
% 238.95/239.34 Instantiate: b:=False:Prop
% 238.95/239.34 Found x as proof of (P2 b)
% 238.95/239.34 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 238.95/239.34 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found x:(P1 False)
% 238.95/239.34 Instantiate: b:=False:Prop
% 238.95/239.34 Found x as proof of (P2 b)
% 238.95/239.34 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 238.95/239.34 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 238.95/239.34 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 238.95/239.34 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 238.95/239.34 Found x:(P1 False)
% 238.95/239.34 Instantiate: b:=False:Prop
% 238.95/239.34 Found x as proof of (P2 b)
% 238.95/239.34 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 238.95/239.34 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 238.95/239.34 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found x:(P1 False)
% 243.45/243.85 Instantiate: b:=False:Prop
% 243.45/243.85 Found x as proof of (P2 b)
% 243.45/243.85 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 243.45/243.85 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found x:(P1 False)
% 243.45/243.85 Instantiate: b:=False:Prop
% 243.45/243.85 Found x as proof of (P2 b)
% 243.45/243.85 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 243.45/243.85 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found x2:(P b0)
% 243.45/243.85 Found (fun (x2:(P b0))=> x2) as proof of (P b0)
% 243.45/243.85 Found (fun (x2:(P b0))=> x2) as proof of (P0 b0)
% 243.45/243.85 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 243.45/243.85 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH False))
% 243.45/243.85 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 243.45/243.85 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 243.45/243.85 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH False))
% 243.45/243.85 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 243.45/243.85 Found (eq_ref0 b) as proof of (((eq fofType) b) b0)
% 243.45/243.85 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 243.45/243.85 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 243.45/243.85 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) b0)
% 243.45/243.85 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 243.45/243.85 Found (eq_ref0 b0) as proof of (((eq fofType) b0) b)
% 243.45/243.85 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 243.45/243.85 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 243.45/243.85 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 243.45/243.85 Found eq_ref00:=(eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))):(((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) (cH (((eq fofType) (cH True)) (cH False))))
% 243.45/243.85 Found (eq_ref0 (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 243.45/243.85 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 243.45/243.85 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 243.45/243.85 Found ((eq_ref fofType) (cH (((eq fofType) (cH True)) (cH False)))) as proof of (((eq fofType) (cH (((eq fofType) (cH True)) (cH False)))) b0)
% 243.45/243.85 Found x:(P False)
% 243.45/243.85 Instantiate: a:=False:Prop
% 243.45/243.85 Found x as proof of (P0 a)
% 243.45/243.85 Found x:(P1 False)
% 243.45/243.85 Instantiate: b:=False:Prop
% 243.45/243.85 Found x as proof of (P2 b)
% 243.45/243.85 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 243.45/243.85 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 243.45/243.85 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 248.75/249.14 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 248.75/249.14 Found x:(P False)
% 248.75/249.14 Instantiate: a:=False:Prop
% 248.75/249.14 Found x as proof of (P0 a)
% 248.75/249.14 Found x3:(P False)
% 248.75/249.14 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 248.75/249.14 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 248.75/249.14 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 248.75/249.14 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.14 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.14 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.14 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.14 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 248.75/249.14 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 248.75/249.14 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 248.75/249.14 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 248.75/249.14 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 248.75/249.14 Found x3:(P False)
% 248.75/249.14 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 248.75/249.14 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 248.75/249.14 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 248.75/249.14 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.14 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.14 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.14 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.14 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 248.75/249.14 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 248.75/249.14 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 248.75/249.14 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 248.75/249.14 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 248.75/249.14 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 248.75/249.14 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.14 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.15 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 248.75/249.15 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 248.75/249.15 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 248.75/249.15 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 248.75/249.15 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 248.75/249.15 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 248.75/249.15 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 248.75/249.15 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 248.75/249.15 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 248.75/249.15 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 248.75/249.15 Found x:(P b)
% 248.75/249.15 Instantiate: b0:=b:Prop
% 248.75/249.15 Found x as proof of (P0 b0)
% 248.75/249.15 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 248.75/249.15 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 248.75/249.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 248.75/249.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 248.75/249.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 248.75/249.15 Found x3:(P False)
% 248.75/249.15 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 248.75/249.15 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 248.75/249.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 248.75/249.15 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 248.75/249.15 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 248.75/249.15 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 248.75/249.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 248.75/249.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 248.75/249.15 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 248.75/249.15 Found x3:(P False)
% 248.75/249.15 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 248.75/249.15 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 251.18/251.61 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 251.18/251.61 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 251.18/251.61 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 251.18/251.61 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 251.18/251.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 251.18/251.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 251.18/251.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 251.18/251.61 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 251.18/251.61 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 251.18/251.61 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 251.18/251.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 251.18/251.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 251.18/251.61 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 251.18/251.61 Found x3:(P False)
% 251.18/251.61 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 251.18/251.61 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 251.18/251.61 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 251.18/251.61 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 251.18/251.61 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found x3:(P False)
% 251.18/251.61 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 251.18/251.61 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 251.18/251.61 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 251.18/251.61 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 251.18/251.61 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 251.18/251.61 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found x:(P (cH False))
% 251.18/251.61 Found x as proof of (P0 (cH False))
% 251.18/251.61 Found x2:(P (cH False))
% 251.18/251.61 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 251.18/251.61 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 251.18/251.61 Found x3:(P False)
% 251.18/251.61 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 251.18/251.61 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 251.18/251.61 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 251.18/251.61 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 251.18/251.61 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 251.18/251.61 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 256.77/257.19 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 256.77/257.19 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 256.77/257.19 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 256.77/257.19 Found x2:(P (cH False))
% 256.77/257.19 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 256.77/257.19 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 256.77/257.19 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 256.77/257.19 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 256.77/257.19 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 256.77/257.19 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 256.77/257.19 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 256.77/257.19 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 256.77/257.19 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 256.77/257.19 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 256.77/257.19 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 256.77/257.19 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 256.77/257.19 Found x2:(P (cH False))
% 256.77/257.19 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 256.77/257.19 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 256.77/257.19 Found x2:(P (cH False))
% 256.77/257.19 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 256.77/257.19 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 256.77/257.19 Found x2:(P (cH False))
% 256.77/257.19 Found (fun (x2:(P (cH False)))=> x2) as proof of (P (cH False))
% 256.77/257.19 Found (fun (x2:(P (cH False)))=> x2) as proof of (P0 (cH False))
% 256.77/257.19 Found x3:(P False)
% 256.77/257.19 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 256.77/257.19 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 256.77/257.19 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 256.77/257.19 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 256.77/257.19 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 256.77/257.19 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 256.77/257.19 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 256.77/257.19 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 256.77/257.19 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 256.77/257.19 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 256.77/257.19 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 256.77/257.19 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 256.77/257.19 Found eq_ref000:=(eq_ref00 P1):((P1 False)->(P1 False))
% 256.77/257.19 Found (eq_ref00 P1) as proof of (P2 False)
% 256.77/257.19 Found ((eq_ref0 False) P1) as proof of (P2 False)
% 256.77/257.19 Found (((eq_ref Prop) False) P1) as proof of (P2 False)
% 256.77/257.19 Found (((eq_ref Prop) False) P1) as proof of (P2 False)
% 256.77/257.19 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 256.77/257.19 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 256.77/257.19 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 256.77/257.19 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 256.77/257.19 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 256.77/257.19 Found x:(P0 b)
% 256.77/257.19 Instantiate: b:=False:Prop
% 256.77/257.19 Found (fun (x:(P0 b))=> x) as proof of (P0 False)
% 256.77/257.19 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of ((P0 b)->(P0 False))
% 256.77/257.19 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of (P b)
% 256.77/257.19 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 256.77/257.19 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 256.77/257.19 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 256.77/257.19 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 256.77/257.19 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 256.77/257.19 Found x2:(P1 False)
% 256.77/257.19 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 259.98/260.44 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 259.98/260.44 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 259.98/260.44 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found x:(P0 b)
% 259.98/260.44 Instantiate: b:=False:Prop
% 259.98/260.44 Found (fun (x:(P0 b))=> x) as proof of (P0 False)
% 259.98/260.44 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of ((P0 b)->(P0 False))
% 259.98/260.44 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of (P b)
% 259.98/260.44 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 259.98/260.44 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found x:(P0 b)
% 259.98/260.44 Instantiate: b:=False:Prop
% 259.98/260.44 Found (fun (x:(P0 b))=> x) as proof of (P0 False)
% 259.98/260.44 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of ((P0 b)->(P0 False))
% 259.98/260.44 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of (P b)
% 259.98/260.44 Found x2:(P1 False)
% 259.98/260.44 Found (fun (x2:(P1 False))=> x2) as proof of (P1 False)
% 259.98/260.44 Found (fun (x2:(P1 False))=> x2) as proof of (P2 False)
% 259.98/260.44 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 259.98/260.44 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 259.98/260.44 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 259.98/260.44 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 259.98/260.44 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 259.98/260.44 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 259.98/260.44 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 259.98/260.44 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 259.98/260.44 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 259.98/260.44 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 259.98/260.44 Found eq_ref000:=(eq_ref00 P1):((P1 False)->(P1 False))
% 259.98/260.44 Found (eq_ref00 P1) as proof of (P2 False)
% 259.98/260.44 Found ((eq_ref0 False) P1) as proof of (P2 False)
% 259.98/260.44 Found (((eq_ref Prop) False) P1) as proof of (P2 False)
% 259.98/260.44 Found (((eq_ref Prop) False) P1) as proof of (P2 False)
% 259.98/260.44 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 259.98/260.44 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 259.98/260.44 Found x:(P0 b)
% 259.98/260.44 Instantiate: b:=False:Prop
% 259.98/260.44 Found (fun (x:(P0 b))=> x) as proof of (P0 False)
% 259.98/260.44 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of ((P0 b)->(P0 False))
% 259.98/260.44 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of (P b)
% 259.98/260.44 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 259.98/260.44 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 259.98/260.44 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 266.27/266.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 266.27/266.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 266.27/266.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 266.27/266.67 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 266.27/266.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 266.27/266.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 266.27/266.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 266.27/266.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 266.27/266.67 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 266.27/266.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 266.27/266.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 266.27/266.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 266.27/266.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 266.27/266.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 266.27/266.67 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 266.27/266.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 266.27/266.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 266.27/266.67 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 266.27/266.67 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 266.27/266.67 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 266.27/266.67 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 266.27/266.67 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 266.27/266.67 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 266.27/266.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 266.27/266.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 266.27/266.67 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 266.27/266.67 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 266.27/266.67 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 266.27/266.67 Found x as proof of (P0 b)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 266.27/266.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 266.27/266.67 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 266.27/266.67 Found x as proof of (P0 b)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 266.27/266.67 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 266.27/266.67 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 266.27/266.67 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 266.27/266.67 Found x as proof of (P0 b)
% 266.27/266.67 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 270.26/270.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 270.26/270.65 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 270.26/270.65 Found x as proof of (P0 b)
% 270.26/270.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 270.26/270.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found x:(P1 False)
% 270.26/270.65 Instantiate: b:=False:Prop
% 270.26/270.65 Found x as proof of (P2 b)
% 270.26/270.65 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 270.26/270.65 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 270.26/270.65 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 270.26/270.65 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 270.26/270.65 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 270.26/270.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 270.26/270.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 270.26/270.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 270.26/270.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 270.26/270.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 270.26/270.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 270.26/270.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 270.26/270.65 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 270.26/270.65 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 270.26/270.65 Found x as proof of (P0 b)
% 270.26/270.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 270.26/270.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 270.26/270.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 270.26/270.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 270.26/270.65 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 270.26/270.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 270.26/270.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 270.26/270.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.26/270.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.26/270.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.26/270.65 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 270.26/270.65 Found (eq_ref0 b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 270.26/270.65 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 270.26/270.65 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 270.26/270.65 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) (cH (((eq fofType) (cH True)) (cH False))))
% 270.26/270.65 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 270.26/270.65 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 270.26/270.65 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 270.26/270.65 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 270.26/270.65 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 270.26/270.65 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 270.26/270.65 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 275.16/275.56 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 275.16/275.56 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 275.16/275.56 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 275.16/275.56 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found x:(P False)
% 275.16/275.56 Instantiate: a:=False:Prop
% 275.16/275.56 Found x as proof of (P0 a)
% 275.16/275.56 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 275.16/275.56 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 275.16/275.56 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 275.16/275.56 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 275.16/275.56 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 275.16/275.56 Found x2:(P1 b)
% 275.16/275.56 Found (fun (x2:(P1 b))=> x2) as proof of (P1 b)
% 275.16/275.56 Found (fun (x2:(P1 b))=> x2) as proof of (P2 b)
% 275.16/275.56 Found x2:(P1 b)
% 275.16/275.56 Found (fun (x2:(P1 b))=> x2) as proof of (P1 b)
% 275.16/275.56 Found (fun (x2:(P1 b))=> x2) as proof of (P2 b)
% 275.16/275.56 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 275.16/275.56 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 275.16/275.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 275.16/275.56 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 275.16/275.56 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found x:(P False)
% 275.16/275.56 Instantiate: a:=False:Prop
% 275.16/275.56 Found x as proof of (P0 a)
% 275.16/275.56 Found x2:(P1 (cH False))
% 275.16/275.56 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P1 (cH False))
% 275.16/275.56 Found (fun (x2:(P1 (cH False)))=> x2) as proof of (P2 (cH False))
% 275.16/275.56 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 275.16/275.56 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 275.16/275.56 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 275.16/275.56 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found x3:(P False)
% 279.04/279.44 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 279.04/279.44 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 279.04/279.44 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 279.04/279.44 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 279.04/279.44 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 279.04/279.44 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 279.04/279.44 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 279.04/279.44 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 279.04/279.44 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 279.04/279.44 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 279.04/279.44 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 279.04/279.44 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found x3:(P False)
% 279.04/279.44 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 279.04/279.44 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 279.04/279.44 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 279.04/279.44 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 279.04/279.44 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 279.04/279.44 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 279.04/279.44 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 279.04/279.44 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 279.04/279.44 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 279.04/279.44 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 279.04/279.44 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 279.04/279.44 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 279.04/279.44 Found (eq_ref0 a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b)
% 279.04/279.44 Found x3:(P False)
% 279.04/279.44 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 279.04/279.44 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 279.04/279.44 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 279.04/279.44 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 279.04/279.44 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 286.11/286.52 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found x3:(P False)
% 286.11/286.52 Found (fun (x3:(P False))=> x3) as proof of (P False)
% 286.11/286.52 Found (fun (x3:(P False))=> x3) as proof of (P0 False)
% 286.11/286.52 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 286.11/286.52 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 286.11/286.52 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 286.11/286.52 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 286.11/286.52 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 286.11/286.52 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 286.11/286.52 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 286.11/286.52 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 286.11/286.52 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 286.11/286.52 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 286.11/286.52 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 286.11/286.52 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 286.11/286.52 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 286.11/286.52 Found (eq_ref0 b) as proof of (((eq Prop) b) False)
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) False)
% 286.11/286.52 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 286.11/286.52 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 286.11/286.52 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 286.11/286.52 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 286.11/286.52 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 286.11/286.52 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 287.65/288.11 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 287.65/288.11 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 287.65/288.11 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 287.65/288.11 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 287.65/288.11 Found x:(P0 b)
% 287.65/288.11 Instantiate: b:=False:Prop
% 287.65/288.11 Found (fun (x:(P0 b))=> x) as proof of (P0 False)
% 287.65/288.11 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of ((P0 b)->(P0 False))
% 287.65/288.11 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of (P b)
% 287.65/288.11 Found eq_ref00:=(eq_ref0 (((eq fofType) (cH True)) (cH False))):(((eq Prop) (((eq fofType) (cH True)) (cH False))) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found (eq_ref0 (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 287.65/288.11 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 287.65/288.11 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 287.65/288.11 Found ((eq_ref Prop) (((eq fofType) (cH True)) (cH False))) as proof of (((eq Prop) (((eq fofType) (cH True)) (cH False))) b)
% 287.65/288.11 Found x:(P0 b)
% 287.65/288.11 Instantiate: b:=False:Prop
% 287.65/288.11 Found (fun (x:(P0 b))=> x) as proof of (P0 False)
% 287.65/288.11 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of ((P0 b)->(P0 False))
% 287.65/288.11 Found (fun (P0:(Prop->Prop)) (x:(P0 b))=> x) as proof of (P b)
% 287.65/288.11 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 287.65/288.11 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 287.65/288.11 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 287.65/288.11 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 287.65/288.11 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 287.65/288.11 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 287.65/288.11 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 287.65/288.11 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 287.65/288.11 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 287.65/288.11 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 287.65/288.11 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 287.65/288.11 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 287.65/288.11 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 287.65/288.11 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 287.65/288.11 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 287.65/288.11 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 287.65/288.11 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 292.07/292.54 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.07/292.54 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 292.07/292.54 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.07/292.54 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 292.07/292.54 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.07/292.54 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found x2:(P0 b)
% 292.07/292.54 Found (fun (x2:(P0 b))=> x2) as proof of (P0 b)
% 292.07/292.54 Found (fun (x2:(P0 b))=> x2) as proof of (P1 b)
% 292.07/292.54 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 292.07/292.54 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 292.07/292.54 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.07/292.54 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 292.07/292.54 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 292.07/292.54 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 292.07/292.54 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 292.07/292.54 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 292.07/292.54 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 292.07/292.54 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 292.07/292.54 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 292.07/292.54 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.07/292.54 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 292.07/292.54 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 293.94/294.35 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 293.94/294.35 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 293.94/294.35 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 293.94/294.35 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 293.94/294.35 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 293.94/294.35 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 293.94/294.35 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 293.94/294.35 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 293.94/294.35 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 293.94/294.35 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 293.94/294.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 293.94/294.35 Found (eq_ref0 b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) (((eq fofType) (cH True)) (cH False)))
% 293.94/294.35 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 293.94/294.35 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b1)
% 293.94/294.35 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b1)
% 298.33/298.78 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b1)
% 298.33/298.78 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b1)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 b1):(((eq fofType) b1) b1)
% 298.33/298.78 Found (eq_ref0 b1) as proof of (((eq fofType) b1) (cH (((eq fofType) (cH True)) (cH False))))
% 298.33/298.78 Found ((eq_ref fofType) b1) as proof of (((eq fofType) b1) (cH (((eq fofType) (cH True)) (cH False))))
% 298.33/298.78 Found ((eq_ref fofType) b1) as proof of (((eq fofType) b1) (cH (((eq fofType) (cH True)) (cH False))))
% 298.33/298.78 Found ((eq_ref fofType) b1) as proof of (((eq fofType) b1) (cH (((eq fofType) (cH True)) (cH False))))
% 298.33/298.78 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 298.33/298.78 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 298.33/298.78 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 298.33/298.78 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 298.33/298.78 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 298.33/298.78 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 298.33/298.78 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 298.33/298.78 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 298.33/298.78 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 298.33/298.78 Found x:(P b)
% 298.33/298.78 Instantiate: b0:=b:fofType
% 298.33/298.78 Found x as proof of (P0 b0)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 298.33/298.78 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 298.33/298.78 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 298.33/298.78 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 298.33/298.78 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 298.33/298.78 Found x2:(P1 b)
% 298.33/298.78 Found (fun (x2:(P1 b))=> x2) as proof of (P1 b)
% 298.33/298.78 Found (fun (x2:(P1 b))=> x2) as proof of (P2 b)
% 298.33/298.78 Found x2:(P1 b)
% 298.33/298.78 Found (fun (x2:(P1 b))=> x2) as proof of (P1 b)
% 298.33/298.78 Found (fun (x2:(P1 b))=> x2) as proof of (P2 b)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 298.33/298.78 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 298.33/298.78 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 298.33/298.78 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 298.33/298.78 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 298.33/298.78 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 298.33/298.78 Found (eq_ref0 b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 299.78/300.22 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 299.78/300.22 Found (eq_ref0 b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 b):(((eq fofType) b) b)
% 299.78/300.22 Found (eq_ref0 b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 299.78/300.22 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 299.78/300.22 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 299.78/300.22 Found ((eq_ref fofType) b) as proof of (((eq fofType) b) (cH (((eq fofType) (cH True)) (cH False))))
% 299.78/300.22 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 299.78/300.22 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 299.78/300.22 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 299.78/300.22 Found (eq_ref0 b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 299.78/300.22 Found (eq_ref0 False) as proof of (((eq Prop) False) b0)
% 299.78/300.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 299.78/300.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 299.78/300.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b0)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 299.78/300.22 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 299.78/300.22 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.78/300.22 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.78/300.22 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 (cH False)):(((eq fofType) (cH False)) (cH False))
% 299.78/300.22 Found (eq_ref0 (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found ((eq_ref fofType) (cH False)) as proof of (((eq fofType) (cH False)) b0)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 b0):(((eq fofType) b0) b0)
% 299.78/300.22 Found (eq_ref0 b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found ((eq_ref fofType) b0) as proof of (((eq fofType) b0) b)
% 299.78/300.22 Found x2:(P0 b)
% 299.78/300.22 Found (fun (x2:(P0 b))=> x2) as proof of (P0 b)
% 299.78/300.22 Found (fun (x2:(P0 b))=> x2) as proof of (P1 b)
% 299.78/300.22 Found x:(P (((eq fofType) (cH True)) (cH False)))
% 299.78/300.22 Instantiate: b:=(((eq fofType) (cH True)) (cH False)):Prop
% 299.78/300.22 Found x as proof of (P0 b)
% 299.78/300.22 Found eq_ref00:=(eq_ref0 False):(((eq Prop) False) False)
% 299.78/300.22 Found (eq_ref0 False) as proof of (((eq Prop) False) b)
% 299.78/300.22 Found ((eq_ref Prop) False) as proof of (((eq Prop) False) b)
% 299.78/300.22 Found ((eq_ref Prop) False) as proof of (((eq Pro
%------------------------------------------------------------------------------